Edgeworth expansion and large deviations for the coefficients of products of positive random matrices

Abstract

Consider the matrix products Gn: = gn … g1, where (gn)n≥ 1 is a sequence of independent and identically distributed positive random d× d matrices. Under the optimal third moment condition, we first establish a Berry-Esseen theorem and an Edgeworth expansion for the (i,j)-th entry Gni,j of the matrix Gn, where 1 ≤ i, j ≤ d. Using the Edgeworth expansion for Gni,j under the changed probability measure, we then prove precise upper and lower large deviation asymptotics for the entries Gni,j subject to an exponential moment assumption. As applications, we deduce local limit theorems with large deviations for Gni,j and upper and lower large deviations bounds for the spectral radius (Gn) of Gn. A byproduct of our approach is the local limit theorem for Gni,j under the optimal second moment condition. In the proofs we develop a spectral gap theory for the norm cocycle and for the coefficients, which is of independent interest.