Top Singular Value in Sum-Products of Random Matrices
Abstract
We study the top singular value for a sum of m independent n × n random matrices, each of which is a product of N i.i.d. n× n Gaussian matrices. Our main conceptual observation is that when m,n,N→ ∞, the top singular value coincides with the partition function in a random energy model at the inverse temperature β=2(N-1)/(n m), with energies depending on the ratio N/n. We provide several non-asymptotic results making this approximation precise.
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