Logarithmic Regret in Multisecretary and Online Linear Programs with Continuous Valuations

Abstract

I study how the shadow prices of a linear program that allocates an endowment of nβ ∈ Rm resources to n customers behave as n → ∞. I show the shadow prices (i) adhere to a concentration of measure, (ii) converge to a multivariate normal under central-limit-theorem scaling, and (iii) have a variance that decreases like (1/n). I use these results to prove that the expected regret in Li2019b online linear program is ( n), both when the customer variable distribution is known upfront and must be learned on the fly. I thus tighten Li2019b upper bound from O( n n) to O( n), and extend Lueker1995 ( n) lower bound to the multi-dimensional setting. I illustrate my new techniques with a simple analysis of Arlotto2019 multisecretary problem.