How many matrices can be spectrally balanced simultaneously?

Abstract

We prove that any positive definite d × d matrices, M1,…,M, of full rank, can be simultaneously spectrally balanced in the following sense: for any k < d such that ≤ d-1k-1 , there exists a matrix A satisfying λ1(AT Mi A) Tr( AT Mi A ) < 1k for all i, where λ1(M) denotes the largest eigenvalue of a matrix M. This answers a question posed by Peres, Popov and Sousi and completes the picture described in that paper regarding sufficient conditions for transience of self-interacting random walks. Furthermore, in some cases we give quantitative bounds on the transience of such walks.