Secure function evaluation for a covert client and a semi-honest server using string selection oblivious transfer

Information

  • Patent Grant
  • 8990570
  • Patent Number
    8,990,570
  • Date Filed
    Tuesday, July 31, 2012
    12 years ago
  • Date Issued
    Tuesday, March 24, 2015
    9 years ago
Abstract
Methods and apparatus are provided for secure function evaluation for a covert client and a semi-honest server using string selection oblivious transfer. An information-theoretic version of a garbled circuit C is sliced into a sequence of shallow circuits C1, . . . Cn, that are evaluated. Consider any wire wj of C that is an output wire of Ci, and is an input wire of Ci+1. When a slice Ci is evaluated, Ci's 1-bit wire key for wj is computed by the evaluator, and then used, via string selection oblivious transfer (SOT), to obtain the wire key for the corresponding input wire of Ci+1. This process repeats until C's output wire keys are computed by the evaluator. The 1-bit wire keys of the output wires of the slice are randomly assigned to wire values.
Description
FIELD OF THE INVENTION

The present invention relates generally to techniques for securing electronic transactions and, more particularly, to secure function evaluation (SFE) techniques that provide privacy to the parties of such electronic transactions.


BACKGROUND OF THE INVENTION

Two-party general secure function evaluation (SFE) allows two parties to evaluate any function on their respective inputs x and y, while maintaining the privacy of both x and y. Efficient SFE algorithms enable a variety of electronic transactions, previously impossible due to mutual mistrust of participants. For example, SFE algorithms have been employed in auctions, contract signing and distributed database milling applications. As computation and communication resources have increased, SEE has become truly practical for common use. A malicious SFE model provides a guarantee of complete privacy of the players inputs, even when a dishonest player follows an arbitrary cheating strategy.


Existing generic two-party SFE algorithms typically employ Garbled Circuits (GCs). For a detailed discussion of GCs, see, for example, Y. Lindell and B. Pinkas, “A Proof of Yao's Protocol for Secure Two-Party Computation,” Journal of Cryptology, 22(2):161-188 (2009). For reasonably complex functions, however, the data transfer required for SFE is prohibitive. In fact, the communication complexity of GC-based SFE protocols is dominated by the size of the GC, which can reach Megabytes or Gigabytes even for relatively small and simple functions (e.g., the GC for a single secure evaluation of the block cipher AES has size 0.5 Megabytes).


While transmission of large amounts of data is often possible, existing networks will not scale should SFE be widely deployed. This is particularly true for wireless networks, or for larger scale deployment, of secure computations, e.g., by banks or service providers, with a large number of customers. Additional obstacles include energy consumption required to transmit/receive the data, and the resulting reduced battery life in mobile clients, such as smartphones. Computational load on the server is also a significant problem. Moreover, security against more powerful malicious adversaries requires the use of the standard cut-and-choose technique, which in turn requires transfer of multiple GCs.


A need remains for improved techniques for secure function evaluation where both parties are assumed to be semi-honest.


SUMMARY OF THE INVENTION

Generally, methods and apparatus are provided for secure function evaluation for a covert client and a semi-honest server using string selection oblivious transfer. According one aspect of the invention, a server performs secure function evaluation with a client by obtaining a circuit, C, representing a function, f; preparing slices of the circuit, C, into a sequence of sub-circuits C1, . . . Cl, wherein each of the sub-circuits C1, . . . Cl comprises a fan-out-one circuit; executing an oblivious transfer of keys for the sub-circuits C1, . . . Cl, to the client for evaluation, wherein input keys of one or more of the sub-circuits C1, . . . Cl, are based on output keys of a prior one of the sub-circuits C1, . . . Cl, wherein a secret associated with the oblivious transfer is only sent to the client if one of a plurality of allowed selection strings is provided by the client; and sending one or more output translation tables to the client.


According another aspect of the invention, a client performs secure function evaluation with a server by executing an oblivious transfer of keys for a plurality of sub-circuits C1, . . . Cl, from the server for evaluation, wherein the sub-circuits C1, . . . Cl are a plurality of information-theoretic garblings of slices of a circuit, C, wherein each of the sub-circuits C1, . . . Cl comprises a fan-out-one circuit, and wherein input keys of one or more of the sub-circuits C1, . . . Cl, are based on output keys of a prior one of the sub-circuits C1, . . . Cl, wherein a secret associated with the oblivious transfer is only received by the client if one of a plurality of allowed selection strings is sent by the client to the server; evaluating the sub-circuits C1, . . . Cl; using garbled input values to obtain garbled output values; receiving one or more output translation tables from the server; and generating a bit for each output wire of the circuit, C, corresponding to a wire secret obtained in evaluation of the sub-circuit Cl.


According yet another aspect of the invention, a server performs a string-selection oblivious transfer of one or more secrets with a client, wherein the server holds two pairs of secrets (x0, r0), (x1, r1), wherein x0 and x1 comprise k-bit strings and wherein r0 and r1 comprise k′-bit strings, a wherein r0≠r1, by encrypting the secret x0 with a key s0, and the secret x1 with a key s1 to provide two encryptions e0 and e1, wherein the keys s0 and s1 are chosen randomly; participating in oblivious transfer with the client by executing k′ standard oblivious transfers, two oblivious transfer input secrets of the server being the two corresponding i-th secret-shares of keys s0 and s1, wherein the secret sharing of s0 and s1 takes into account two server input values r0 and r1; and sending the two encryptions e0 and e1 to the client if the client successfully reconstructed one of the two keys s0 and s1.


According a further aspect of the invention, a client performs a string-selection oblivious transfer of one or more secrets with a server, wherein the client holds a k-bit selection string r, by participating in oblivious transfer with the server by executing k′ standard oblivious transfers, wherein an i-th oblivious transfer is executed with a client selection bit corresponding to an i-th bit of an input selection string r; reconstructing an encryption key corresponding to the selection string r; providing to the server an indication of a successful reconstruction of one of two keys s0 and s1; receiving two encryptions e0 and e1; and decrypting one of the two encryptions e0 and e1 to obtain one of (x0, x1), according to the selection string r.


A more complete understanding of the present invention, as well as further features and advantages of the present invention, will be obtained by reference to the following detailed description and drawings.





BRIEF DESCRIPTION OF THE DRAWINGS


FIG. 1 is a block diagram of an improved system for generic two-party SFE that can implement the processes of the present invention;



FIG. 2 is a block diagram of Garbled Circuit-based SFE;



FIG. 3 is a flow chart describing an exemplary implementation of an SFE process that incorporates aspects of the present invention; and



FIG. 4 is a flow chart describing an exemplary implementation of a string-selection oblivious transfer (SOT) function incorporating aspects of the present invention.





DETAILED DESCRIPTION

Embodiments of the present invention improve upon existing generic two-party SFE algorithms using an information-theoretic version of garbled circuits (GC). According to one aspect of the invention, an information-theoretic version of a garbled circuit C is sliced into a sequence of shallow circuits C1, . . . Cn, that are evaluated.


In a semi-honest model, secure piece-wise secure circuit evaluation can be achieved as follows. Consider any slicing of C, where some wire wj of C is an output wire of Ci, and is an input wire of Ci+1. Now, when a slice Ci is evaluated, Ci's 1-bit wire key for wj is computed by the evaluator, and then used, via oblivious transfer (OT), to obtain the wire key for the corresponding input wire of Ci+1. This process repeats until C's output wire keys are computed by the evaluator. In order to prevent the evaluator from learning the intermediate wire values of C, the 1-bit wire keys of slices' output wires are randomly assigned to wire values.


Further aspects of the present invention recognize that while the above semi-honest embodiment is secure against passive (semi-honest) adversaries, it can be compromised by an active evaluator, also referred to as a covert client. Indeed, the covert client can influence the output of the computation by flipping the 1-bit key of wj before using it in oblivious transfer, which will result in flipping the underlying bit on that wire. To efficiently resolve this problem and achieve covert security against the evaluator, a variant of the 1-out-of-2 oblivious transfer is introduced, referred to as String-selection OT (SOT). Under String-selection OT, the receiver submits a selection string (rather than just one bit), where the OT secret held by the server is sent only if one of the two allowed strings is presented by the client. The use of the selection string prevents a cheating client from flipping the wire value, since the client now would not know which string corresponds to the opposite wire value.



FIG. 1 is a block diagram of an improved generic two-party SFE system. 100 that cam implement the features of the present invention. As shown in FIG. 1, memory 130 configures the processor 120 to implement the generic two-party SFE methods, steps, and functions disclosed herein (collectively, shown as 150 in FIG. 1). The generic two-party SFE methods 150 further comprise a GC generator 300, discussed further below in conjunction with FIG. 3. The memory 130 could be distributed or local and the processor 120 could be distributed or singular. The memory 130 could be implemented as an electrical, magnetic or optical memory, or any combination of these or other types of storage devices. It should be noted that each distributed processor that makes up processor 120 generally contains its own addressable memory space. It should also be noted that some or all of computer system 100 can be incorporated into a personal computer, laptop computer, handheld computing device, application-specific circuit or general-use integrated circuit.


Generic Two-Party SFE Algorithms


As previously indicated, existing generic two-party SFE algorithms typically employ Garbled Circuits (GCs). Y. Lindell and B. Pinkas, “A Proof of Yao's Protocol for Secure Two-Party Computation,” Journal of Cryptology, 22(2):161-188 (2009). For a detailed discussion of exemplary existing generic two-party SFE algorithms, see, for example, Payman Mohassel and Matthew Franklin, “Efficiency Tradeoffs for Malicious Two-Party Computation,” Moti Yung et al., editors, PKC 2006: 9th International Conference on Theory and Practice of Public Key Cryptography, Vol. 3958 of Lecture Notes in Computer Science, 458-473 (New York, N.Y.; Apr. 24-26, 2006); Yehuda Lindell and Benny Pinkas, “An Efficient Protocol for Secure Two-Party Computation in the Presence of Malicious Adversaries,” Moni Naor, editor, Advances in Cryptology—EUROCRYPT 2007, Vol. 4515 of Lecture Notes in Computer Science, 52-78 (Barcelona, Spain, May 20-24, 2007); David P. Woodruff, “Revisiting the Efficiency of Malicious Two-Party Computation,” In Moni Naor, editor, Advances in Cryptology—EUROCRYPT 2007, Vol. 4515 of Lecture Notes in Computer Science, 79-96 (Barcelona, Spain, May 20-24, 2007); Stanislaw Jarecki and Vitaly Shmatikov, “Efficient Two-Party Secure Computation on Committed Inputs,” In Moni Naor, editor, Advances in Cryptology—EUROCRYPT 2007, Vol. 4515 of Lecture Notes in Computer Science, 97-114 (Barcelona, Spain, May 20-24, 2007); and/or Vipul Goyal et al., “Efficient Two Party and Multiparty Computation Against Covert Adversaries.” In Nigel P. Smart, editor, Advances in Cryptology—EUROCRYPT 2008, Vol. 4965 of Lecture Notes in Computer Science, 289-306 (Istanbul, Turkey, Apr. 13-17, 2008), each incorporated by reference in its entirety.


Secure Two-Party Computation

Garbled Circuits (GC)



FIG. 2 is a block diagram of a Garbled Circuit-based SFE 200. Generally, as shown in FIG. 2, Yao's Garbled. Circuit (GC) approach allows two parties, sender S with private input y and receiver R (also referred to as client C) with private input x, to securely evaluate a boolean circuit C on (x, y) without revealing any information other than the result z=C(x, y) of the evaluation. In particular, no intermediate values are revealed.


The circuit constructor S creates a garbled circuit {tilde over (C)} from the circuit C: for each wire wi of C, two garblings {tilde over (w)}i0, {tilde over (w)}i1 are randomly chosen, where {tilde over (w)}ij is the garbled value of Wi's value j. (Note: {tilde over (w)}ij does not reveal j). Further, for each gate Gi, S creates a garbled table {tilde over (T)}i with the following property: given a set of garbled values of Gi's inputs, {tilde over (T)}i allows to recover the garbled value of the corresponding Gi's output. S sends these garbled tables, together called garbled circuit {tilde over (C)}, to evaluator (receiver R).


Additionally, R (obliviously) obtains the garbled inputs {tilde over (w)}i corresponding to the inputs of both parties: the garbled inputs {tilde over (y)} corresponding to the inputs y of S are sent directly: {tilde over (y)}i={tilde over (y)}iyi. For each of R's inputs xi, both parties run a 1-out-of-2 Oblivious Transfer (OT) protocol (e.g., Y. Ishai et al., “Extending Oblivious Transfers Efficiently,” Advances in Cryptology—CRYPTO 2003 (August 2003), D. Boneh, Ed., Lecture Notes in Computer Science, Vol. 2729, Springer, 145-161 (2003); or Jesper Buus Nielsen, “Extending Oblivious Transfers Efficiently—How to get Robustness Almost for Free,” Cryptology ePrint Archive, Report 2007/215 (2007), where S inputs {tilde over (x)}i0, {tilde over (x)}i1 and R inputs xi. The OT protocol ensures that R receives only the garbled value corresponding to his or her input hit, i.e., {tilde over (x)}i={tilde over (x)}ixi, while S learns nothing about xi.


Now, R evaluates the garbled circuit {tilde over (C)} (which comprises the garbled tables {tilde over (T)}i) on the garbled inputs to obtain the garbled output {tilde over (z)} by evaluating {tilde over (C)} gate by gate, using the garbled tables {tilde over (T)}i. Finally, R determines the plain value z corresponding to the obtained garbled output value using an output translation table sent by S.


Embodiments of the invention provide a protocol for securely computing a function ƒ, represented by a circuit C, where semi-honest S has input y and a covert client C has input x.


For a more detailed discussion of Yao's Garbled Circuit approach, see, for example, A. C.-C. Yao, “How to Generate and Exchange Secrets (Extended Abstract),” FOCS, 162-67, (1986), incorporated by reference herein.


Efficient Information-Theoretic GC for Shallow Circuits (GESS)


V. Kolesnikov, “Gate Evaluation Secret Sharing and Secure One-Round Two-Party Computation,” Advances in Cryptology—ASIACRYPT 2005 (December 2005), B. K. Roy, Ed., Lecture Notes in Computer Science, Vol. 3788, 136-55 (2005), incorporated by reference herein, describes a Gate Evaluation Secret Sharing (GESS) scheme, which is an efficient information-theoretic analog of GC. The discloses techniques perform encryption with bitwise XOR functions and bit shufflings, rather than with standard primitives such as ABS. Thus, GESS is considered more efficient than standard GC, both in computation and communication, for shallow circuits.


Generally, GESS is a secret sharing scheme, designed to match with the gate function g, as follows. The output wire keys are the secrets, from which the constructor produces four secret shares, one for each of the wire keys of the two input wires. GESS guarantees that a combination of shares, corresponding to any of the four possible gate inputs, reconstructs the corresponding key of the output wire. This secret sharing can be applied recursively, enabling reduction of SFE to oblivious transfer (to transfer the wire secrets on the input wires).


V. Kolesnikov, “Gate Evaluation Secret Sharing and Secure One-Round Two-Party Computation,” provides a SFE protocol for a boolean formula F of communication complexity≈Σdi2, where di is the depth of the i-th leaf of F. This improvement provides better performance than standard GC by evaluating thin slices of the circuit. Other Information-Theoretic GC variants can also be used, with corresponding performance disadvantage.


Covert Client


Consider a semi-honest Server, and a Client-adversary that may deviate from the protocol specification in an attempt to cheat. While cheating attempts may be successful, the covert model guarantees that any attempted cheating is caught with a certain minimal probability c. See, e.g., Y. Aumann and Y. Lindell, “Security Against Coven Adversaries: Efficient Protocols for Realistic Adversaries,” TCC 2007: 4th Theory of Cryptography Conference (February 2007), S. P. Vadhan, Ed., Lecture Notes in Computer Science, Vol. 4392, 137-56.


Aumann and Lindell give three formalizations of this notion. Consider the strong explicit-cheat formulation. Informally, this variant of the covert-security definition guarantees that, if caught, the adversary does not learn the honest player's input. If not caught, the adversary may succeed either in learning the honest player's input or influencing the computation (or both). The definition is given in the standard ideal-real paradigm. Intuitively, the difference with the malicious model is that the covert ideal world allows the cheat request: if successful (based on the coin flip by a trusted party), the adversary is allowed to win, if not, honest players are informed of the cheat attempt.


Notation


Let κ be the computational security parameter. The disclosed SFE protocol is given a circuit C which represents a function ƒ that a server S (with input y) and a client C (with input x) wish to compute. Let d denote the depth of C. The disclosed SFE protocol proceeds by dividing the circuit C into horizontal slices. Let l denote the number of such slices, and let C1, . . . , Cl denote these slices of C. d′ denotes the depth of each slice Ci.


In circuit slice Ci, let ui,j (resp. vi,j) denote the jth input (resp. output) wire. For a wire ui,j (resp. vi,j), the garbled values corresponding to 0 and 1 are referred to by ũi,j0, ũi,j1 (resp. {tilde over (v)}i,j0, {tilde over (v)}i,j1) respectively. In the disclosed protocol, let k denote the length of input wire garblings. While evaluating the garbled circuit, C will possess only one of two garbled values for each wire in the circuit. Let ũi,j′ (resp. {tilde over (v)}i,j′) denote the garbled value on wire ui,j (resp. vi,j) that is possessed by C.


A primitive SOTk,k′ discussed below in conjunction with FIGS. 3 and 4 that requires a receiver (client) C, with a k′-bit selection string as input, to select one of two k-bit strings held by sender S. One embodiment of a protocol for SOTk,k′ uses calls to the standard 1-out-of-2 OT primitive (where receiver C, with a selection bit as input, selects one of two k-bit: strings held by sender S).


Protocol



FIG. 3 is a flow chart describing an exemplary implementation of a secure function evaluator 300 incorporating aspects of the present invention. One embodiment of the exemplary garbled circuit generator 300 of FIG. 3 uses oblivious transfer (OT), the standard 1-out-of-2 OT protocol and String-selection OT, SOTk,k′, a SOT protocol, as defined below. The exemplay protocol 300 is described for secure two-party computation against a semi-honest server and a covert receiver in a hybrid model with ideal access to String-selection OT (SOT), defined below:


The exemplary String-selection OT, SOTk,k′, has the following functionality:


Inputs: S holds two pairs (x0, r0),(x1, r1), where each x0, x1 are k-bit strings, and r0, r1 are k′-bit strings (with r0≠r1). Client C holds k′-bit selection string r.


Outputs: If r=ri for some iε{0,1}, then client C outputs xi, and S outputs empty string λ. Otherwise, client C and S both output error symbol ⊥.


Circuit C is evaluated slice-by-slice. Further, each slice is viewed as a fan-out-1 circuit, as needed for the GESS scheme discussed above.


1. Circuit Preparation:


(a) Slicing. Given d,d′, server S divides circuit C of depth d into horizontal sub-circuit layers, or slices, C1, . . . , Ci of depth d′.


(b) Preparing each slice. In this step, S randomly generates the output secrets of the slice, and, applying the GESS sharing scheme, obtains corresponding input secrets, as follows. Denote by ui,j input wires and by vi,j the output wires of the slice Ci. For each wire vi,j, S picks two random garblings {tilde over (v)}i,j0, {tilde over (v)}i,j1 of length k′>1 (conditioned on {tilde over (v)}i,j0≠{tilde over (v)}i,j1). S then (information-theoretically) computes the GESS garblings for each input wire in the sub-circuit, as described above. Let k be the maximal length of the garblings ũi,j0, ũi,j1 of the input wires ui,j. Recall, GESS does not use garbled tables.


2. Circuit Evaluation:


For 1≦i≦l, in round i do:


(a) Oblivious transfer of keys.


i. For the top slice (the sub-circuit C1), do the standard SFE garblings transfer:


For each client input wire ui,j (representing the bits of X's input x), S and client C execute a 1-out-of-2 OT protocol, where S plays the role of a sender, with inputs ũi,j0, ũi,j1, and client C plays the role of the receiver, directly using his inputs for OT.


For each server input wire ui,j (representing the bits of Σ's input y), S sends to client C one of ũi,j0, ũi,j1, corresponding to its input bits.


ii. For slices Ci, i≠1, transfer next slice's input keys based on the current output keys:


For each input wire ui,j of the slice Ci, S uniformly at random chooses a string ri,j of length k (this will mask the transferred secrets). S then acts as sender in SOTk,k′ with input ((ũi,j0⊕ri,j, {tilde over (v)}i−1,j0), (ũi,j1⊕ri,j, {tilde over (v)}i−1,j1)), and client C acts as receiver with input {tilde over (v)}i−1,j′ (this is the output wire secret of the one-above slice Ci−1, which client C obtains by executing Step 2b described next). Let client C obtain ũi,j′⊕ri,j as the output from SOTk,k′. Once all SOTk,k′ had completed, S sends all ri,j to client C, who then computes all ũi,j′.


(b) Evaluating the slice. C evaluates the GESS sub-circuit Ci, using garbled input values ũi,j′ to obtain the output values {tilde over (v)}i,j′.


3. Output of the Computation. Recall, without loss of generality, only C receives the output. S now sends the output translation tables to C. For each output wire of C, C outputs the bit corresponding to the wire secret obtained in evaluation of the last slice Cl.


It can be shown that the above Protocol embodiment is secure against a semi-honest server S and a covert client C.


In the present setting with a covert client (k′=2, deterrent ⅓), C is divided into l slices, for example, each of depth d′=4, κ≈4800 the key length on input wires of each slice.


Another aspect of the invetion provides an efficient string-selection OT (SOT) protocol, secure against a semi-honest sender and a malicious receiver, which works for selection strings of arbitrary length k′. The exemplary SOT protocol is built from k′ standard 1-out-of-2 OTs. Generally, each of the two secrets x0, x1 is encrypted with corresponding randomly selected keys s0, s1. The keys s0, s1 are then split into k′ random shares sij (i.e. 2k′ total shares), with the restriction that the sets of sij, indexed by each of the two selection strings, reconstructs the corresponding secret. The two secrets x0, x1 are then sent to the receiver (client) each encrypted with the corresponding key s0, s1. Then, in the semi-honest model, performing k′ standard OTs allows the receiver (client) to reconstruct one of the two encryption keys, corresponding to his or her selection string. This, in turn allows the receiver (client) to reconstruct the corresponding SOT secret.


To protect against a malicious or covert receiver, assume that underlying OTs are secure against such receiver. Further, allow the sender to confirm that the receiver indeed received one of the two secrets, as follows. Denote by h0 (resp. h1) the hash of the vector of secret shares corresponding to the secret key s0 (resp. s1). To confirm that receiver obtained shares to reconstruct at least one of s0, s1 (and hence one of x0, x1), the sender will send h0⊕h1 to the client C, and expect to receive both h0 and h1 back (actually, it is sufficient to receive just one of h0, h1 selected by client C at random).



FIG. 4 is a flow chart describing an exemplary implementation of a string-selection oblivious transfer (SOT) function 400 incorporating aspects of the present invention. As shown in FIG. 4, the exemplary SOT function 400 (SOTk,k′).


The sender S has input (x0, r0), (x1, r1) with |x0|=|x1|=k, and |r0|=|r1|=k′. Let receiver (client) C have input rε{r0, r1}. Let κ be a security parameter, OT be a standard 1-out-of-2 OT, and H: {0,1}′→{0,1}κ be a random oracle.


1. Let r0=r01, r02, . . . , r0k′, and r1=r11, r12, . . . , r1k′, where rij are bits. S chooses sijεR {0,1}κ, for iε{0,1}, jε{1, . . . k′}. Client C sets keys s0=⊕isjr0,j, and sj=⊕jsjrij.


2. Client C and S participate in k′ OTs as follows. For j=1 to k′:

    • (a) S with input (s10, sj1), and client. C with input rj send their inputs to OT. Client C receives sjrj.


3. S computes hashes of shares corresponding to the two secrets/selection strings: h0=H(s1r01, s2r02, . . . , skr0k′), and h1=H(s1r11, s2r12, . . . , sk′r1k′). S then sends h=h0⊕h1 to client C.


4. Client C computes hc=H(sr1, . . . , srk′) and sends to S either hc or h⊕hc, equiprobably.


5. S checks that the hash received from client C is equal to either h0 or h1. If so, it sends, in random order, H(s0)⊕x0, H(s1)⊕x1 and terminates with output λ; if not, S sends ⊥ to client C and outputs failure symbol ⊥.


6. Client C computes key sr=⊕jsrj and recovers the secret by canceling out H (sr).


In one exemplary implementation, redundancy can be added to xi which allows client C to identify the recovered secret. The output length of H is sufficiently stretched when used to mask secrets xi.


It can be shown that SOT is secure in the presence of a semi-honest sender and a malicious receiver (e.g., a covert client).


System and Article of Manufacture Details


While FIG. 3 shows an exemplary sequence of steps, it is also an embodiment of the present invention that the sequence may be varied. Various permutations of the algorithm are contemplated as alternate embodiments of the invention.


While exemplary embodiments of the present invention have been described with respect to processing steps in a software program, as would be apparent to one skilled in the art, various functions may be implemented in the digital domain as processing steps in a software program, in hardware by circuit elements or state machines, or in combination of both software and hardware. Such software may be employed in, for example, a digital signal processor, application specific integrated circuit, micro-controller, or general-purpose computer. Such hardware and software may be embodied within circuits implemented within an integrated circuit.


Thus, the functions of the present invention can be embodied in the form of methods and apparatuses for practicing those methods. One or more aspects of the present invention can be embodied in the form of program code, for example, whether stored in a storage medium, loaded into and/or executed by a machine, or transmitted over some transmission medium, wherein, when the program code is loaded into and executed by a machine, such as a computer, the machine becomes an apparatus for practicing the invention. When implemented on a general-purpose processor, the program code segments combine with the processor to provide a device that operates analogously to specific logic circuits. The invention can also be implemented in one or more of an integrated circuit, a digital signal processor, a microprocessor, and a micro-controller.


As is known in the art, the methods and apparatus discussed herein may be distributed as an article of manufacture that itself comprises a computer readable medium having computer readable code means embodied thereon. The computer readable program code means is operable, in conjunction with a computer system, to carry out all or some of the steps to perform the methods or create the apparatuses discussed herein. The computer readable medium may be a tangible recordable medium (e.g., floppy disks, hard drives, compact disks, memory cards, semiconductor devices, chips, application specific integrated circuits (ASICs)) or may be a transmission medium (e.g., a network comprising fiber-optics, the world-wide web, cables, or a wireless channel using time-division multiple access, code-division multiple access, or other radio-frequency channel). Any medium known or developed that can store information suitable for use with a computer system may be used. The computer-readable code means is any mechanism for allowing a computer to read instructions and data, such as magnetic variations on a magnetic media or height variations on the surface of a compact disk.


The computer systems and servers described herein each contain a memory that will configure associated processors to implement the methods, steps, and functions disclosed herein. The memories could be distributed or local and the processors could be distributed or singular. The memories could be implemented as an electrical, magnetic or optical memory, or any combination of these or other types of storage devices. Moreover, the term “memory” should be construed broadly enough to encompass any information able to be read from or written to an address in the addressable space accessed by an associated processor. With this definition, information on a network is still within a memory because the associated processor can retrieve the information from the network.


It is to be understood that the embodiments and variations shown and described herein are merely illustrative of the principles of this invention and that various modifications may be implemented by those skilled in the art without departing from the scope and spirit of the invention.

Claims
  • 1. A method for secure function evaluation between a client and a server, comprising: obtaining a circuit, C, representing a function, ƒ;preparing slices of said circuit, C, into a sequence of sub-circuits C1, . . . Cl, wherein each of said sub-circuits C1, . . . Cl comprises a fan-out-one circuit;executing an oblivious transfer of keys for said sub-circuits C1, . . . Cl, to said client for evaluation, wherein input keys of one or more of said sub-circuits C1, . . . Cl, are based on output keys of a prior one of said sub-circuits C1, . . . Cl, wherein a secret associated with said oblivious transfer is only sent to said client if one of a plurality of allowed selection strings is provided by said client to said server, wherein said allowed selection strings comprise a plurality of bits; andsending one or more output translation tables to said client.
  • 2. The method of claim 1, wherein said step of preparing slices further comprises the steps of generating output secrets of a given sub-circuit and obtaining corresponding input secrets.
  • 3. The method of claim 2, wherein said step of obtaining corresponding input secrets applies a Gate Evaluation Secret Sharing (GESS) sharing scheme.
  • 4. The method of claim 2, wherein said given sub-circuit Ci, has input wires ui,j and output wires vi,j, and wherein for each wire vi,j, said server S selects two random output garblings {tilde over (v)}i,j0, {tilde over (v)}i,j1 of length k′>1 (conditioned on {tilde over (v)}i,j0≠{tilde over (v)}i,j1) and computes garblings for each input wire in said given sub-circuit Ci.
  • 5. The method of claim 1, wherein said step of executing said oblivious transfer of keys comprises a transfer of garblings for secure function evaluation for said sub-circuit C1.
  • 6. The method of claim 5, wherein said transfer of garblings for secure function evaluation for said sub-circuit C1 comprises said server S executing for each client input wire ui,j representing bits of input x of said client C, a 1-out-of-2 oblivious transfer protocol, where S has input values ũi,j0, ũi,j1, and said client C uses input x for said oblivious transfer.
  • 7. The method of claim 5, wherein said secure function evaluation garblings transfer for said sub-circuit C1 comprises said server S sending to said client C for each server input wire u1,j representing bits of input y of said server S, one of input values ũi,j0, ũi,j1, corresponding to input bits of said server S.
  • 8. The method of claim 1, wherein said step of executing said oblivious transfer of keys for said sub-circuits C2, . . . Cl, comprises performing said oblivious transfer with server input values ((ũi,j0⊕ri,j, {tilde over (v)}i−1,j0), (ũi,j1⊕ri,j, {tilde over (v)}i−1,j1)), where ri,j are randomly chosen bitmasks.
  • 9. The method of claim 8, further comprising the step of sending said ri,j values to said client C.
  • 10. A method for secure function evaluation between a client and a server, comprising: executing an oblivious transfer of keys for a plurality of sub-circuits C1, . . . Cl, from said server for evaluation, wherein said sub-circuits C1, . . . Cl are a plurality of information-theoretic garblings of slices of a circuit, C, wherein each of said sub-circuits C1, . . . Cl comprises a fan-out-one circuit, and wherein input keys of one or more of said sub-circuits C1, . . . Cl, are based on output keys of a prior one of said sub-circuits C1, . . . Cl, wherein a secret associated with said oblivious transfer is only received by said client if one of a plurality of allowed selection strings is sent by said client to said server, wherein said allowed selection strings comprise a plurality of bits;evaluating said sub-circuits C1, . . . Cl using garbled input values to obtain garbled output values;receiving one or more output translation tables from said server; andgenerating a bit for each output wire of said circuit, C, corresponding to a wire secret obtained in evaluation of said sub-circuit Cl.
  • 11. The method of claim 10, wherein said step of executing said oblivious transfer of keys for said plurality of sub-circuits C1, . . . Cl, comprises a transfer of garblings for secure function evaluation for a sub-circuit C1.
  • 12. The method of claim 10, wherein said step of executing said oblivious transfer of keys for said sub-circuits C2, . . . Cl, comprises performing said oblivious transfer with client input values {tilde over (v)}i−1,j′, where {tilde over (v)}i−1,j′ comprises an output wire secret of a prior sub-circuit Ci−1.
  • 13. The method of claim 12, further comprising the step of obtaining ũi,j1⊕ri,j as an output from a string oblivious transfer routine, SOTk,k′.
  • 14. The method of claim 13, further comprising the steps of receiving said ri,j values from said server and computing said ũi,j′ values.
  • 15. A server system for secure function evaluation with a client, comprising: a memory; andat least one hardware device, coupled to the memory, operative to:obtain a circuit, C, representing a function, ƒ;prepare slices of said circuit, C, into a sequence of sub-circuits C1, . . . Cl, wherein each of said sub-circuits C1, . . . Cl comprises a fan-out-one circuit;execute an oblivious transfer of keys for said sub-circuits C1, . . . Cl, to said client for evaluation, wherein input keys of one or more of said sub-circuits C1, . . . Cl, are based on output keys of a prior one of said sub-circuits C1, . . . Cl, wherein a secret associated with said oblivious transfer is only sent to said client if one of a plurality of allowed selection strings is provided by said client to said server, wherein said allowed selection strings comprise a plurality of bits; andsend one or more output translation tables to said client.
  • 16. A client system for secure function evaluation with a server, comprising: a memory; andat least one hardware device, coupled to the memory, operative to:execute an oblivious transfer of keys for a plurality of sub-circuits C1, . . . Cl, from said server for evaluation, wherein said sub-circuits C1, . . . Cl are a plurality of information-theoretic garblings of slices of a circuit, C, wherein each of said sub-circuits C1, . . . Cl comprises a fan-out-one circuit, and wherein input keys of one or more of said sub-circuits C1, . . . Cl, are based on output keys of a prior one of said sub-circuits C1, . . . Cl, wherein a secret associated with said oblivious transfer is only received by said client if one of a plurality of allowed selection strings is sent by said client to said server, wherein said allowed selection strings comprise a plurality of bits;evaluate said sub-circuits C1, . . . Cl using garbled input values to obtain garbled output values;receive one or more output translation tables from said server; andgenerate a bit for each output wire of said circuit, C, corresponding to a wire secret obtained in evaluation of said sub-circuit Cl.
  • 17. A method for executing string-selection oblivious transfer of one or more secrets between a server and a client, wherein said server holds two pairs of secrets (x0, r0), (x1, r1), wherein x0 and x1 comprise k-bit strings and wherein r0 and r1 comprise k′-bit strings, and wherein r0≠r1, said method comprising: encrypting said secret x0 with a key s0, and said secret x1 with a key s1 to provide two encryptions e0 and e1, wherein said keys s0 and s1 are chosen randomly;participating in oblivious transfer with said client by executing k′ standard oblivious transfers, two oblivious transfer input secrets of said server being the two corresponding i-th secret-shares of keys s0 and s1, wherein the secret sharing of s0 and s1 takes into account two server input values r0 and r1; andsending said two encryptions e0 and e1 to said client if said client successfully reconstructed one of said two keys s0 and s1.
  • 18. The method of claim 17, further comprising the step of S outputing an empty string λ if r=ri and said client did not deviate from a protocol.
  • 19. The method of claim 17, further comprising the step of outputing an error symbol ⊥ if r≠ri or if said client deviated from a protocol.
  • 20. A method for performing oblivious transfer of one or more secrets between a server and a client, wherein said client holds a k-bit selection string r, said method comprising: participating in said oblivious transfer with said server by executing k′ standard oblivious transfers, wherein an i-th oblivious transfer is executed with a client selection bit corresponding to an i-th bit of an input selection string r;reconstructing an encryption key corresponding to said selection string r;providing to said server an indication of a successful reconstruction of one of two keys s0 and s1;receiving two encryptions e0 and e1; anddecrypting one of said two encryptions e0 and e1 to obtain one of (x0, x1), according to said selection string r.
  • 21. The method of claim 20, further comprising the step of outputing an error symbol ⊥ if r≠ri or if said client deviated from a protocol.
STATEMENT OF GOVERNMENT RIGHTS

The present invention was made in connection with work performed under the Intelligence Advanced Research Projects Activity (IARPA) via Department of the Interior (DOI) Contract No. D11PC20194.

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Entry
Vladimir Kolesnikov, Gate EvaluationSecret Sharing and Secure One-Round Two-Party Computation, ASIACRYPT 2005, LNCS 3788, pp. 136-155.
Related Publications (1)
Number Date Country
20140040614 A1 Feb 2014 US