English

Flexible Resource Allocation for Clouds and All-Optical Networks

Data Structures and Algorithms 2016-05-18 v1

Abstract

Motivated by the cloud computing paradigm, and by key optimization problems in all-optical networks, we study two variants of the classic job interval scheduling problem, where a reusable resource is allocated to competing job intervals in a flexible manner. Each job, JiJ_i, requires the use of up to rmax(i)r_{max}(i) units of the resource, with a profit of pi1p_i \geq 1 accrued for each allocated unit. The goal is to feasibly schedule a subset of the jobs so as to maximize the total profit. The resource can be allocated either in contiguous or non-contiguous blocks. These problems can be viewed as flexible variants of the well known storage allocation and bandwidth allocation problems. We show that the contiguous version is strongly NP-hard, already for instances where all jobs have the same profit and the same maximum resource requirement. For such instances, we derive the best possible positive result, namely, a polynomial time approximation scheme. We further show that the contiguous variant admits a (54+ε)(\frac{5}{4} + \varepsilon)-approximation algorithm, for any fixed ε>0\varepsilon > 0, on instances whose job intervals form a proper interval graph. At the heart of the algorithm lies a non-standard parameterization of the approximation ratio itself, which is of independent interest. For the non-contiguous case, we uncover an interesting relation to the paging problem that leads to a simple O(nlogn)O(n \log n) algorithm for uniform profit instances of n jobs. The algorithm is easy to implement and is thus practical.

Keywords

Cite

@article{arxiv.1605.04982,
  title  = {Flexible Resource Allocation for Clouds and All-Optical Networks},
  author = {Dmitriy Katz and Baruch Schieber and Hadas Shachnai},
  journal= {arXiv preprint arXiv:1605.04982},
  year   = {2016}
}
R2 v1 2026-06-22T14:02:17.304Z