All-or-nothing generalized assignment with application to scheduling advertising campaigns

Ron Adany, Moran Feldman, Elad Haramaty, Rohit Khandekar, Baruch Schieber, Roy Schwartz, Hadas Shachnai, Tami Tamir

פרסום מחקרי: פרסום בכתב עתמאמרביקורת עמיתים

תקציר

We study a variant of the generalized assignment problem (GAP), which we label all-or-nothing GAP (AGAP). We are given a set of items, partitioned into n groups, and a set of mbins. Each item ℓ has size sℓ > 0, and utility α ℓj ≥ 0 if packed in bin j. Each bin can accommodate at most one item from each group; the total size of the items in a bin cannot exceed its capacity. A group of items is satisfied if all of its items are packed. The goal is to find a feasible packing of a subset of the items in the bins such that the total utility from satisfied groups is maximized. We motivate the study of AGAP by pointing out a central application in scheduling advertising campaigns. Our main result is an O(1)-approximation algorithm for AGAP instances arising in practice, in which each group consists of at most m/2 items. Our algorithm uses a novel reduction of AGAP to maximizing submodular function subject to a matroid constraint. For AGAP instances with a fixed number of bins, we develop a randomized polynomial time approximation scheme (PTAS), relying on a nontrivial LP relaxation of the problem. We present a (3+ϵ)-approximation as well as PTASs for other special cases of AGAP, where the utility of any item does not depend on the bin in which it is packed. Finally, we derive hardness results for the different variants of AGAP studied in this paper.

שפה מקוריתאנגלית
מספר המאמר38
כתב עתACM Transactions on Algorithms
כרך12
מספר גיליון3
מזהי עצם דיגיטלי (DOIs)
סטטוס פרסוםפורסם - אפר׳ 2016

הערה ביבליוגרפית

Publisher Copyright:
© 2016 ACM.

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