The following description relates to computing an isogeny kernel in supersingular isogeny-based cryptographic protocols.
Cryptography systems are used to communicate securely over public channels. For example, some cryptography systems provide confidentiality by encrypting messages, and some cryptography systems provide authenticity through digital signatures. Some cryptography systems operate using public keys, private keys and shared secrets.
In some aspects of the present disclosure, technologies for implementing supersingular isogeny-based cryptography are described. In some cases, the systems and techniques described here may provide greater computational efficiency, greater resource utilization or other advantages and improvements, for example, in the execution of supersingular isogeny-based cryptography protocols. The supersingular isogeny Diffie-Hellman key agreement protocol (SIDH) is an example of a supersingular isogeny-based cryptographic protocol that is believed to be secure against attacks carried out by quantum computers. And the supersingular isogeny key exchange (SIKE) protocol, which is a key encapsulation based on SIDH, is a potential candidate for post-quantum standardization. Thus, the systems and techniques described here may provide advantages and improvements for quantum-safe cryptography systems, as well as other types of cryptography systems. (A description of SIDH can be found in the publication entitled “Towards quantum-resistant cryptosystems from supersingular elliptic curve isogenies,” by De Feo, et al., dated 2014, Journal of Mathematical Cryptology 8 (3), pp. 209-247. A description of SIKE can be found in the publication entitled “Supersingular Isogeny Key Encapsulation (SIKE)” by David Jao, et al., dated Nov. 30, 2017, which is publicly available at https://sike.org/files/SIDH-spec.pdf.)
Accordingly, aspects of the systems and techniques described here can be used to improve the operation of communications systems (e.g., data networks, etc.), computer systems (e.g., network-connected computers, etc.), smart devices (e.g., so-called “Internet-of-Things” (IoT) devices, etc.) and other classes of technology. For example, a wide variety of modern technologies rely on computer-implemented cryptosystems for secure operation, and the techniques described here can improve such computer-implemented cryptosystems, for example, making them more secure, more computationally efficient or providing other advantages in some instances.
In some cryptographic protocols (including the example protocol 200 shown in
In some cases, the techniques described here organize the sub-algorithms into batches of cryptographic operations performed by multiple cryptographic co-processors. Improvements may be achieved, for example, by prioritizing cryptographic operations for determining generators of isogeny kernels into earlier batches over other types of operations; by scheduling point evaluations on a public parameter in batches in which cryptographic co-processors are not occupied; by introducing one or more separate cryptographic co-processors for performing image curve evaluations; by redesigning a tree topology containing one or more zigzag paths which allows simultaneous scalar multiplications in a batch; or by a combination of these and other techniques in a multi-thread software and system.
In some cases, the techniques for determining a generator of an isogeny kernel described here can be used to improve a supersingular isogeny Diffie-Hellman (SIDH) protocol, a supersingular isogeny key exchange (SIKE) protocol, or other types of supersingular isogeny-based cryptography protocols conducted in a supersingular isogeny-based cryptosystem. For example, the techniques described here may be applied to supersingular isogeny-based public key encryption schemes, such as, for example, the public key encryption scheme described by De Feo et al. (De Feo, et al., “Towards quantum-resistant cryptosystems from supersingular elliptic curve isogenies.” Journal of Mathematical Cryptology 8 (3), pp. 209-247, 2014). As another example, the techniques described here may be applied to supersingular isogeny-based key encapsulation mechanism (KEM) schemes.
In the example shown, a quantum-enabled adversary 108 has access to the channel 106, information exchanged on the channel 106, or both. In some instances, the quantum-enabled adversary 108 can transmit or modify information on the channel 106. The communication system 100 may include additional or different features, and the components in a communication system may be configured to operate as shown in
In some implementations, nodes in the communication system 100 may have a server-client relationship. For example, the node 102 can be a server and the node 104 can be its client, or vice-versa. In some implementations, nodes in the communication system 100 may have a peer-to-peer relationship. For example, the nodes 102, 104 can be peers in a served network, in a peer-to-peer network or another type of network. Nodes may have another type of relationship in the communication system 100.
In the example shown in
In the example shown in
The example memory 110 can include, for example, random access memory (RAM), a storage device (e.g., a writable read-only memory (ROM) or others), a hard disk, or another type of storage medium. The example memory 110 can store instructions (e.g., computer code, a computer program, etc.) associated with an operating system, computer applications and other resources. The memory 110 can also store application data and data objects that can be interpreted by one or more applications or virtual machines running on the node 102. The node 102 can be preprogrammed, or it can be programmed (and reprogrammed), by loading a program from another source (e.g., from a DVD-ROM, from a removable memory device, from a remote server, from a data network or in another manner). In some cases, the memory 110 stores computer-readable instructions for software applications, scripts, programs, functions, executables or other modules that are interpreted or executed by the processor 112. For example, the computer-readable instructions can be configured to perform one or more of the operations shown in one or both of
In the example node 102 shown in
The example processor 112 shown in
In the example node 102 shown in
The example channel 106 can include all or part of a connector, a data communication network or another type of communication link. For example, the channel 106 can include one or more wired or wireless connections, one or more wired or wireless networks or other communication channels. The channel 106 may have any spatial distribution. The channel 106 may be public, private, or include aspects that are public and private. For instance, in some examples, the channel 106 includes one or more of a Local Area Network (LAN), a Wide Area Network (WAN), a Virtual Private Network (VPN), the Internet, a peer-to-peer network, a cellular network, a Wi-Fi network, a Personal Area Network (PAN) (e.g., a Bluetooth low energy (BTLE) network, a ZigBee network, etc.) or other short-range network involving machine-to-machine (M2M) communication, or another type of data communication network.
In the example shown, the quantum-enabled adversary 108 is a node in the communication system 100 that has access to quantum computational resources. For example, the quantum-enabled adversary 108 can be, include, or have access to a quantum computer, a quantum information processor, a quantum memory, a quantum communication interface or a combination of these and possibly other quantum technologies. In some implementations, the quantum-enabled adversary 108 can include a hybrid computing system, for instance, that includes a quantum processor driven by a classical front-end processor, or another type of hybrid computing system.
In some examples, the quantum-enabled adversary 108 can store and process information in a quantum system. For instance, the quantum-enabled adversary 108 may encode information as quantum bits (“qubits”) and process the information by manipulating the qubits. The information may be encoded in physical qubits, logical qubits, or a combination of these and other types of qubit encodings. In some implementations, the quantum-enabled adversary 108 can operate in a fault-tolerant regime, or the quantum-enabled adversary may operate below the fault-tolerant regime.
Many public key cryptography systems (“cryptosystems”) are known to be insecure against an attacker armed with a scalable quantum computer. For example, the Diffie-Hellman (DH) and elliptic curve Diffie-Hellman (ECDH) key agreement protocols are vulnerable to certain types of attacks by quantum-enabled adversaries. The threat of quantum computers to public key cryptography can be mitigated by switching to other public key cryptography systems that are believed to be invulnerable to quantum attack. For example, supersingular isogeny-based protocols have been proposed as a quantum-resistant replacement for contemporary key agreement protocols such as the Diffie-Hellman (DH) and elliptic curve Diffie-Hellman (ECDH).
In some implementations, the example quantum-enabled adversary 108 can perform quantum computing algorithms, execute quantum computing circuits or quantum communication protocols, or perform other types of quantum information processing tasks. In the example shown, the quantum-enabled adversary 108 can perform Shor's algorithm, which allows the quantum-enabled adversary to efficiently solve problems that are believed to be hard on a classical computer. For example, the quantum-enabled adversary 108 may use Shor's algorithm to factor large integers, find discrete logarithms or possibly to solve other problems in a computationally efficient manner. Accordingly, the example quantum-enabled adversary 108 can compromise the security of certain quantum-vulnerable cryptography systems (e.g., by computing a private key of a certificate authority or other entity based on public information).
The example quantum-enabled adversary 108 shown in
In some implementations, the quantum-enabled adversary 108 can factor integers, compute discrete logarithms, or perform other classically-hard computational tasks fast enough to compromise the security of certain cryptography systems. For example, the quantum-enabled adversary 108 may be capable of computing prime factors fast enough to compromise certain RSA-based cryptography systems or computing discrete logarithms fast enough to compromise certain ECC-based cryptography systems.
In the example shown in
In some implementations, the nodes 102, 104 use a digital signature scheme that allows each node to verify the authenticity of messages received from the other node, and the digital signature scheme can be a quantum-resistant scheme that is not vulnerable to the quantum computing resources of the quantum-enabled adversary 108. In some implementations, the nodes 102, 104 use an encryption scheme that allows each node to send confidential messages to the other node, and the encryption scheme can be a quantum-resistant scheme that is not vulnerable to the quantum computing resources of the quantum-enabled adversary 108. Such digital signature schemes and encryption schemes can include or be used in conjunction with a key agreement protocol or a key encapsulation mechanism that is also secure against attacks by the quantum-enabled adversary 108. In some examples, the nodes 102, 104 can use the example techniques shown in
In some cases, one or more of the operations shown in
The example process 200 shown in
In the example shown in
In some examples, the cryptographic process 200 is secure against quantum-enabled adversaries such as, for example, the quantum-enabled adversary 108 shown in
At 210A and 210B, the nodes 202A, 202B perform one or more cryptosystem setup operations. A supersingular isogeny-based cryptosystem can be described in terms of a supersingular elliptic curve E defined over a finite field Fp
The cryptosystem setup operations at 210A, 210B can include defining elliptic curve points PA, QA, PB, QB on the elliptic curve E, which are public parameters of the corresponding nodes 210A, 210B. For each elliptic curve point, a pair of numbers in the finite field Fp
In examples where lA=2 and lA=3, {PA, QA} represents a basis of the set of 2n-torsion points E[2n], and {PB, QB} represents a basis of the set of 3m-torsion points E[3m]; the order of elliptic curve points PA and QA is 2n; and the order of elliptic curve points PB and QB is 3m. Global system parameters p, E, PA, QA, PB, QB, p, lA, lB, f, n and m, which define a supersingular isogeny cryptosystem, can be published to, computed by, or otherwise made available to the nodes 202A, 202B. In some other examples, the global system parameters may be obtained in another manner.
When a cryptographic protocol is executed with these parameters, one of the entities works with isogenies whose kernel is contained in a set of elliptic curve points defined by lAn (e.g., E[2n]), and the other entity works with isogenies whose kernel is contained in a second set of elliptic curve points defined by lBm (e.g., E[3m]). In the examples described here, Alice and Bob agree that Alice will work over the set E[2n] and Bob will work over the set E[3m]. The respective set of points used by each entity can be established by agreement between the entities, by selection of one of the entities (e.g., the entity that initiates the process 200 can make a selection), based on a relationship of the entities (e.g., server-client), or otherwise before or during execution of the process 200.
At 212A and 212B, the nodes 202A, 202B perform one or more operations to each generate a respective key pair. In some implementations, each respective node 202A, 202B produces a public-private key pair. For instance, a first public-private key pair for the first entity 202A (“Alice”) may be produced at 212A, and a second public-private key pair for the second entity 202B (“Bob”) may be produced at 212B. A public-private key pair of an entity includes a private key and a corresponding public key, which are related as proscribed by the cryptosystem. The private key is kept as a secret of the entity, while the public key can be published to other entities in the cryptosystem. A public-private key pair may be generated in another manner. In some cases, a public-private key pair can be used as a static key pair or an ephemeral key pair.
In the example process 200, each entity's private key is represented by a single integer (α for Alice, β for Bob). However, private keys for supersingular isogeny-based cryptosystems can have another form. For instance, a private key may have the form (α1, α2) for some integers αc and α2. However, it is possible to choose the private key of the form (1, α) or (α, 1), so that it is given by a single integer α.
In some examples, at 212A, the node 202A obtains a random integer α, such that 0≤α<2n. Generally, the random integer can be in the range 0≤α<lAn, for any appropriate value of lAn. The random integer α is kept secret, as Alice's secret key. In some cases, Alice uses the random integer α as a static private key or as an ephemeral private key. In one example, the node 202A further uses the random integer α to obtain an elliptic curve point GA=PA+[α]QA on a first elliptic curve. Here, the pair of elliptic curve points {PA, QA} is a public parameter of the node 202A in the supersingular isogeny-based cryptosystem, and the elliptic curve point GA is a generator of the cyclic subgroup GA. Here, [α]QA denotes scalar multiplication on the first elliptic curve, where the point QA is added to itself a times.
In some examples, at 212B, a similar process can be performed by the node 202B in parallel to obtain a random integer 3, which can be further used to determine an elliptic curve point GB=PB+[β]QB on a first elliptic curve for determining a public key of the node 202B. Here, the pair of elliptic curve points {PB, QB} is the public parameter of the node 202B in the supersingular isogeny-based cryptosystem, and the elliptic curve point GB is a generator of the cyclic subgroup (GB). Here, [β]QB denotes scalar multiplication on the first elliptic curve, where the point QB is added to itself β times.
In a supersingular isogeny-based cryptography protocol (e.g., SIDH, SIKE, entity authentication protocols, etc.), the public key of the node 202A includes EA, ϕA(PB), ϕA(QB), and ϕA(RB), wherein EA is the image curve; ϕA(PB), ϕA(QB), and ϕA(RB) are elliptic curve points. In some cases, RB is determined by PB−QB. In this example, the image curve EA=E/GA is the elliptic curve under the isogeny ϕA; ϕA(PB) is an elliptic curve point that is the image of PB under the isogeny ϕA; ϕA(QB) is an elliptic curve point that is the image of QB under the isogeny ϕA; and ϕA(RB) is an elliptic curve point that is the image of RB under the isogeny ϕA.
In some examples, the isogeny ϕA: E→EA is an isogeny of degree 2n with the kernel GA. An isogeny is generally defined by its kernel, and the generator of the kernel determines the isogeny. As such, the elliptic curve point GA determines the isogeny ϕA. The degree of an isogeny generally refers the order of its kernel, or equivalently, the order of the point that generates the kernel. Thus, the degree of the isogeny ϕA is the order of the kernel GA, which is the order of the elliptic curve point GA. The isogeny ϕA and the elliptic curve point GA can be maintained as secret information of the node 202A (Alice).
In the example process 200, a number of values are further obtained by each of the nodes 202A, 202B so as to determine the respective public keys. For example, the nodes 202A, 202B each obtain elliptic curves, image curves, elliptic curve points, image points, kernel points, and various representations of these and other cryptographic values in the various operations. Generally, each of these values can be computed or otherwise obtained in any suitable manner, and each of these values can be stored or represented in any suitable form or format.
In some instances, each of these values can be directly computed by operation of specialized cryptographic co-processors (e.g., point evaluation co-processor, scalar multiplication co-processor, image curve evaluation co-processor, etc.) programmed to perform a computation that produces that value. In some instances, each of these values can be retrieved from a remote or local memory or from another source, which are precomputed by the specialized co-processors or another processor. In some instances, the specialized co-processors may include Field Programmable Gate Array (FPGA), an ASIC (application specific integrated circuit), or a Graphics Processing Unit (GPU), or other type of processors.
In some examples, global system values of the cryptosystem, and other values can be received from memory (e.g., volatile or non-volatile memory); random integers (e.g., α, β, etc.) or other random values can be received from a pseudorandom generator or another source; elliptic curve points, image curves, isogenies or values can be computed by a corporative computation of specialized cryptographic co-processors, a general-purpose processor, or another type of processor.
Each node 202A, 202B may perform its respective operations to generate the public-private key pairs in parallel (e.g., potentially at the same time) or in series, and the operations may be performed independent of, or in response to, information from the other node. In some examples, node 202A generates Alice's public-private key pair first, and then node 202B generates Bob's public-private key pair after receiving Alice's public key. The operations may be performed in another order, or in response to other conditions.
In some examples, cryptographic elements are determined by the respective nodes 202A, 202B through a series of operations using a pre-configured tree topology, which includes a plurality of nodes connected by edges. In some implementations, the nodes represent elliptic curve points and the edges represent the operations between two neighboring elliptic curve points. In some implementations, the size of the tree topology is defined by the value of lAn. For example, example tree topologies are described in detail in
In some implementations, the tree topology defines steps for performing a plurality of batches. Each of the plurality of batches may include one or more cryptographic operations, which are performed in parallel (e.g., concurrently, simultaneously, independently, etc.) by multiple cryptographic co-processors. Generally, a batch may include any numbers of operations that are within the capacity of the computational resources configured in the node. For example, if a node (e.g., 202 or 202B) is configured with 2 scalar multiplication co-processors and 2 point evaluation co-processors, a batch may perform 4 operations in parallel, including 2 scalar multiplications and 2 point evaluations to efficiently utilize the computational resources provided by the co-processors.
In some implementations, a batch may include two or more operation of the same type performed by two or more cryptographic co-processors of the same type. For example, a batch may include two or more scalar multiplications performed by two or more scalar multiplication co-processors or may include two or more point evaluations performed by two or more point evaluation co-processors. In some other implementations, a batch may include at least two operations of different types. For example, a batch may include one or more scalar multiplications and one or more point evaluations.
In some cases, after 212A, 212B, the public keys of the nodes 202A, 202B are sent between the nodes 202A, 202B. For example, the node 202A may send its public key (e.g., X(ϕA(PB)), X(ϕA(QB)), and one of EA or X(ϕA(RB))) directly to the node 202B; or the node 202A may initiate transmission indirectly, for example, through a communication device or otherwise. (Here, the notation “X(.)” represents the x-coordinate of an elliptic curve point.) Similarly, in some examples, the node 202A may also receive the public key of the node 202B directly from the node 202B or through a communication device or otherwise. In some cases, the node 202B may obtain Alice's public key from the node 202A, from memory or another remote or local source. Moreover, information may be sent in multiple transmissions or a single transmission over one or more communication networks or other channels. All or part of the information can be transmitted over a public channel, and may be observed by a quantum-enabled adversary or another type of adversary. Moreover, information including the public keys may be sent in multiple transmissions or a single transmission over one or more communication networks or other channels. All or part of the information can be transmitted over a public channel, and may be observed by a quantum-enabled adversary or another type of adversary.
At 214A and 214B, the nodes 202A, 202B perform one or more operations to derive a shared secret. In some implementations, the nodes 202A, 202B produce a shared secret value that can subsequently be used for cryptographic correspondence. For instance, deriving the shared secret at 214A, 214B may produce a secret value that is known to both entities (Alice and Bob), but is not publicly known or easily derivable from public information. In some example SIDH protocols, the shared secret is the j-invariant value (j(EAB)=j(EBA)) computed by one entity based on the public key of the other entity. In some cases, the protocol performed by each entity to derive the shared secret also validates the public key of the other entity. In some example SIKE protocols, the shared secret is the hash of the j-invariant value (j(EAB)=j(EBA)).
In some examples, in order to derive the shared secret, the node 202B computes an image curve EAB under the isogeny ψB: EA→EAB. Here, the isogeny ψB is an isogeny of degree 3m with kernel ϕA(PB)+[β]ϕA(QB). In some cases, the same pre-configured tree topology for determining the isogeny ϕB: E→EB of the node 202B can be used. In some other cases, a different tree topology can be used to determining the isogeny ψB: EA→EAB according to the value of 3m. In some examples, a tree topology may include one or more paths used to define steps in a supersingular isogeny-based cryptography method. In some cases, paths in a tree topology may be determined by the computation resources within a computer system, e.g., number and type of cryptographic co-processors. In some instances, paths in a pre-determined tree-topology may be updated depending on the changes in the computation resources.
In some cases, the node 202B computes a shared secret value based on the image curve EAB. The shared secret value is “shared” in the sense that the secret value is known (or to be known) by Alice and Bob. In some examples, the shared secret is the j-invariant j(EAB) of the image curve EAB. The j-invariant of an elliptic curve is an element of the underlying finite field Fp
In some cases, the shared secret, is used to encrypt the private key of the node 202B, e.g., Enc(β). The public key, which may include Enc(β), X(ϕB(PA)), X(ϕB(QA)), and one of X(ϕB(RA)) or EB. of the node 202B is then sent to or shared with the node 202A.
Similarly, the node 202A determines its shared secret by computing the image curve EBA and the isogeny ψA: EB→EBA using the same pre-configured tree topology or a different tree topology according to the value of 2n. Here, the isogeny ψA is an isogeny of degree 2n with kernel ϕB(PA)+[α]ϕB(QA). In some examples, the shared secret is the j-invariant j(EBA) of the image curve EBA. The node 202A, for example, may use the j(EBA) to decrypt the Enc(β) to obtain β′, which is further used to determine a decrypted generator GB′=PB+[β′]QB.
In some implementations, the node 202A further performs certain operations to validate the public key. For instance, the node 202A may validate the public key received from the node 202B to improve integrity and security of the protocol 200. In some cases, the node 202A computes the image curve EB′=E/GB′ and the isogeny ϕB′: E→EB using the pre-determined tree topology or a different tree topology. Here, the isogeny ϕB′ is an isogeny of degree 3m with kernel GB. The image curve EB′ and image points ϕB′(PA), ϕB′(QA), and ψB′(RA) can be computed and stored in any suitable manner, using the techniques discussed above with respect to generating Alice's public key at 212A. The image curve EB′ and the isogeny ϕB′: E→EB are used to determine check values of X(ϕB′(PA)), X(ϕB′(QA)), and one of EB′, or X(ϕB′(RA)), which are used to compare to the corresponding values in the public key of the node 202B for validation purposes.
At 216A and 216B, the shared secret (generated at 214A and 214B) is used for cryptographic correspondence. For example, the keys generated by a key agreement protocol may be used in in a supersingular isogeny-based cryptographic protocol to encrypt or decrypt a message, to sign or verify a message or to generate other parameters that are used for cryptographic correspondence. The keys may be used in another manner.
The processors 300 can include various kinds of apparatus, devices, and machines for processing data, including, by way of example, a programmable data processor, a system on a chip, or multiple ones, or combinations, of the foregoing. Each of the processors 300 may include special purpose logic circuitry, e.g., an FPGA (field programmable gate array), an ASIC (application specific integrated circuit), or a Graphics Processing Unit (GPU). The processors 300 can include, in addition to hardware, code that creates an execution environment for the computer program in question, e.g., code that constitutes processor firmware, a protocol stack, a database management system, an operating system, a cross-platform runtime environment, a virtual machine, or a combination of one or more of them. The processors 300 can include, by way of example, both general and special purpose microprocessors, and processors of any kind of digital computer
The example processors 300 shown in
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In some examples, the operations of the cryptographic co-processors 304, 306, 308 may be prioritized, ordered, and coordinated by the CPU 302 so as to provide efficient management of the computational resources in each of the cryptographic co-processors 304, 306, 308. In some implementations, the operations of the cryptographic co-processors 304, 306 are programmed according to the pre-configured tree topology. For example, when using a pre-configured tree topology for the isogeny ϕ with a degree of ln, the scalar multiplication co-processors 306 may be first used to determine a first generator of a first isogeny kernel on the first elliptic curve E0; the point evaluation co-processors 304 may then be prioritized for computing generators over computing image points on the same elliptic curve; the point evaluation co-processors may be configured for computing multiple image points in a batch; and the image curve evaluation co-processors 308 may be configured to compute coefficients of an image curve according to the isogeny. In some implementations, calculation results obtained from each of the cryptographic co-processors in steps during the determination of the isogeny ϕ with a degree of ln can be stored in a memory which can be used as an input of other cryptographic co-processors in other steps. In some examples, the point evaluation processors 304 may be used as the image curve evaluation processors 308 for performing image curve evaluations.
In some implementations, the tree topology 400 defines operational steps and pathways to determine the values of generators (e.g., [l5]G0, [l4]G1, [l3]G2, [l2]G3, [l]G4, and G5) for the lower order isogeny kernels represented in the bottom row of the tree topology 400. In some cryptographic protocols, the generators of the isogeny kernels may be used to determine isogenies of lower degrees (l). In certain implementations, the isogenies with lower degrees (e.g., ϕ5, ϕ4, ϕ3, ϕ2, ϕ1, ϕ0) may be further used to apply or evaluate the isogeny ϕ (e.g., ϕA for node 202A and ϕB for node 202B) with a degree of ln, for example, in the context generating the public key of a communication node (e.g., nodes 202A, 202B), verifying a public key received from a different communication node via a communication channel or other contexts.
In some implementations, the tree topology 400 is pre-configured by a program stored in a memory of a node and executed by a processor or cryptographic co-processors of the respective node. In some implementations, the tree topology 400 is used in various steps of a cryptographic protocol. For example, the same tree topology may be used in generating keys at 212A, 212B, and the same tree topology that is used for generating a public key can be also used in verifying a received public key and deriving shared secret at 214A, 214B. In some implementations, the tree topology 400 may be shared between node 202A, 202B. In some other implementations, the tree topology 400 defined by lAn (e.g., E[2n]) is used by one node (e.g., 202A) and a different tree topology defined by lBm (e.g., E[3m]) is used by the other node (e.g., 202B). In some implementations, the tree topology 400 is determined by minimizing the computational cost. For example, assuming the computational cost for scalar multiplication is p and the computational cost for each point evaluation is q, the tree topology can be determined by min(p·a+q·b). Here, a is the number of scalar multiplications in the tree topology and b is the number of point evaluations in the tree topology. The tree topology may be determined in another manner.
The example tree topology 400 includes nodes connected by edges. The twenty-one nodes in the tree topology 400 include a root node (which resides in the top level of the tree topology 400 and has no parent node), six leaf nodes (which reside in the bottom level of the tree topology 400 and have no child nodes) and fourteen intermediate nodes between the root node and the leaf nodes. The nodes in the tree topology correspond to generators of isogeny kernels. The nodes in higher levels of the tree correspond to generators of isogeny kernels of higher order. As such, the root node corresponds to a generator of an isogeny kernel (G0) having the highest order (order l6); the leaf nodes correspond to a plurality of generators ([l5]G0, [l4]G1, [l3]G2, [l2]G3, [l]G4, and G5) of isogeny kernels having the lowest order (order l). The intermediate nodes correspond to generators of isogeny kernels having intermediate orders (order li, where i is an integer and 2≤i≤5) associated with their respective levels in the tree. As shown in
In the example, the tree topology 400 further includes a plurality of edges representing a plurality of scalar multiplications 402 in a first direction and a plurality of point evaluations 404 in a second direction. Specifically, a scalar multiplication 402 in the first direction allows a computation of a point [lj+1]Gi 414 on an elliptic curve Ei by multiplying a point [ji]Gi 412 on the same elliptic curve Ei by [l] 402. A point evaluation 404 in the second direction for the isogeny ϕi 404 of degree l on the first point [ji]Gi 412 on the elliptic curve Ei allows the computation of a point [ji]Gi+1 416 on an elliptic curve Ei+1.
In the example, determining the isogeny ϕ of degree ln may be decomposed into computations of n isogenies ϕi of degree l. Here ϕ=ϕn−l∘ϕn−2∘ . . . ∘ϕ0, in which operation “∘” represents composition. In the example showing in
Specifically, the first generator [l]G0 of the first isogeny kernel of the first isogeny ϕ0 on a first elliptic curve E0 can be obtained by performing a scalar multiplication [l] on the generator G0 5 times. The first isogeny ϕ0 can be then determined according to the first generator [l5]G0 of the first isogeny kernel. The second generator [l4]G1 of a second isogeny kernel of a second isogeny ϕ1 on a second elliptic curve E1 can be determined by performing a point evaluation for the first isogeny ϕ0 on an image point [l4]G0. Here, ϕ0([l4]G0)=[l4]ϕ0(G0)=[l4]G1. The second isogeny ϕ1, can be then determined according to the second generator [l4]G1 of the second isogeny kernel. A third generator [l3]G2 of the third isogeny kernel of a third isogeny ϕ2 on the third elliptic curve E2 may be determined by performing a point evaluation for the isogeny ϕ0 on the point [l2]G0 and a point evaluation for the isogeny ϕ1 on the point [l2]G1 followed by a scalar multiplication [l] on the point [l2]G2. The third isogeny ϕ2 can be then determined according to the third generator [l3]G2 of the third isogeny kernel. A fourth generator [l2]G3 of a fourth isogeny kernel of a fourth isogeny ϕ3 on the fourth elliptic curve E3 can be determined by performing a point evaluation for the isogeny ϕ2 on the point [l2]G2. Here, ϕ2([l2]G2)=[l2]ϕ2(G2)=[l2]G3. The fourth isogeny ϕ3 can be then determined according to the fourth generator [l2]G3 of the fourth isogeny kernel. A fifth generator [l]G4 of the fifth isogeny kernel of the fifth isogeny ϕ4 on the fifth elliptic curve E4 is determined by performing a series of point evaluations for isogenies ϕ3, ϕ2, ϕ1, and ϕ0 to obtain the point G4. Here, G4=ϕ3ϕ2ϕ1ϕ0(G0) followed by a scalar multiplication [l] on the point G4. The fifth isogeny ϕ4 can be then determined according to the fifth generator [l1]G4 of the fifth isogeny kernel. A sixth generator G5 of a sixth isogeny kernel of a sixth isogeny ϕ5 on a sixth elliptic curve E5 can be then determined by performing a point evaluation for the fifth isogeny ϕ4 on the point G4. Here, G5=ϕ4(G4). The sixth isogeny ϕ5 can be then determined according to the sixth generator G5 of the sixth isogeny kernel.
In certain implementations, as shown in
In certain implementations, points evaluation operations for the same isogeny on points of the same elliptic curve are not required to be completed prior to exhausting the computational operations for deriving the generators of the isogeny kernels. Some of the point evaluations can be delayed to one or more later batches so as to efficiently accommodate limited computational resources (e.g., a number of cryptographic co-processors). In some implementations, if there are 2 point evaluation co-processors, the point evaluation for the isogeny ϕ0 on the generator G0 is performed in a separate, second batch after a first batch, which for example, may include a point evaluation for the isogeny ϕ0 on the points [l2]G0 by a first point evaluation co-processor and a point evaluation for the isogeny ϕ0 on the point [l4]G0 by a second point evaluation co-processor. In this case, the first batch includes 2 point evaluations with an identical domain and range. The domain is the first elliptic curve E0 and the range is the second elliptic curve E1.
In some implementations, a batch may include a point evaluation for a first isogeny ϕj and a point evaluation for a second isogeny ϕk, where j and k are integers and |j−k|≥2. For example, as shown in
In some implementations, the point evaluation for the second isogeny ϕ1 on the point G1 is performed in a batch, while the point evaluation for the second isogeny ϕ1 on the point [l2]G1 is performed in a separate batch. For example, the point evaluation for the isogeny ϕ1 on the point G1 is performed by the first point evaluation co-processor in a batch, which also includes the point evaluation for the third isogeny ϕ2 on the point [l2]G2 by the second point evaluation co-processor. Similarly, the point evaluation for the third isogeny ϕ2 on the point G2 can be performed in a batch while the point evaluation for the third isogeny ϕ2 on the point [l2]G2 can be performed in a separate batch. Using this method, computational operations for deriving the generators of the isogeny kernels may be prioritized over other cryptographic operations (e.g., point evaluations). Delaying certain point evaluations of the same isogeny to a later time (e.g., divide into separate batches) so that point evaluations for deriving the generators of the isogeny kernels can be prioritized may allow improved scheduling of computational resources for efficient parallel or multi-thread computing.
In some implementations, during the process of computing the low-order generators on the bottom row of the tree, other cryptographic operations that are not defined by the tree topology can be also performed by the cryptographic co-processors. For example, as discussed in
In some cases, the operations in the example process 500 shown in
In some cases, the operations in the example process 500 can be performed by nodes 202A 202B, representing two distinct entities in a supersingular isogeny-based cryptosystem. Each entity may correspond to a computing device, a computer system, an IP address or other network address, or another type of computer-readable identifier or instance of a computer resource. Accordingly, the computations and other operations of each entity may be performed by one or more processors or cryptographic co-processors as shown in
In some cases, the operations in the example process 500 can be a subroutine of a cryptographic process. For example, the operations in the example process 500 may be performed in a key generation process 212A, 212B or a shared secret derivation process 214A, 214B as shown in
At 502, a series of scalar multiplications [l] is performed on a generator G0 by 5 times to determine a first generator [l5]G0 of a first isogeny kernel. In some implementations, the generator G0 on a first elliptic curve E0 is defined as G0=P+[α]Q. Here, the pair of elliptic curve points {P, Q} is a public parameter of the supersingular isogeny-based cryptosystem, and a is a random integer (0≤α<ln). The random integer α is kept secret, as the secret key. The 5 scalar multiplications are performed in series by one or more scalar multiplication co-processors in the node. In some implementations, values of each point are stored in a memory of the node, for example a memory 110 as shown in
At 504, the first isogeny ϕ0 having a degree of l is determined according to the first generator [l5]G0 of the first isogeny kernel. In some implementations, operation 504 is performed by an image curve evaluation co-processor, for example the image curve evaluation co-processor 308 as shown in
At 506, a point evaluation of the first isogeny ϕ0 on the image point [l4]G0 is performed to determine a second generator [l4]G1 of a second isogeny kernel on a second elliptic curve E1. In some implementations, operation 506 is performed by a point evaluation co-processor.
At 508, the second isogeny ϕ1 having a degree of l is determined according to the second generator [l4]G0 of the second isogeny kernel. In some implementations, operation 508 is performed by an image curve evaluation co-processor, for example the image curve evaluation co-processor 308 as shown in
At 510, a point evaluation of the first isogeny ϕ0 on the image point [l2]G0 is performed to determine an image point [l2]G1 on the second elliptic curve E1. In some implementations, operation 510 is performed by a point evaluation co-processor.
In some implementations, operations 506, 510 can be performed by two separate point evaluation co-processors in a batch. In this case, the batch may further include 508.
At 512, a point evaluation of the second isogeny ϕ1 on the image point [l2]G1 is performed to determine an image point [l2]G2 on a third elliptic curve E2. In some implementations, operation 512 is performed by a point evaluation co-processor.
At 514, a scalar multiplication is performed on the image point [l2]G2 to determine a third generator [l3]G2 of a third isogeny kernel on the third elliptic curve E2. In some implementations, operation 514 is performed by a scalar multiplication co-processor.
At 516, the third isogeny ϕ2 having a degree of l is determined according to the third generator [l3]G2 of the third isogeny kernel. In some implementations, operation 516 is performed by an image curve evaluation co-processor, for example the image curve evaluation co-processor 308 as shown in
At 518, a point evaluation of the third isogeny ϕ2 on the image point [l2]G2 is performed to determine a fourth generator [l2]G3 of a fourth isogeny kernel on a fourth elliptic curve E3. In some implementations, operation 518 is performed by a point evaluation co-processor.
At 520, the fourth isogeny ϕ3 having a degree of l is determined according to the fourth generator [l2]G3 of the fourth isogeny kernel. In some implementations, operation 520 is performed by an image curve evaluation co-processor, for example the image curve evaluation co-processor 308 as shown in
At 522, a series of point evaluations of the first, second, and third isogenies ϕ0, ϕ1, ϕ2 is performed to determine an image point G3 on the fourth elliptic curve E3. In some implementations, the series of point evaluations are performed separately by one or more point evaluation co-processors. In some implementations, certain sub-operations in operation 522 can be performed in the same batch together with other point evaluations performed by one or more point evaluation co-processors. For example, the point evaluation of the first isogeny ϕ0 on the generator G0 in operation 522 and the point evaluation of the second isogeny ϕ1 on the point [l2]G1 in operation 512 may be performed by two separate point evaluation co-processors simultaneously in a batch. For another example, the point evaluation of the second isogeny ϕ1 on the image point G1 and the point evaluation of the third isogeny ϕ2 on the point[l2]G2 in operation 518 may be performed by two separate point evaluation co-processors simultaneously in a batch.
At 524, a point evaluation of the fourth isogeny α3 is performed on the image point G3 to determine an image point G4 on a fifth elliptic curve E4. In some implementations, operation 524 is performed by one point evaluation co-processor.
At 526, a scalar multiplication performed on the image point G4 to determine a fifth generator [l]G4 of a fifth isogeny kernel on the fifth elliptic curve E4. In some implementations, operation 526 is performed by a scalar multiplication co-processor.
At 528, the fifth isogeny ϕ4 having a degree of l is determined according to the fifth generator [l]G4 of the fifth isogeny kernel. In some implementations, operation 528 is performed by an image curve evaluation co-processor, for example the image curve evaluation co-processor 308 as shown in
At 530, a point evaluation of the fifth isogeny ϕ4 on the image point G4 is performed to obtain the sixth generator G5 of a sixth isogeny kernel on a sixth elliptic curve E5. In some implementations, operation 530 is performed by one point evaluation co-processor. In some implementations, the sixth isogeny ϕ5 can be determined according to the sixth generator G5. In some implementations, determining the sixth isogeny ϕ5 is performed by an image curve evaluation co-processor, for example the image curve evaluation co-processor 308 as shown in
In some implementations, during the process of computing the generators of the isogeny kernels with low order (l) on the bottom row of the tree, other cryptographic operations that are not defined in the tree topology can be also performed. For example, as discussed in
In some implementations, after obtaining the sixth isogeny ϕ5, the isogeny ϕ with a degree of ln may be determined using ϕ=ϕn−1∘ϕn−2∘ . . . ∘ϕ1∘ϕ0, in which operation “∘” represents composition.
In some implementations, the tree topology 600 defines operational steps and pathways to determine the values of generators (e.g., [l15]G0, [l14]G1, . . . , [l]G14, and G15) for the lower order isogeny kernels represented in the bottom row of the tree topology 600. In some cryptographic protocols, the generators of the isogeny kernels may be used to determine isogenies of lower degrees (l). In certain implementations, the isogenies with lower degrees (e.g., ϕ15, ϕ14, . . . , ϕ1, ϕ0) may be used to apply or evaluate the isogeny ϕ (e.g., ϕA for node 202A and ϕB for node 202B) with a degree of ln, for example, in the context of generating a shared secret, generating the public key of a communication node (e.g., nodes 202A, 202B), verifying a public key received from a different communication node via a communication channel or other contexts.
In some implementations, the tree topology 600 is pre-configured by a program stored in a memory of a node and executed by a processor or cryptographic co-processors of the respective node. In some implementations, the tree topology 600 is used in various steps of a cryptographic protocol. For example, the same tree topology can be used in generating keys at 212A, 212B, and the same tree topology can be used in verifying a public key and derive shared secret at 214A, 214B. In some implementations, the tree topology 600 is shared between nodes 202A, 202B. In some implementations, the tree topology 600 defined by lAn (e.g., E[2n]) is used by one node (e.g., 202A) and a different tree topology defined by lBm (e.g., E[3m]) is used by the other node (e.g., 202B).
The example tree topology 600 includes nodes connected by edges. The one hundred-and-thirty-six nodes in the tree topology 600 include a root node (which resides in the top level of the tree topology 600 and has no parent node), sixteen leaf nodes (which reside in the bottom level of the tree topology 600 and have no child nodes) and a hundred and nineteen intermediate nodes between the root node and the leaf nodes. The nodes in the tree topology correspond to generators of isogeny kernels. The nodes in higher levels of the tree correspond to generators of isogeny kernels of higher order. As such, the root node corresponds to a generator of an isogeny kernel (G0) having the highest order (order l16); the leaf nodes correspond to a plurality of generators (e.g., [l16−i−1]Gi, i=0, . . . , 15) of isogeny kernels having the lowest order (order l). The intermediate nodes correspond to generators of isogeny kernels having intermediate orders (order li, where i is an integer and 2≤i≤15) associated with their respective levels in the tree. As shown in
In the example, the tree topology 600 includes a plurality of edges representing a plurality of scalar multiplications 602 in a first direction and a plurality of point evaluations 604 in a second direction. Specifically, a scalar multiplication 602 in the first direction determines a first image point 614 [lj+1]Gk on an elliptic curve Ek based on a second image point [lj]Gk 612 on the same elliptic curve Ek. A point evaluation 604 in the second direction for the isogeny ϕk having a degree of l determines a third image point [lj]Gk+1 616 on an elliptic curve Ek+1 based on the second point [lj]Gk 612 on the elliptic curve Ek. Here, j=16−k−i, k=0, 1, . . . , 15, and i=16−k, . . . , 1.
In the example, determining the isogeny ϕ having a degree of l16 may be decomposed into computations of 16 isogenies ϕk each having a degree of l. Here ϕ=ϕ15 ∘ϕ14∘ϕ13 . . . ϕ1∘ϕ0, wherein each of the isogenies ϕk can be determined using their corresponding generators [l16−k−1]Gk of the isogeny kernels. Here, k=0, 1, . . . 15.
Specifically, a first generator [l15]G0 of a first isogeny kernel on a first elliptic curve E0 can be obtained by performing a scalar multiplication [l] on the generator G0 15 times. A first isogeny ϕ0 can be then determined according to the first generator [l15]G0 of the first isogeny kernel. A second generator [l14]G1 of a second isogeny kernel on a second elliptic curve E1 can be determined by performing a point evaluation for the first isogeny ϕ0 on a point [l14]G0. Here, ϕ0([l14]G0)=[l14]ϕ0(G0)=[l14]G1. A second isogeny ϕ1 can be then determined according to the second generator [l14]G1 of the second isogeny kernel. A third generator [l13]G2 of a third isogeny kernel may be determined by performing a point evaluation for the first isogeny ϕ0 on an image point [l12]G0 and a point evaluation for the second isogeny ϕ1 on an image point [l12]G1 followed by a scalar multiplication [l] on the image point [l12]G2. A third isogeny ϕ2 can be then determined according to the third generator [l13]G2 of the third isogeny kernel on a third elliptic curve E2. A fourth generator [l12]G3 of a fourth isogeny kernel can be determined by performing a point evaluation for the third isogeny ϕ2 on the image point [l12]G2. Here, ϕ2([l12]G2)=[l12]ϕ2(G2)=[l12]G3. A fourth isogeny ϕ3 can be then determined according to the fourth generator [l12]G3 of the fourth isogeny kernel.
In the example tree topology 600 shown in
To further compute the fifth generator [l11]G4, a scalar multiplication [l] is performed on the image point [l8]G4 3 times. A fifth isogeny ϕ4 can be then determined according to the fifth generator [l11]G4 of the fifth isogeny kernel. A sixth generator [l10]G5 of a sixth isogeny kernel on a sixth elliptic curve E5 can be determined by performing a point evaluation for the fifth isogeny ϕ4 on an image point [l10]G4. Here, ϕ4([l10]G4)=[l10]ϕ4(G4)=[l10]G5. A sixth isogeny ϕ5 can be then determined according to the sixth generator [l10]G5 of the sixth isogeny kernel.
A seventh generator [l9]G6 of a seventh isogeny kernel may be determined by performing a point evaluation for the fifth isogeny ϕ4 on an image point [l8]G4 and a point evaluation for the sixth isogeny ϕ5 on an image point [l8]G5 followed by a scalar multiplication [l] on an image point [l8]G6. A seventh isogeny ϕ6 can be then determined according to the seventh generator [l9]G6 of the seventh isogeny kernel on a seventh elliptic curve E7. An eighth generator [l8]G7 of an eighth isogeny kernel can be determined by performing a point evaluation for the seventh isogeny ϕ6 on the image point [l8]G6. Here, ϕ6([l8]G6)=[l8]ϕ6(G6)=[l8]G7. An eighth isogeny ϕ7 can be then determined according to the eighth generator [l8]G7 of the eighth isogeny kernel on an eighth elliptic curve E8.
In the example tree topology 600 shown in
In certain implementations, as shown in
In some implementations, a node, for example Nodes 202A 202B as shown in
In certain implementations, points evaluation operations for the same isogeny on points of the same elliptic curve are not required to be completed prior to exhausting the computational operations for deriving the generators of the isogeny kernels. Some of the point evaluations can be delayed to one or more later batches so as to efficiently accommodate limited computational resources (e.g., a number of cryptographic co-processors). For example, assuming there are 2 point evaluation co-processors, the point evaluation for the first isogeny ϕ0 on the image point [l8]G0 and the point evaluation for the first isogeny ϕ0 on the point G0 may be performed in a batch after the second generator [l14]G1 of the second isogeny kernel is determined. In this case, the batch includes 2 point evaluations with an identical domain and range. The domain is the first elliptic curve E0 and the range is the second elliptic curve E1. For another example, the point evaluation for the third isogeny ϕ2 on the point G2 may be performed after the fourth generator [l12]G3 of the fourth isogeny kernel is determined.
In some implementations, a batch may include a point evaluation for a first isogeny ϕj and a point evaluation for a second isogeny ϕk, where j and k are integers and |j−k|≥2. For example, as shown in
In some implementations, point evaluations for the same isogeny on points on the same elliptic curve may be performed in separate batches. In some implementations, point evaluations for the same isogeny on points that are located closer to the generators of the isogeny kernels at the bottom of the tree topology have a higher priority over the point evaluations for the same isogeny on points that are located closer to the point G0 at the top of the tree topology. For example, the point evaluation for the second isogeny ϕ1 on the point G1 may be performed by a point evaluation co-processor in a batch, while the point evaluation for the second isogeny ϕ1 on the image point [l8]G1 may be performed by a point evaluation co-processor in an earlier batch. Using this method, computational operations for computing the generators of the isogeny kernels is prioritized over other cryptographic operations (e.g., point evaluations). Delaying certain point evaluations of the same isogeny to a later time (e.g., divide into separate batches) so that point evaluations for computing the generators of the isogeny kernels can be prioritized provides advantages such as, for example improved scheduling of computational resources for efficient parallel or multi-thread computing (e.g., multi-thread software or multi-thread hardware).
In some implementations, during the process of computing the generators of the isogeny kernels represented in the bottom row of the tree topology 600 as shown in
In some implementations, after obtaining the sixteenth isogeny ϕ15, the isogeny ϕ with a degree of l16 may be determined using ϕ=ϕ15∘ϕ14∘ . . . ∘ϕ1∘ϕ0, in which operation “∘” represents composition.
In some implementations, the tree topology 700 defines operational steps and pathways to determine the values of generators (e.g., [l10]G0, [l9]G1, . . . , [l]G9, and G10) for the lower order isogeny kernels represented in the bottom row of the tree topology 700. In some cryptographic protocols, the generators of the isogeny kernels may be used to determine isogenies of lower degrees (l). In certain implementations, the isogenies with lower degrees (e.g., ϕ10, ϕ9, . . . , ϕ1, ϕ0) may be used to apply or evaluate the isogeny ϕ (e.g., ϕA for node 202A and ϕB for node 202B) with a degree of ln, for example, in the context generating the public key of a communication node (e.g., nodes 202A, 202B), verifying a public key received from a different communication node via a communication channel or other contexts.
In some implementations, the tree topology 700 is pre-configured by a program stored in a memory of a node and executed by a processor or cryptographic co-processors of the respective node. In some implementations, the tree topology 700 is used in various steps of a cryptographic protocol. For example, the same tree topology can be used in generating keys at 212A, 212B, and the same tree topology can be used in verifying a public key and derive shared secret at 214A, 214B, as shown in
The example tree topology 700 includes nodes connected by edges. The sixty-six nodes in the tree topology 700 include a root node (which resides in the top level of the tree topology 700 and has no parent node), eleven leaf nodes (which reside in the bottom level of the tree topology 700 and have no child nodes) and fifty five intermediate nodes between the root node and the leaf nodes. The nodes in the tree topology correspond to generators of isogeny kernels. The nodes in higher levels of the tree correspond to generators of isogeny kernels of higher order. As such, the root node corresponds to a generator of an isogeny kernel (G0) having the highest order (order l11); the leaf nodes correspond to a plurality of generators (e.g., [l10−i]Gi, i=0, . . . , 10) of isogeny kernels having the lowest order (order l). The intermediate nodes correspond to generators of isogeny kernels having intermediate orders (order li, where i is an integer and 2≤i≤10) associated with their respective levels in the tree. As shown in
In the example, the tree topology 700 includes a plurality of edges representing a plurality of scalar multiplications 702 in a first direction and a plurality of point evaluations 704 in a second direction. Specifically, a scalar multiplication 702 in the first direction determines a first image point [lj+1]Gk 714 on an elliptic curve Ek based on a second image point [lj]Gk 712 on the same elliptic curve Ek. A point evaluation 704 in the second direction for the isogeny ϕ15−k having a degree of l on the first image point [lj]Gk 712 on the elliptic curve Ek determines a third image point [lj]Gk+1 716 on an elliptic curve Ek+1.Here, j=11−k−i, k=0, 1, . . . , 11, and i=11−k, . . . , 1.
In the example, determining the isogeny ϕ having a degree of l11 may be decomposed into computations of 11 isogenies ϕk each having a degree of l. Here ϕ=ϕ10∘ϕ9 . . . ϕ1 ∘ϕ, wherein each of the isogenies ϕk can be determined using their corresponding generators [l10−k]Gk of the isogeny kernels. Here, k=0, 1, . . . 10.
Specifically, a first generator [l10]G0 of a first isogeny kernel on a first elliptic curve E0 can be obtained by performing a scalar multiplication [l] on the generator G0 10 times. A first isogeny ϕ0 can be then determined according to the first generator [l10]G0 of the first isogeny kernel. A second generator [l9]G1 of a second isogeny kernel on a second elliptic curve E1 can be determined by performing a point evaluation for the first isogeny ϕ0 on the point [l9]G0. Here, ϕ0([l9]G0)=[l9]ϕ0(G0)=[l9]G1. A second isogeny ϕ1, can be then determined according to the second generator [l9]G1 of the second isogeny kernel.
A third generator [l8]G2 of a third isogeny kernel may be determined by performing a point evaluation for the first isogeny ϕ0 on the image point [l7]G0 and a point evaluation for the second isogeny ϕ1 on the image point [l7]G1 followed by a scalar multiplication [l] on the image point [l7]G2. A third isogeny ϕ2 can be then determined according to the third generator [l8]G2 of the third isogeny kernel on a third elliptic curve E2. A fourth generator [l7]G3 of a fourth isogeny kernel can be determined by performing a point evaluation for the third isogeny ϕ2 on the image point [l7]G2. Here, ϕ2([l7]G2)=[l7]ϕ2(G2)=[l7]G3. A fourth isogeny ϕ3 can be then determined according to the fourth generator [l7]G3 of the fourth isogeny kernel on a fourth elliptic curve E3.
In the example tree topology 700 shown in
A sixth generator [l5]G5 of a sixth isogeny kernel on a sixth elliptic curve E5 can be determined by performing a point evaluation for the fifth isogeny ϕ4 on the image point [l4]G4. Here, ϕ4([l4]G4)=[l4]ϕ4(G4)=[l4]G5 followed by a scalar multiplication [l] on the image point [l4]G5. The sixth isogeny ϕ5 can be then determined according to the sixth generator [l5]G5 of the sixth isogeny kernel. A point evaluation for the sixth isogeny ϕ5 is performed on the image point [l4]G5 on the sixth elliptic curve E5 to obtain a seventh generator [l4]G6 of the seventh isogeny kernel. A seventh isogeny ϕ6 can be then determined according to the seventh generator [l4]G6 of the seventh isogeny kernel.
As discussed above in
As shown in the example tree topology 700, the “zigzag” pathway 720 includes alternating cryptographic operations coupled by one or more corner points. In some implementations, a corner point is obtained through only one cryptographic operation on only one point and is only used to determine another point through a different cryptographic operation. For example, as shown in
In some implementations, one type of cryptographic operation terminates at a corner point, which is not any one of the generators of any isogeny kernels. For example, the scalar multiplication to determine the first corner point [l]G1 terminates at the first corner point [l]G1. Similarly, the series of point evaluations to determine the second corner point [l]G6 terminates at the second corner point [l]G6, and the scalar multiplication to determine the third corner point [l2]G6 terminates at the third corner point [l2]G6.
In some implementations, a “zigzag” path may contain 3 corner points different from the corner points in the “zigzag” path 720 shown in
Finally, a tenth generator [l]G9 is determined through a series of point evaluations for the isogenies ϕ1, ϕ2, ϕ3, ϕ4, ϕ5, ϕ6, ϕ7, ϕ8 to determine a point G9 followed by a scalar multiplication [l] on the image point G9. A tenth isogeny ϕ9 can be then determined according to the tenth generator [l]G9 of the tenth isogeny kernel. A point evaluation for the tenth isogeny ϕ9 is performed on the point G9 on the tenth elliptic curve E9 to obtain an eleventh generator G10 of an eleventh isogeny kernel. An eleventh isogeny ϕ10 can be then determined according to the eleventh generator [l]G9 of the eleventh isogeny kernel. In some implementations, after obtaining the eleventh isogeny ϕ11, the isogeny ϕ with a degree of l11 may be determined using ϕ=ϕ10∘ϕ9∘ . . . ∘ϕ1∘ϕ0, in which the operation “∘” represents composition.
In certain implementations, as shown in
In some implementations, a computer device, for example nodes 202A 202B as shown in
In certain implementations, points evaluation operations for the same isogeny on points of the same elliptic curve are not required to be completed prior to exhausting the computational operations for determining the generators of the isogeny kernels. Some of the point evaluations can be delayed or combined with other point evaluations in later batches so as to efficiently accommodate limited computational resources (e.g., two point evaluation co-processors). For example, the point evaluation for the first isogeny ϕ0 on the point [l4]G0 and the point evaluation for the first isogeny ϕ0 on the point G0 may be performed after the second generator [l9]G1 of the second isogeny kernel may be determined. For another example, the point evaluation for the third isogeny ϕ2 on the image point [l]G3 is performed after the fourth generator [l7]G3 of the fourth isogeny kernel may be determined.
In some implementations, a batch may include a point evaluation for a first isogeny ϕj and a point evaluation for a second isogeny ϕk, where j and k are integers and |j−k|≥2. For example, as shown in
In some implementations, a batch may include two scalar multiplications performed by two scalar multiplication co-processors. For example, the scalar multiplication to determine the first corner point [l]G1 based on the image point G1 can be performed in a batch with the scalar multiplication to determine the third generator [l8]G2 based on the image point [l7]G2.
In some implementations, point evaluations for the same isogeny on points on the same elliptic curve may be performed in separate batches. In some implementations, point evaluations for the same isogeny on points that are located closer to the generators of the isogeny kernels at the bottom of the tree topology have a higher priority over the point evaluations for the same isogeny on points that are located closer to the generator G0 at the top of the tree topology (the root node of the tree topology). For example, the point evaluation for the first isogeny ϕ0 on the image point [l4]G2 may be performed by a point evaluation co-processor in a batch, while the point evaluation for the first isogeny ϕ0 on the image point [l7]G0 is performed by a point evaluation co-processor in an earlier batch. Using this method, computational operations for computing the generators of the isogeny kernels is prioritized over other cryptographic operations (e.g., point evaluations). Delaying certain point evaluations of the same isogeny to a later time (e.g., divide into separate batches) so that point evaluations for computing the generators of the isogeny kernels can be prioritized provides advantages such as, for example improved scheduling of computational resources for efficient parallel or multi-thread computing.
In some implementations, during the process of computing the generators of the isogeny kernels represented in the bottom row of the tree topology 700 as shown in
In some implementations, the tree topology 800 defines operational steps and pathways to determine the values of the generators (e.g., [l15]G0, [l14]G1, . . . , [l]G14, and G15) for the lower order isogeny kernels represented in the bottom row of the tree topology 800. In some cryptographic protocols, the generators of the isogeny kernels may be used to determine isogenies of lower degrees (l). In certain implementations, the isogenies with lower degrees (e.g., ϕ15, ϕ14, . . . , ϕ1, ϕ0) may be used to apply or evaluate the isogeny ϕ (e.g., ϕA for node 202A and ϕB for node 202B) with a degree of ln, for example, in the context generating the public key of a communication node (e.g., nodes 202A, 202B), verifying a public key received from a different communication node via a communication channel or other contexts.
In some implementations, the tree topology 800 is pre-configured by a program stored in a memory of a computer device and executed by a processor or cryptographic co-processors of the respective node. In some implementations, the tree topology 800 is used in various steps of a cryptographic protocol. For example, the same tree topology can be used in generating keys at 212A, 212B, and the same tree topology can be used in verifying a public key and derive shared secret at 214A, 214B. In some implementations, the tree topology 800 is shared between node 202A, 202B. In some other implementations, the tree topology 800 defined by lAn (e.g., E[2n]) is used by one node (e.g., 202A) and a different tree topology defined by lBm (e.g., E[3m]) is used by the other node (e.g., 202B).
The example tree topology 800 includes nodes connected by edges. The one hundred-and-thirty-six nodes in the tree topology 800 include a root node (which resides in the top level of the tree topology 800 and has no parent node), sixteen leaf nodes (which reside in the bottom level of the tree topology 800 and have no child nodes) and a hundred and nineteen intermediate nodes between the root node and the leaf nodes. The nodes in the tree topology correspond to generators of isogeny kernels. The nodes in higher levels of the tree correspond to generators of isogeny kernels of higher order. As such, the root node corresponds to a generator of an isogeny kernel (G0) having the highest order (order l16); the leaf nodes correspond to a plurality of generators (e.g., [l16−i−1]Gi, i=0, . . . , 15) of isogeny kernels having the lowest order (order l). The intermediate nodes correspond to generators of isogeny kernels having intermediate orders (order li, where i is an integer and 2≤i≤15) associated with their respective levels in the tree. As shown in
In the example, the tree topology 800 includes a plurality of edges representing a plurality of scalar multiplications 802 in a first direction and a plurality of point evaluations 804 in a second direction. Specifically, a scalar multiplication 802 in the first direction determines a first image point [lj+1]Gk 814 on an elliptic curve Ek based on a second image point [lj]Gk 812 on the same elliptic curve Ek. A point evaluation 804 in the second direction for the isogeny ϕ15−k on the second image point [lj]Gk 812 on the elliptic curve Ek determines a third image point [lj]Gk+1 816 on an elliptic curve Ek+1. Here, j=16−k−i, k=0, 1, . . . , 15, and i=16−k, . . . , 1.
In the example, determining the isogeny ϕ having a degree of l16 may be decomposed into computations of 16 isogenies ϕk each having a degree of l. Here ϕ=ϕ15∘ϕ14∘ϕ13 . . . ϕ1∘ϕ0, wherein each of the isogenies ϕk can be determined using their corresponding generators [l15−k]Gk of the isogeny kernels. Here, k=0, 1, . . . 15.
Specifically, a first generator [l15]G0 of a first isogeny kernel on a first elliptic curve E0 can be obtained by performing a scalar multiplication [l] on the generator G0 15 times. A first isogeny ϕ0 can be then determined according to the first generator [l15]G0 of the first isogeny kernel. A second generator [l14]G1 of a second isogeny kernel on a second elliptic curve E1 can be determined by performing a point evaluation for the first isogeny ϕ0 on the image point [l13]G0 followed by a scalar multiplication [l] on the image point [l13]G1. Here, ϕ0([l13]G0)=[l13]ϕ0(G0)=[l13]G1. A second isogeny ϕ1, can be then determined according to the second generator [l14]G1 of the second isogeny kernel. A third generator [l13]G2 of the third isogeny may be determined by performing a point evaluation for the second isogeny ϕ1 on the image point [l13]G1. A third isogeny ϕ2 can be then determined according to the third generator [l13]G2 of the third isogeny kernel.
A fourth generator [l12]G3 of a fourth isogeny kernel on a fourth elliptic curve E3 can be determined by performing a series of point evaluations for the isogenies ϕ0, ϕ1, ϕ2 on the image point [l11]G0 followed by a scalar multiplication [l] on the image point [l11]G3. A fourth isogeny ϕ3 can be then determined according to the fourth generator [l12]G3 of the fourth isogeny kernel. A fifth generator [l11]G4 of the fifth isogeny kernel may be determined by performing a point evaluation for the fourth isogeny ϕ3 on the image point [l11]G3. A fifth isogeny ϕ4 can be then determined according to the fifth generator [l11]G4 of the fifth isogeny kernel.
A sixth generator [l10]G5 of a sixth isogeny kernel on a sixth elliptic curve E5 can be determined by performing a series of point evaluations for the isogenies ϕ0, ϕ1, ϕ2 ϕ3, ϕ4, on the image point [l9]G0 followed by a scalar multiplication [l] on the image point [l9]G5. The sixth isogeny ϕ5 can be then determined according to the sixth generator [l10]G5 of the sixth isogeny kernel. A seventh generator [l9]G6 of the seventh isogeny kernel may be determined by performing a point evaluation for the sixth isogeny ϕ5 on the image point [l9]G5. A seventh isogeny ϕ6 can be then determined according to the seventh generator [l9]G6 of the seventh isogeny kernel.
As discussed above in
A ninth generator [l7]G8 of a ninth isogeny kernel may be determined by performing a point evaluation for the eighth isogeny ϕ7 on the point [l7]G7. A ninth isogeny ϕ8 can be then determined according to the ninth generator [l7]G8 of the ninth isogeny kernel. A tenth generator [l6]G9 of the tenth isogeny kernel on a tenth elliptic curve E9 may be determined by a series of point evaluations for the isogenies ϕ6, ϕ7, ϕ8 on the image point [l6]G6. A tenth isogeny ϕ9 can be then determined according to the tenth generator [l6]G9 of the tenth isogeny kernel.
In the example tree topology 800 shown in
A twelfth generator [l4]G11 may be determined by performing a point evaluation for the eleventh isogeny ϕ10 on the image point [l4]G10. A twelfth isogeny ϕ11 can be then determined according to the twelfth generator [l4]G11 of the twelfth isogeny kernel. A thirteenth generator [l3]G12 of the thirteenth isogeny kernel on a thirteenth elliptic curve E12 may be determined by a series of point evaluations for the isogenies ϕ10, ϕ11, on the image point [l3]G10. A thirteenth isogeny ϕ12 can be then determined according to the thirteenth generator [l3]G12 of the thirteenth isogeny kernel.
As discussed above in
A series of point evaluations for the isogenies ϕ10, ϕ11, ϕ12 on the image point G10 is further performed to obtain the point G13 on the fourteenth elliptic curve E13. A scalar multiplication [l] is performed on the point G13 to obtain a corner point [l]G13. A point evaluation for the isogeny ϕ13 is performed on the corner point [l]G13 to obtain a fifteenth generator [l]G14 of the fifteenth isogeny kernel. A fifteenth isogeny ϕ14 can be then determined according to the fifteenth generator [l]G14 of the fifteenth isogeny kernel.
A series of point evaluations for the isogenies ϕ13, ϕ14 on the point G13 is performed to obtain a sixteenth generator G15 of the sixteenth isogeny kernel. A sixteenth isogeny ϕ15 can be then determined according to the sixteenth generator G15 of the sixteenth isogeny kernel.
In some implementations, a tree topology may include a plurality of “zigzag” paths, each of which may contain at least one corner point. For example, the example tree topology includes 3 “zigzag” paths 820, 822, 824. Each of the three “zigzag” pathways in the tree topology 800 shown in
In some implementations, one type of cryptographic operation terminates at a corner point, which is not any one of the generators of any isogeny kernels. For example, the scalar multiplication to determine the first corner point [l7]G6 terminates at the first corner point [l7]G6. Similarly, the series of point evaluations to determine the second corner point [l3]G10 terminates at the second corner point [l3]G10, and the scalar multiplication to determine the third corner point [l]G13 terminates at the third corner point [l]G13.
In certain implementations, as shown in
In some implementations, a node, for example nodes 202A 202B as shown in
In certain implementations, point evaluation operations for the same isogeny on points of the same elliptic curve are not required to be completed prior to exhausting the computational operations for determining the generators of the isogeny kernels. Some of the point evaluations can be delayed or combined with other point evaluations in later batches so as to efficiently accommodate limited computational resources (e.g., three point evaluation co-processors). For example, the point evaluations for the second isogeny ϕ1 on the nodes [l3]G1 and G1 are performed after the third generator [l13]G2 of the third isogeny kernel is determined. For another example, the point evaluations for the fourth isogeny ϕ3 on the nodes [l3]G3 and G3 are performed after the fifth generator [l11]G4 of the fifth isogeny kernel is determined.
In some implementations, a batch may include a point evaluation for a first isogeny ϕj and a point evaluation for a second isogeny ϕk, where j and k are integers and |j−k|≥2. For example, as shown in
In some implementations, a batch may include 2 scalar multiplications performed by 2 scalar multiplication co-processors. For example, the scalar multiplication on the image point G10 to determine the image point [l]G10 performed by a first scalar multiplication co-processor can be in the same batch with the scalar multiplication on the image point [l3]G10 to determine the image point [l4]G10 performed by a second scalar multiplication co-processor. For another example, the scalar multiplication on the image point [l]G10 to determine the image point [l2]G10 performed by the first scalar multiplication co-processor can be in the same batch with the scalar multiplication on the image point [l4]G10 to determine the eleventh generator [l5]G10 of the eleventh isogeny kernel performed by the second scalar multiplication co-processor.
In some implementations, point evaluations for the same isogeny on points on the same elliptic curve may be performed in separate batches. In some implementations, point evaluations for the same isogeny on points that are located closer to the generators of the isogeny kernels at the bottom of the tree topology have a higher priority over the point evaluations for the same isogeny on points that are located closer to the point G0 at the top of the tree topology. Using this method, computational operations for computing the generators of the isogeny kernels is prioritized over other cryptographic operations (e.g., point evaluations). Delaying certain point evaluations of the same isogeny to a later time (e.g., divide into separate batches) so that point evaluations for computing the generators of the isogeny kernels can be prioritized provides advantages such as, for example improved scheduling of computational resources for efficient parallel or multi-thread computing.
In some implementations, during the process of computing the generators of the isogeny kernels represented in the bottom row of the tree topology 800 as shown in
In some implementations, after obtaining the sixteenth isogeny ϕ15, the isogeny ϕ with a degree of l16 may be determined using ϕ=ϕ15∘ϕ14∘ . . . ∘ϕ1∘ϕ0, in which the operation “∘” represents composition.
Some of the subject matter and operations described in this specification can be implemented in digital electronic circuitry, or in computer software, firmware, or hardware, including the structures disclosed in this specification and their structural equivalents, or in combinations of one or more of them. Some of the subject matter described in this specification can be implemented as one or more computer programs, e.g., one or more modules of computer program instructions, encoded on a computer storage medium for execution by, or to control the operation of, data-processing apparatus. A computer storage medium can be, or can be included in, a computer-readable storage device, a computer-readable storage substrate, a random or serial access memory array or device, or a combination of one or more of them. Moreover, while a computer storage medium is not a propagated signal, a computer storage medium can be a source or destination of computer program instructions encoded in an artificially generated propagated signal. The computer storage medium can also be, or be included in, one or more separate physical components or media (e.g., multiple CDs, disks, or other storage devices).
Some of the operations described in this specification can be implemented as operations performed by a data processing apparatus on data stored on one or more computer-readable storage devices or received from other sources.
The term “data-processing apparatus” encompasses all kinds of apparatus, devices, and machines for processing data, including by way of example a programmable processor, a computer, a system on a chip, or multiple ones, or combinations, of the foregoing. The apparatus can include special purpose logic circuitry, e.g., an FPGA (field programmable gate array) or an ASIC (application specific integrated circuit). The apparatus can also include, in addition to hardware, code that creates an execution environment for the computer program in question, e.g., code that constitutes processor firmware, a protocol stack, a database management system, an operating system, a cross-platform runtime environment, a virtual machine, or a combination of one or more of them.
A computer program (also known as a program, software, software application, script, or code) can be written in any form of programming language, including compiled or interpreted languages, declarative or procedural languages, and it can be deployed in any form, including as a stand-alone program or as a module, component, subroutine, object, or other unit suitable for use in a computing environment. A computer program may, but need not, correspond to a file in a file system. A program can be stored in a portion of a file that holds other programs or data (e.g., one or more scripts stored in a markup language document), in a single file dedicated to the program, or in multiple coordinated files (e.g., files that store one or more modules, sub programs, or portions of code). A computer program can be deployed to be executed on one computer or on multiple computers that are located at one site or distributed across multiple sites and interconnected by a communication network.
Some of the processes and logic flows described in this specification can be performed by one or more programmable processors executing one or more computer programs to perform actions by operating on input data and generating output. The processes and logic flows can also be performed by, and apparatus can also be implemented as, special purpose logic circuitry, e.g., an FPGA (field programmable gate array) or an ASIC (application specific integrated circuit).
Processors suitable for the execution of a computer program include, by way of example, both general and special purpose microprocessors, and processors of any kind of digital computer. Generally, a processor will receive instructions and data from a read-only memory or a random-access memory or both. Elements of a computer can include a processor that performs actions in accordance with instructions, and one or more memory devices that store the instructions and data. A computer may also include, or be operatively coupled to receive data from or transfer data to, or both, one or more mass storage devices for storing data, e.g., non-magnetic drives (e.g., a solid-state drive), magnetic disks, magneto optical disks, or optical disks. However, a computer need not have such devices. Moreover, a computer can be embedded in another device, e.g., a phone, an electronic appliance, a mobile audio or video player, a game console, a Global Positioning System (GPS) receiver, an Internet-of-Things (IoT) device, a machine-to-machine (M2M) sensor or actuator, or a portable storage device (e.g., a universal serial bus (USB) flash drive). Devices suitable for storing computer program instructions and data include all forms of non-volatile memory, media and memory devices, including by way of example semiconductor memory devices (e.g., EPROM, EEPROM, flash memory devices, and others), magnetic disks (e.g., internal hard disks, removable disks, and others), magneto optical disks, and CD ROM and DVD-ROM disks. In some cases, the processor and the memory can be supplemented by, or incorporated in, special purpose logic circuitry.
To provide for interaction with a user, operations can be implemented on a computer having a display device (e.g., a monitor, or another type of display device) for displaying information to the user and a keyboard and a pointing device (e.g., a mouse, a trackball, a tablet, a touch sensitive screen, or another type of pointing device) by which the user can provide input to the computer. Other kinds of devices can be used to provide for interaction with a user as well; for example, feedback provided to the user can be any form of sensory feedback, e.g., visual feedback, auditory feedback, or tactile feedback; and input from the user can be received in any form, including acoustic, speech, or tactile input. In addition, a computer can interact with a user by sending documents to and receiving documents from a device that is used by the user; for example, by sending web pages to a web browser on a user's client device in response to requests received from the web browser.
A computer system may include a single computing device, or multiple computers that operate in proximity or generally remote from each other and typically interact through a communication network. Examples of communication networks include a local area network (“LAN”) and a wide area network (“WAN”), an inter-network (e.g., the Internet), a network including a satellite link, and peer-to-peer networks (e.g., ad hoc peer-to-peer networks). A relationship of client and server may arise by virtue of computer programs running on the respective computers and having a client-server relationship to each other.
In a general aspect of what is described above, a supersingular isogeny-based cryptography process is performed.
In a first example, a cryptographic element is generated by executing a supersingular isogeny-based cryptography protocol. Executing the supersingular isogeny-based cryptography protocol includes computing a generator of a first isogeny kernel and traversing a tree topology. The tree topology includes nodes and edges coupling the nodes.
The edges of the tree topology include a first set of edges representing scalar multiplications and a second set of edges representing point evaluations. A plurality of isogeny kernels, which correspond to respective nodes (e.g., leaf nodes or another subset of nodes) in the tree topology and have a lower order than the first isogeny kernel, are computed using a plurality of cryptographic co-processors (e.g., point evaluation co-processors 304, scalar multiplication co-processors 306, and image curve evaluation co-processors 308 as shown in
Implementations of the first example may include one or more of the following features. The lower order of each of the plurality of isogeny kernels may be 2, 3, or 4. Computing the generator of the first isogeny kernel further includes computing a coordinate of the generator. Using the plurality of cryptographic co-processors includes using a plurality of scalar multiplication co-processors and a plurality of point evaluation co-processors to execute the batches. At least one of the batches includes two or more of the scalar multiplications represented in the tree topology and two or more point evaluations. At least one of the batches includes two or more of the point evaluations represented in the tree topology, e.g., a point evaluation for the isogeny ϕ0 on the points [l2]G0 by a first point evaluation co-processor and a point evaluation for the isogeny ϕ0 on the point [l4]G0 by a second point evaluation co-processor as shown in
In a second example, a computing system includes one or more processors, a plurality of cryptographic co-processors and a computer-readable medium storing instructions that are operable when executed by the one or more processors to perform one or more operations of the first example.
In a third example, a non-transitory computer-readable medium stores instructions that are operable when executed by data processing apparatus to perform operations of the first example.
In a fourth example, a cryptographic element is generated by executing a supersingular isogeny-based cryptography protocol. Executing the supersingular isogeny-based cryptography protocol includes computing a generator of a first isogeny kernel and traversing a tree topology. The tree topology includes nodes and edges between the nodes. The edges of the tree topology include a first set of edges representing scalar multiplications and a second set of edges representing point evaluations. A plurality of isogeny kernels, which correspond to respective nodes (e.g., leaf nodes or another subset of nodes) in the tree topology and have a lower order than the first isogeny kernel, are computed by traversing a zigzag path through the tree topology. The zigzag path includes a series of one or more operations (e.g., a series of scalar multiplications, a series of point evaluations) that terminates at a node above the leaf nodes in the tree topology. The cryptographic element can then be used to execute cryptographic correspondence between the first entity and a second entity (e.g., between “Alice” and “Bob” as shown in
Implementations of the fourth example may include one or more of the following features. The lower order of each of the plurality of isogeny kernels may be 2, 3, or 4. Computing the generator of the first isogeny kernel further includes computing a coordinate of the generator. The zigzag path can further include a series of one or more point evaluations after the series of one or more scalar multiplications. The series of one or more point evaluations may terminate at a node above the respective leaf nodes in the tree topology. The cryptography protocol corresponds to a supersingular isogeny key exchange (SIKE) or a supersingular isogeny Diffie-Hellman (SIDH) protocol. The cryptographic element is a public key of the first entity (e.g., “Alice” as shown in
In a fifth example, a computing system includes one or more processors and a computer-readable medium storing instructions that are operable when executed by the one or more processors to perform one or more operations of the fourth example.
In a sixth example, a non-transitory computer-readable medium stores instructions that are operable when executed by data processing apparatus to perform operations of the fourth example.
In a seventh example, a cryptographic element is generated by executing a supersingular isogeny-based cryptography protocol. Executing the supersingular isogeny-based cryptography protocol includes computing a generator of a first isogeny kernel and traversing a tree topology. The tree topology includes nodes and edges between the nodes. The edges of the tree topology include a first subset of edges representing scalar multiplications and a second subset of edges representing point evaluations. A plurality of isogeny kernels, which correspond to respective nodes (e.g., leaf nodes or another subset of nodes) in the tree topology and have a lower order than the first isogeny kernel, are computed by executing batches of operations. At least one of the batches includes a first point evaluation that is represented in the tree topology (e.g., an isogeny ϕ0 applied to a point G0) and has a first domain (e.g., E0) and a first range (e.g., E1), and a second point evaluation that is represented in the tree topology (e.g., an isogeny ϕ2 applied to a point [l2]G2) as a second domain (e.g., E2) and a second range (e.g., E3). The first domain, the first range, the second domain and the second range are non-isomorphic elliptic curves. The cryptographic element can then be used to execute cryptographic correspondence between the first entity and a second entity (e.g., between “Alice” and “Bob” as shown in
Implementations of the seventh example may include one or more of the following features. The lower order of each of the plurality of isogeny kernels may be 2, 3, or 4. Computing the generator of the first isogeny kernel further includes computing a coordinate of the generator. The cryptography protocol may correspond to a supersingular isogeny key exchange (SIKE) or a supersingular isogeny Diffie-Hellman (SIDH) protocol. The cryptographic element is a public key of the first entity (e.g., “Alice” as shown in
In an eighth example, a computing system includes one or more processors and a computer-readable medium storing instructions that are operable when executed by the one or more processors to perform one or more operations of the seventh example.
In a ninth example, a non-transitory computer-readable medium stores instructions that are operable when executed by data processing apparatus to perform operations of the seventh example.
While this specification contains many details, these should not be understood as limitations on the scope of what may be claimed, but rather as descriptions of features specific to particular examples. Certain features that are described in this specification or shown in the drawings in the context of separate implementations can also be combined. Conversely, various features that are described or shown in the context of a single implementation can also be implemented in multiple embodiments separately or in any suitable subcombination.
Similarly, while operations are depicted in the drawings in a particular order, this should not be understood as requiring that such operations be performed in the particular order shown or in sequential order, or that all illustrated operations be performed, to achieve desirable results. In certain circumstances, multitasking and parallel processing may be advantageous. Moreover, the separation of various system components in the implementations described above should not be understood as requiring such separation in all implementations, and it should be understood that the described program components and systems can generally be integrated together in a single product or packaged into multiple products.
A number of embodiments have been described. Nevertheless, it will be understood that various modifications can be made. Accordingly, other embodiments are within the scope of the following claims.
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