Statistical and computational challenges in ranking

Abstract

We consider the problem of ranking n experts according to their abilities, based on the correctness of their answers to d questions. This is modeled by the so-called crowd-sourcing model, where the answer of expert i on question k is modeled by a random entry, parametrized by Mi,k which is increasing linearly with the expected quality of the answer. To enable the unambiguous ranking of the experts by ability, several assumptions on M are available in the literature. We consider here the general isotonic crowd-sourcing model, where M is assumed to be isotonic up to an unknown permutation π* of the experts - namely, Mπ*-1(i),k ≥ Mπ*-1(i+1),k for any i∈ [n-1], k ∈ [d]. Then, ranking experts amounts to constructing an estimator of π*. In particular, we investigate here the existence of statistically optimal and computationally efficient procedures and we describe recent results that disprove the existence of computational-statistical gaps for this problem. To provide insights on the key ideas, we start by discussing simpler and yet related sub-problems, namely sub-matrix detection and estimation. This corresponds to specific instances of the ranking problem where the matrix M is constrained to be of the form λ 1\S× T\ where S⊂ [n], T⊂ [d]. This model has been extensively studied. We provide an overview of the results and proof techniques for this problem with a particular emphasis on the computational lower bounds based on low-degree polynomial methods. Then, we build upon this instrumental sub-problem to discuss existing results and algorithmic ideas for the general ranking problem.

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