AND Testing and Robust Judgement Aggregation
Abstract
A function is called an approximate AND-homomorphism if choosing randomly, we have that with probability at least , where . We prove that if is an approximate AND-homomorphism, then is -close to either a constant function or an AND function, where as . This improves on a result of Nehama, who proved a similar statement in which depends on . Our theorem implies a strong result on judgement aggregation in computational social choice. In the language of social choice, our result shows that if is -close to satisfying judgement aggregation, then it is -close to an oligarchy (the name for the AND function in social choice theory). This improves on Nehama's result, in which decays polynomially with . Our result follows from a more general one, in which we characterize approximate solutions to the eigenvalue equation , where is the downwards noise operator , is -valued, and is -valued. We identify all exact solutions to this equation, and show that any approximate solution in which and are close is close to an exact solution.
Keywords
Cite
@article{arxiv.1911.00159,
title = {AND Testing and Robust Judgement Aggregation},
author = {Yuval Filmus and Noam Lifshitz and Dor Minzer and Elchanan Mossel},
journal= {arXiv preprint arXiv:1911.00159},
year = {2019}
}
Comments
43 pages