Prophet Secretary for Combinatorial Auctions and Matroids

The secretary and the prophet inequality problems are central to the field of Stopping Theory. Recently, there has been a lot of work in generalizing these models to multiple items because of their applications in mechanism design. The most important of these generalizations are to matroids and to combinatorial auctions (extends bipartite matching). Kleinberg-Weinberg \cite{KW-STOC12} and Feldman et al. \cite{feldman2015combinatorial} show that for adversarial arrival order of random variables the optimal prophet inequalities give a $1/2$-approximation. For many settings, however, it's conceivable that the arrival order is chosen uniformly at random, akin to the secretary problem. For such a random arrival model, we improve upon the $1/2$-approximation and obtain $(1-1/e)$-approximation prophet inequalities for both matroids and combinatorial auctions. This also gives improvements to the results of Yan \cite{yan2011mechanism} and Esfandiari et al. \cite{esfandiari2015prophet} who worked in the special cases where we can fully control the arrival order or when there is only a single item. Our techniques are threshold based. We convert our discrete problem into a continuous setting and then give a generic template on how to dynamically adjust these thresholds to lower bound the expected total welfare.Comment: Preliminary version appeared in SODA 2018. This version improves the writeup on Fixed-Threshold algorithm

Online Decision Making via Prophet Setting

In the study of online problems, it is often assumed that there exists an adversary who acts against the algorithm and generates the most challenging input for it. This worst-case assumption in addition to the complete uncertainty about future events in the traditional online setting sometimes leads to worst-case scenarios with super-constant approximation impossibilities. In this dissertation, we go beyond this worst-case analysis of problems by taking advantage of stochastic modeling. Inspired by the prophet inequality problem, we introduce the prophet setting for online problems in which the probability distributions of the future inputs are available. This modeling not only considers the availability of statistical data in the design of mechanisms but also results in significantly more efficient algorithms. To illustrate the improvements achieved by this setting, we study online problems within the contexts of auctions and networks. We begin our study with analyzing a fundamental online problem in optimal stopping theory, namely prophet inequality, in the special cases of iid and large markets, and general cases of matroids and combinatorial auctions and discuss its applications in mechanism design. The stochastic model introduced by this problem has received a lot of attention recently in modeling other real-life scenarios, such as online advertisement, because of the growing ability to fit distributions for user demands. We apply this model to network design problems with a wide range of applications from social networks to power grids and communication networks. In this dissertation, we give efficient algorithms for fundamental network design problems in the prophet setting and present a general framework that demonstrates how to develop algorithms for other problems in this setting