The present invention relates to a controller and a method for a flexible and adaptive control of radio resources in a multi-RAT (Radio Access Technology) wireless communication network including one or more OFDMA-based (Orthogonal Frequency-Division Multiple Access) base stations that implement different RATs.
Network densification is well-recognized as a key means to take on the challenge of supporting a thousand-fold increase in traffic demand in the next generation of mobile systems. In turn, network densification involves both spatial densification, i.e. packing more radio access points per unit area, and spectrum densification, i.e. aggregating potentially non-contiguous radio bands.
For example, a cost-efficient way of accomplishing spatial densification is to deploy an “army” of low-power low-cost radio access technologies (RATs), such as small-cells.
On the downside, however, the load that each individual RAT has to manage becomes highly volatile and unpredictable. In this context, it is important to note that user traffic is highly variable, as evidenced in a plethora of literature, e.g. in Abdelhadi et al. (A. Abdelhadi and C. Clancy, An Optimal Resource Allocation with Joint Carrier Aggregation in 4G-LTE, International Conference on Computing, Networking and Communications (ICNC), 2015) or in Shajaiah et al. (H. Shajaiah, A. Abdel-Hadi and C. Clancy, An Efficient Multi-carrier Resource Allocation with User Discrimination Framework for 5G Wireless Systems, International Journal of Wireless Information Networks, vol. 22, no. 4, pp. 345-356, 2015), but macro-cells compensate this volatility by aggregating multiple flows. This leverage fades in dense contexts because individual (low-power) RATs handle fewer flows, as described in Yu et al. (G. Yu, Q. Chen, R. Yin, H. Zhang and G. Y. Li, Joint Downlink and Uplink Resource Allocation for Energy-Efficient Carrier Aggregation, IEEE Transactions on Wireless Communications, vol. 14, no. 6, pp. 3207-3218, 2015).
In an embodiment, the present invention provides a method for managing radio resources in a multiple radio access technology (multi-RAT) wireless communication network including one or more orthogonal frequency-division multiple access (OFDMA)-based base stations that implement different radio access technologies (RATs). The method includes the step of creating, for each of a plurality of mobile terminals, an incoming queue where data destined to the respective mobile terminal is buffered. Queue information of each of the mobile terminals is collected and provided to the multi-RAT wireless communication network. System constraints of the multi-RAT wireless communication network are defined and network constraint information is provided. Based on the queue information and the network constraint information, a resource scheduling algorithm is executed that jointly determines: an allocation of physical resource blocks (PRBs) to each link between one of the RATs and one of the mobile terminals, an assignment of modulation levels to each of the allocated PRBs, and an activation/deactivation of each of the RATs.
The present invention will be described in even greater detail below based on the exemplary figures. The invention is not limited to the exemplary embodiments. All features described and/or illustrated herein can be used alone or combined in different combinations in embodiments of the invention. The features and advantages of various embodiments of the present invention will become apparent by reading the following detailed description with reference to the attached drawings which illustrate the following:
In view of the above discussion, embodiments of the present invention recognize that a cost-efficient dense deployment requires a flexible and adaptive control of radio resources.
For instance, a network operator may want to distribute low-power load across fewer RATs and/or use only inexpensive unlicensed bands as long as the demand is satisfied in order to save costs and cause low interference. However, when the load increases, the network controller needs to adapt very quickly (e.g. activating RATs to offload traffic during peak hours).
Regarding spectrum densification, multi-connectivity between single users and multiple RATs is attracting a lot of interest to 5G RAN architects, who are in the hunt for larger chunks of spectrum. With multi-connectivity, it is possible to extend the amount of bandwidth by simply aggregating non-contiguous frequency bands, e.g., sub-6 GHz, ISM bands, mmWave or TV white spaces (see
As a consequence of the above, radio resource scheduling becomes substantially more complex. For instance, unlicensed LTE (LTE-U/LTE-LAA) operates in the 5 GHz ISM band, subject to uncontrolled interference from external users (i.e., available bandwidth in this band is thus variable and uncertain), whereas the bandwidth of licensed LTE RATs is more deterministic. Another example: mmWave provides wider channels but signal strength degrades rapidly with distance or obstructing objects; conversely, lower frequencies offer more consistent and larger coverage.
In an embodiment, the present invention provides a method for managing radio resources in a multi-RAT wireless communication network including one or more OFDMA-based base stations that implement different RATs. The method includes creating for each of a plurality of mobile terminals an incoming queue where data destined to the respective mobile terminal is buffered; collecting queue information of each mobile terminal and providing the queue information to the multi-RAT wireless communication network; and defining system constraints of the multi-RAT wireless communication network and providing network constraint information. Based on the queue information and the network constraint information, executing a resource scheduling algorithm that jointly decides on the allocation of PRBs, Physical Resource Blocks, to each of the links between a RAT and a mobile terminal, on the assignment of modulation levels to each of the allocated PRBs, and on the activation/deactivation of each RAT.
According to an embodiment the queue information and the network constraint information are provided to a scheduling component that, based on this information, executes the resource scheduling algorithm. The scheduling component may be implemented as a functional entity of a network controller of the multi-RAT wireless communication network.
Embodiments of the present invention relate to a practical multi-connectivity scheduler for OFDMA-based (Orthogonal Frequency-Division Multiple Access) multi-RAT heterogeneous systems that is general enough to function optimally in a variety of uplink and downlink scenarios, as illustrated in
In marked contrast, the existing prior art schedulers focus on specific setups, making strong simplifications that limit their applicability in real systems, and can hardly be extrapolated to general cases. Additional key differences between the present invention and prior art solutions is that embodiments of the invention support heterogeneous RATs OFDMA-based (which is in line with 5G New Radio) and that three decisions are taken in an online fashion: 1) decide on the number of PRBs per RAT and user, 2) decide on the modulation level of those PRBs, and 3) decide which RATs should be awaken or sent to “sleep” mode.
Although multi-connectivity can be implemented at different layers of the stack (TCP/IP, PDCP or MAC), embodiments of the present invention focus on MAC layer aggregation (as illustrated in
According to an embodiment, a multi-RAT system is considered that is comprised of R={1, . . . , R} RATs and N={1, . . . , N} mobile users/terminals. RATs can be co-located (e.g. in a multi-RAT base station) or distributed in a C-RAN architecture (perfect information) or forming a HetNet structure (imperfect information). Without loss of generality, it can be assumed that each user/terminal is mapped to one traffic class or QoS class identifier (QCI). The extension to a general case can be done by adding virtual users. All RATs can be deactivated except one (primary RAT), in order to guarantee an available control channel at all times.
Systems and methods described herein employ a number of different RATs that are based on OFDMA. Although other waveforms are being considered for a 5G unified radio, namely 5G New Radio (NR), OFDM has a broad support and it is likely to be selected (for reference, see Qualcomm, “Exploring 5G New Radio: Use Cases, Capabilities & Timeline,” White Paper, 2016). Consequently, it is possible to allocate physical resource blocks (PRBs) from a pool available at each RAT, with bandwidth that may vary over time. Further, this makes it possible to model unlicensed bands too.
According to an embodiment, each PRB is modulated with a modulation level from a discrete set Mr,n={mr,n,1, . . . , mr,n,M}, where mr,n,M is the highest, yet reliable, modulation level (using highest transmission power) that can be used in the physical link between RAT r and user/terminal n (wherein this modulation level can be computed with standard models). In this way, RATs with different properties are modelled (e.g. different range of available modulation and coding schemes, different bandwidth, etc.). Although the following description focusses on the downlink case, the proposed model also applies to the uplink case.
Systems and methods described herein employ a scheduling component that jointly assigns PRBs, modulation levels and RAT(s) to users such that the user demand is satisfied (ensuring the system is stable) while maintaining a good balance between system cost (including energy consumption) and QoS satisfaction. The scheduling component may be collocated with the network controller, where the scheduling component is implemented as part of the network controller. Alternatively, the scheduling component may be implemented as an independent functional entity separate from the network controller (though exchanging information with the network controller, e.g. receiving queue information from the network controller, as will be explained in greater detail below).
As shown in
According to an embodiment of the invention, the network controller 320 can be configured with several features, including in particular operator preferences and/or user preferences. The operator preferences, which may be encoded as numeric weights, may include preferences regarding which RATs are favored to be deactivated. For instance, in low load regimes, an operator may prefer to turn off a cell operating in a licensed band, rather than one operating in the unlicensed spectrum. Alternatively or additionally, operator preferences may include preferences regarding the modulation levels. For instance, an operator may prefer low modulation levels, which require low transmission power, to reduce energy consumption and interference to neighboring cells. The user preferences, which may be encoded as (convex) utility functions, may consider, e.g., delay-sensitive flows vs. elastic flows, as will be described in greater detail below in connection with
The high-level diagram of
A high-level description of a network controller in accordance with an embodiment of the invention is depicted in
The high-level diagram of
A major advantage of the network controller 500 according to embodiments of the invention is the ability to deactivate/activate secondary RATs when needed, importantly, taking into account the delay it takes for a secondary cell to turn on/off. In addition, according to embodiments of the invention the scheduler 510 does not take assumption on traffic distributions, i.e. it operates optimally regardless the traffic patterns and in all load regimes. It only requires instantaneous measurements of the queue states of the system. Specifically, the scheduler 510 needs queue information from all users every TI, which will be provided on a regular basis by the queue information collection component 550. As will be appreciated by those skilled in the art, in the downlink case, this information is already available. In a C-RAN deployment (whenever MAC layer is centralized) this information is also always available (both uplink/downlink). However, in non-CRAN uplink scenarios this information could be provisioned, e.g., via signaling (which is already available in LTE specification).
According to embodiments of the invention, the scheduler 510 has to perform the task of executing, a resource scheduling algorithm, based on queue information and the system constrain information. The scheduler 510 can be a processor, a processor core, or a plurality of processors and/or processor cores located at single location or distributed amongst multiple locations. Such processors or processor cores of the scheduler 510 are configured to execute processor executable instructions for executing a resource scheduling algorithm that jointly decides on the allocation of PRBs, Physical Resource Blocks, to each of the links between a RAT 560 and a mobile terminal, on the assignment of modulation levels to each of the allocated PRBs, and on the activation/deactivation of each RAT. As indicated in
In the embodiment illustrated in
Hereinafter, operation of a multi-connectivity scheduler for a multi-RAT system according to an embodiment of the invention will be described in greater detail. In this context conventional notation will be used. That is, R and Z denote the set of real and integer numbers. R+, Rn, and Rn×m are used to represent the sets of non-negative real numbers, n-dimensional real vectors, and m×n real matrices, respectively. Vectors are usually in column form and written in bold font. Matrices are in upper-case roman font. Subscripts represent an element in a vector and superscripts elements in a sequence. For instance, {right arrow over (x)}(t) is a sequence of vectors with {right arrow over (x)}(t)=[x1(t), . . . , xn(t)]T being a vector from Rn. In turn, {right arrow over (x)}(t)i is the i'th component of the t'th vector in the sequence. Superscript T represents the transpose operator. {right arrow over (x)}<{right arrow over (y)} indicates that xi<yi, ∀i. Finally, [⋅]+ denotes the projection of a vector onto the non-negative orthant, i.e., [x]+=[max{0, x1)}, . . . , max{0, xn}], x∈Rn.
{right arrow over (Q)}
(t+1)=[{right arrow over (Q)}(t)+{right arrow over (δ)}(t)]+,t=1,2, . . .
where {right arrow over (Q)}(t) ∈Z+2N is a column vector bookkeeping the state of all queues in the system at TTI t, i.e. {right arrow over (Q)}(t)=[q1(t), q2(t) . . . u1(t), u2(t) . . . ]T and {right arrow over (δ)}(t)∈Z2N is a column vector containing the queues net increments/decrements of data units in TTI t. At 630, an incidence matrix A∈Z2N×L is introduced that represents the connections between queues, so that element Ai,j represents the amount of data units per PRB departing from (if negative) or arriving to (if positive) queue i when using link j. Here, it should be noted that the amount of bits transported on each PRB depends on the modulation scheme used in link j at one TTI.
For better understanding, the above is illustrated with a simple example with 2 mobile users, 2 RATs and 2 modulation indexes available for each RAT and user. In such case, there are L=8 links connecting the multi-RAT system with the mobile users, and 4 queues (an incoming and an outgoing queue per user). Thus,
The above means that RAT 1 transmits 1 data unit per PRB allocated when using modulation m1,1,1 and m1,2,1, i.e. using link l1 (q1→u1) and link l5 (q2→u2), and 2 data units per PRB when using m1,1,2 and m1,2,2 (links l2 and l6). On the other hand, RAT 2 transmits 10 and 20 data units per PRB when using modulation m2,1,1 and m2,2,1, and m2,1,2 m2,2,2, respectively.
According to an embodiment, the system works as follows: Data arrives randomly at each queue qi and TTI t. At the same time, in each TTI, the controller makes a scheduling decision and so it assigns a number of PRBs to each link, that is, selecting a modulation index and a RAT for each PRB. Precisely, indicated at 640, it selects a vector {right arrow over (y)} ∈Y⊆Z+L where the (integer) i'th element of the vector indicates the amount of PRBs assigned to link i in that TTI. Hence, at each TTI there is the update
{right arrow over (Q)}
(t+1)=[{right arrow over (Q)}(t)+A{right arrow over (y)}(t)+{right arrow over (B)}(t)]+,
where A{right arrow over (y)}(t) captures the dynamics caused by the controller's decisions and {right arrow over (B)}(t)∈Z2N are the net increments of data units that enter/leave the system (see at 650). In the simple example, y(t)=[5,0,0,1,0,10,0,20]T causes the following updates
Q
1
(t+1)=[Q1(t)−25+B0(t)]+
Q
2
(t+1)=[Q2(t)−420+B1(t)]+
Q
3
(t+1)=[Q3(t)+25]+
Q
4
(t+1)=[Q4(t)+420]+
In addition, the scheduler decides on each TTI which RATs are to be activated/deactivated. Implementation of the scheduler will consider the amount it takes for a secondary RAT to turn on/off, i.e., the scheduler will not assign PRBs on a RAT that is turning on and thus, differently to prior art, it is not assumed that turning on/off RATs is instantaneous. In addition, the MAC scheduler do not assign PRBs to RATs which are in an off cycle due to e.g. coexistence operation in unlicensed spectrum.
Based on the above, at 660, a convex model of the scheduling problem is introduced. Later, it will be shown how queues and discrete scheduling decisions can be included when solving the Lagrange dual problem. Consider the following optimization problem:
where ƒ: X→R, A is an incidence matrix as described above, {right arrow over (b)}∈R2N, and X is a convex subset from conv(Y) where Y is the set of all possible actions. That is, a vector {right arrow over (x)}∈X⊆(Y) indicates the fraction of time each link is scheduled with data, and ƒ({right arrow over (x)}) is a cost derived from that allocation. {right arrow over (b)} represents the (unknown) mean arrival/departure data rate at each node. Making the usual assumption that X*:={arg min{right arrow over (x)}∈X ƒ({right arrow over (x)})|A{right arrow over (x)}+{right arrow over (b)}<0} is nonempty, and so the above problem is feasible.
In order to solve the Problem 1 efficiently, it is essential to (i) ensure that objective function selected is convex (and so Problem 1); but also (ii) that the algorithm used does not require perfect knowledge of {right arrow over (b)}. The first point is important because then it is possible to use standard convex optimization methods, while the second one is because, resource demand is hard to predict (if possible at all) in dense multi-RAT systems. These two points will be addressed in more detail below.
The first one is
a normalized sigmoidal-like function for delay-sensitive flows, where ai and bi are parameters. For example, when ai≈bi≈ρ this function is a good approximation to a step function for voice traffic with rate requirement ρ; and when ai=ρ=bi it can be used to model the utility of adaptive real-time applications with mean rate ρ.
The second utility function that may be considered is
which is useful for elastic (delay-tolerant) flows. {circumflex over (ρ)}i is the maximum aggregated throughput achievable in the system, and ci is the satisfaction growth rate per ρ allocated.
Finally, it may also be considered
U
i({right arrow over (x)})=0, (5)
which captures the case where flows do not require QoS guarantees.
In addition, it is intended to give operators flexibility in the way their infrastructure is utilized. For instance, an operator may want to aggregate system load into the minimum possible subset of RATs in order to save costs. According to an embodiment, this can be done by assigning a weight wr,m on each PRB allocated in RAT r when modulated with index m. The resulting objective function is the following:
where η≥0 is a constant that controls the relative importance of system cost reduction against overall utility satisfaction. That is, for a given η, a solution {right arrow over (x)}* to Problem 1 corresponds to a point in the Pareto optimal trade-off between utility satisfaction and cost minimization. For example, by setting η=0 the objective function would only consider QoS satisfaction irrespective of how the infrastructure is used. Convexity of the objective function has been proved.
Next, at 710, in order to relax the perfect knowledge of the system constraints, Lagrange relaxation will be applied. In short, Lagrange relaxation allows to formulate the dual problem, with which a sequence of primal variables {right arrow over (x)}(t) can be generated that converges to the optimum or a point nearby without requiring to be feasible in each iteration. This is in marked contrast to other iterative methods, such as interior point or projected gradient, and so provides flexibility as to how to select a sequence of actions or gradients. This will be clear shortly, but first the Lagrange dual problem of Problem 1 is considered and introduced as follows:
where q({right arrow over (λ)}):=inf{right arrow over (x)}∈XL({right arrow over (x)},{right arrow over (λ)}) with L({right arrow over (x)},{right arrow over (λ)})=ƒ({right arrow over (x)})+{right arrow over (λ)}T (Δ{right arrow over (x)}+{right arrow over (b)}).
It is noted that solving Problem 2 is equivalent to solving Problem 1 when strong duality holds (which is always the case when the Slater condition is satisfied, i.e., there exists a point {right arrow over (x)} ∈X such that A{right arrow over (x)}+{right arrow over (B)}<0). Further, it is noted that q({right arrow over (λ)}) is concave (cf. S. Boyd and L. Vanderberghe, Convex Optimization, New York, N.Y., USA: Cambridge University Press, 2004). Hence, q({right arrow over (λ)}) can be maximized using the standard (sub)gradient ascent method with constant step size, i.e., with update
{right arrow over (λ)}(t+1)=[{right arrow over (λ)}(t)+α(A{right arrow over (x)}(t)+{right arrow over (b)})]+, (8)
where {right arrow over (x)}(t)∈ arg min{right arrow over (x)}∈XL({right arrow over (x)},{right arrow over (λ)}(t)) and α>0. Now, observe that update (8) has a queue-like form, and that if {right arrow over (b)} is replaced by a random variable {right arrow over (B)}(t), and {right arrow over (x)}(t) by {right arrow over (y)}(t) one can write
{right arrow over (μ)}(t+1)=[{right arrow over (μ)}(t)+α(A{right arrow over (y)}(t)+{right arrow over (B)}(t))]+. (9)
with {right arrow over (λ)}(1)={right arrow over (μ)}(1). Further, if {right arrow over (μ)}(t) is divided by α one has
{right arrow over (Q)}
(t+1)=[{right arrow over (Q)}(t)+i A{right arrow over (y)}(t)+{right arrow over (B)}(t))]+=[{right arrow over (Q)}(t)+{right arrow over (δ)}(t)]+. (10)
yielding the queue updates as given above. As shown by V. Valls et al. (V. Valls and D. J. Leith, A Convex Optimization Approach to Discrete Optimal Control, https://arxiv.org/abs/1701.0241, 2017), by ensuring that the difference ∥{right arrow over (λ)}(t)−{right arrow over (μ)}(t)∥2=∥{right arrow over (λ)}(t)−α{right arrow over (Q)}(t)∥2 is uniformly bounded, one will have that the scaled queue occupancies “behave” like Lagrange multipliers and so the sequence of discrete actions {right arrow over (y)}(t) will be optimal. For this to hold, however, it is required that (i) {right arrow over (B)}(t) is an i.i.d. stochastic process with finite variance and mean {right arrow over (b)}
and (ii) the difference ∥Σi=1i{right arrow over (x)}(t)−{right arrow over (y)}(t)∥2 is uniformly bounded.
Systems and methods described herein employ an algorithm to select optimal sequences of discrete actions. The purpose is twofold: (i) to obtain discrete solutions that preserve convergence and stability; and (ii) to include restrictions in the order in which actions are taken (e.g. to account for delays when RATs are being switched on/off). As noted earlier, the first objective is met as long as discrete sequences {right arrow over (y)}(t) are built such that ∥Σi=1i{right arrow over (x)}(t)−{right arrow over (y)}(t)∥2 remains uniformly bounded. Moreover, V. Valls et al. (V. Valls and D. J. Leith, A Convex Optimization Approach to Discrete Optimal Control, 2017) show that shifted and/or reordered sequences do not affect that boundedness. This flexibility can be exploited to accommodate system constraints.
According to an embodiment, at 720, a block-shift scheduling algorithm is executed. Specifically, the above may be conveyed in Algorithm 1, as shown below:
Let W:=[{right arrow over (y)}1, . . . , {right arrow over (y)}|Y|] denote a matrix that collects all points in Y. Then, in step 6, Algorithm 1 finds for every TTI t, the vector of integer values {right arrow over (y)}c closest to {right arrow over (x)}(t) (computed using the convex optimization approach explained earlier), ensuring in this way that the euclidean distance ∥Σi=1i{right arrow over (x)}(i)−{right arrow over (y)}(i)∥2 is uniformly bounded. It should be noted here that, differently, V. Valls et al. (in their document cited above) propose to use convex optimization to minimize the distance between {right arrow over (x)} and a convex hull of |Y|-dimensional standard basis vectors. However, in the present case the dimensionality of W can be very large and so this approach renders impractical for real-time operation. In contrast, embodiments exploit the fact that {right arrow over (y)} is any positive integer point contained in Z+L and rounding is therefore sufficient to ensure boundedness.
The above enables to select sequences of discrete actions that guarantee convergence and stability, but they do not necessarily satisfy system constraints. As an example, an action y(t) may allow turning off a RAT. Hence, in such case, it must be ensured that subsequent actions do not use the deactivated RAT for, at least, the number of ITIs that it takes for the RAT to turn back on again. It was mentioned above that delayed or shifted sequences do not affect the boundedness of ∥Σi=1i{right arrow over (x)}(i)−{right arrow over (y)}(i)∥2. Hence, in order to accommodate practical constraints of the system, a block-shift approach may be employed. According to an embodiment the block-shift approach bundles τ discrete actions in a block of solutions from W that are reordered so that system constraints are met, and that are applied in the next τ slots (i.e. the sequence is shifted). To this aim, in Algorithm 1, Yc, Ys ∈NL×τ denote two matrices that store the current and shifted sequences, respectively. For convenience of notation, X[i] is used to refer to the column vector i of matrix X. Now, every τ TTI intervals, sequences stored in Yc are reordered (step 9) and one obtains a new block of actions Ys for the next τ intervals. The sorting process will be described in greater detail below.
As noted earlier, reordering blocks of actions allows to take into account different system constraints. Embodiments of the present invention use this feature, at 730, to consider the (de)activation delay of RATs, i.e., the time it takes for a RAT to be fully operative after it has been turned off and vice versa. In particular, it will be ensured that no resources are scheduled while RATs or modulations are not available.
An embodiment of the reordering algorithm is depicted below in Algorithm 2:
Link availability information
Algorithm 2 takes as input parameters the matrices of current actions, Yc, and the duration of a block, τ, and returns the actions reordered in matrix Ys. The algorithm makes use of an auxiliary Boolean matrix D∈{0,1}L×τ in which each element Di,j takes value 1 if link i is not available at TTI j, and 0 otherwise. In this way, D allows to keep track of links that are unavailable at some TTI within the block because, e.g., a RAT is turning on and so it is not yet operational, a RAT is not available due to an off duty cycle (e.g. in unlicensed operation), some modulation level is not reliable for that TTI due to fading, etc.
In addition, the algorithm uses set S to store the indexes of those actions that have been included already in Ys. Now, for each interval t of the τ-block, the algorithm selects those actions from Yc that assign minimal (none) PRBs to links that are set to 1 in D[t](unavailable) as indicated in steps 5-6 of Algorithm 2. If unavailable links still have some assignment, the algorithm clears this issue in step 7, stores the result in Ys, and iterates until the block is finished up and no actions remain unassigned. In this context it should be noted that If τ is not sufficiently large, the sequence of actions in Yc may not contain solutions that satisfy all constraints in some interval t. In this case, the algorithm selects the action that better accommodates them and modifies it accordingly. Although stability guarantees are lost by doing this, simulations reveal that it is a good approximation in all scenarios of interest. Note however that a sufficiently large τ mitigates this issue.
Finally, at 740, the scheduler takes a joint decision on resource scheduling (i.e. the number of PRBs per RAT/user link and their modulation) and on the power state of each RAT (i.e. RAT activation/deactivation). Hence, the scheduler dynamically turns on/off secondary RATs during the operation time from a common MAC perspective. This maximizes the amount of time secondary RATs are turned off or in sleep mode and, consequently, operational cost, energy consumption and inter-cell interference in the system will be reduced. To do so, in contrast to prior art solutions, the proposed approach exploits the connection between queue states and Lagrange multipliers to make optimal decisions.
Many modifications and other embodiments of the invention set forth herein will come to mind the one skilled in the art to which the invention pertains having the benefit of the teachings presented in the foregoing description and the associated drawings. Therefore, it is to be understood that the invention is not to be limited to the specific embodiments disclosed and that modifications and other embodiments are intended to be included within the scope of the appended claims. Although specific terms are employed herein, they are used in a generic and descriptive sense only and not for purposes of limitation.
While the invention has been illustrated and described in detail in the drawings and foregoing description, such illustration and description are to be considered illustrative or exemplary and not restrictive. It will be understood that changes and modifications may be made by those of ordinary skill within the scope of the following claims. In particular, the present invention covers further embodiments with any combination of features from different embodiments described above and below. Additionally, statements made herein characterizing the invention refer to an embodiment of the invention and not necessarily all embodiments.
The terms used in the claims should be construed to have the broadest reasonable interpretation consistent with the foregoing description. For example, the use of the article “a” or “the” in introducing an element should not be interpreted as being exclusive of a plurality of elements. Likewise, the recitation of “or” should be interpreted as being inclusive, such that the recitation of “A or B” is not exclusive of “A and B,” unless it is clear from the context or the foregoing description that only one of A and B is intended. Further, the recitation of “at least one of A, B and C” should be interpreted as one or more of a group of elements consisting of A, B and C, and should not be interpreted as requiring at least one of each of the listed elements A, B and C, regardless of whether A, B and C are related as categories or otherwise. Moreover, the recitation of “A, B and/or C” or “at least one of A, B or C” should be interpreted as including any singular entity from the listed elements, e.g., A, any subset from the listed elements, e.g., A and B, or the entire list of elements A, B and C.
Number | Date | Country | Kind |
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17163397.7 | Mar 2017 | EP | regional |
This application is a U.S. National Phase Application under 35 U.S.C. § 371 of International Application No. PCT/EP2018/057818, filed on Mar. 27, 2018, and claims benefit to European Patent Application No. EP 17163397.7, filed on Mar. 28, 2017. The International Application was published in English on Oct. 4, 2018, as WO 2018/178100 under PCT Article 21(2).
Filing Document | Filing Date | Country | Kind |
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PCT/EP2018/057818 | 3/27/2018 | WO | 00 |