Efficient Approximation Algorithms for Multi-Antennae Largest Weight Data Retrieval

Abstract

In a mobile network, wireless data broadcast over m channels (frequencies) is a powerful means for distributed dissemination of data to clients who access the channels through multi-antennae equipped on their mobile devices. The δ-antennae largest weight data retrieval (δALWDR) problem is to compute a schedule for downloading a subset of data items that has a maximum total weight using δ antennae in a given time interval. In this paper, we propose a ratio 1-1e-ε approximation algorithm for the δ-antennae largest weight data retrieval (δALWDR) problem that has the same ratio as the known result but a significantly improved time complexity of O(21ε1εm7T3.5L) from O(ε3.5m3.5εT3.5L) when δ=1 lu2014data. To our knowledge, our algorithm represents the first ratio 1-1e-ε approximation solution to δALWDR for the general case of arbitrary δ. To achieve this, we first give a ratio 1-1e algorithm for the γ-separated δALWDR (δAγLWDR) with runtime O(m7T3.5L), under the assumption that every data item appears at most once in each segment of δAγLWDR, for any input of maximum length L on m channels in T time slots. Then, we show that we can retain the same ratio for δAγLWDR without this assumption at the cost of increased time complexity to O(2γm7T3.5L). This result immediately yields an approximation solution of same ratio and time complexity for δALWDR, presenting a significant improvement of the known time complexity of ratio 1-1e-ε approximation to the problem.