State Dependent Performative Prediction with Stochastic Approximation
Abstract
This paper studies the performative prediction problem which optimizes a stochastic loss function with data distribution that depends on the decision variable. We consider a setting where the agent(s) provides samples adapted to the learner's and agent's previous states. The said samples are used by the learner to optimize a loss function. This closed loop algorithm is studied as a state-dependent stochastic approximation (SA) algorithm, where we show that it finds a fixed point known as the performative stable solution. Our setting models the unforgetful nature and the reliance on past experiences of agent(s). Our contributions are three-fold. First, we demonstrate that the SA algorithm can be modeled with biased stochastic gradients driven by a controlled Markov chain (MC) whose transition probability is adapted to the learner's state. Second, we present a novel finite-time performance analysis of the state-dependent SA algorithm. We show that the expected squared distance to the performative stable solution decreases as , where is the iteration number. Third, numerical experiments are conducted to verify our findings.
Cite
@article{arxiv.2110.00800,
title = {State Dependent Performative Prediction with Stochastic Approximation},
author = {Qiang Li and Hoi-To Wai},
journal= {arXiv preprint arXiv:2110.00800},
year = {2021}
}
Comments
24 pages, 9 figures