Multi-Group Multicast Beamforming by Superiorized Projections Onto Convex Sets

Abstract: In this paper, we propose an iterative algorithm to address the nonconvex multi-group multicast beamforming problem with quality-of-service constraints and per-antenna power constraints. We formulate a convex relaxation of the problem as a semidefinite program in a real Hilbert space, which allows us to approximate a point in the feasible set by iteratively applying a bounded perturbation resilient fixedpoint mapping. Inspired by the superiorization methodology, we use this mapping as a basic algorithm, and we… Show more

“…Nevertheless, we will consider nonconvex objective functions in the following. Moreover, as in [15], we slightly deviate from [8] and [7], by using proximal mappings instead of subgradients of the superiorization objective to define the perturbations. This allows for a simple trade-off between the perturbations' magnitude and their contribution to reducing the objective value.…”

“…The convergence of the superiorized APSM in ( 14) with perturbations according to (15) or ( 17) is investigated below.…”

“…Then the algorithm in (14) with (β n ) n∈N ∈ 1 + (N) and perturbations according to (15) or ( 17) is guaranteed to converge to a point x ∈ B minimizing all but finitely many functions of the sequence (Θ n ) n∈N .…”

“…The proposed iterative MIMO dectectors with perturbations according to (15) and (17), respectively, are summarized in Algorithm 1 below.…”

“…thereof follows automatically [7]. In recent years, bounded perturbation resilience has been proven for several classes of algorithms, including block-iterative projection methods [10], amalgamated projection methods [11], dynamic string averaging projection methods [12], [13], and fixed point iterations of averaged nonexpansive mappings [14] (which include POCS with relaxed projections [15]).…”

Superiorized Adaptive Projected Subgradient Method with Application to MIMO Detection

“…Nevertheless, we will consider nonconvex objective functions in the following. Moreover, as in [15], we slightly deviate from [8] and [7], by using proximal mappings instead of subgradients of the superiorization objective to define the perturbations. This allows for a simple trade-off between the perturbations' magnitude and their contribution to reducing the objective value.…”

“…The convergence of the superiorized APSM in ( 14) with perturbations according to (15) or ( 17) is investigated below.…”

“…Then the algorithm in (14) with (β n ) n∈N ∈ 1 + (N) and perturbations according to (15) or ( 17) is guaranteed to converge to a point x ∈ B minimizing all but finitely many functions of the sequence (Θ n ) n∈N .…”

“…The proposed iterative MIMO dectectors with perturbations according to (15) and (17), respectively, are summarized in Algorithm 1 below.…”

“…thereof follows automatically [7]. In recent years, bounded perturbation resilience has been proven for several classes of algorithms, including block-iterative projection methods [10], amalgamated projection methods [11], dynamic string averaging projection methods [12], [13], and fixed point iterations of averaged nonexpansive mappings [14] (which include POCS with relaxed projections [15]).…”

Superiorized Adaptive Projected Subgradient Method with Application to MIMO Detection

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