The Tracy-Widom law for the Largest Eigenvalue of F Type Matrix
Abstract
Let Ap=YY*m and Bp=XX*n be two independent random matrices where X=(Xij)p × n and Y=(Yij)p × m respectively consist of real (or complex) independent random variables with EXij=EYij=0, E|Xij|2=E|Yij|2=1. Denote by λ1 the largest root of the determinantal equation (λ Ap-Bp)=0. We establish the Tracy-Widom type universality for λ1 under some moment conditions on Xij and Yij when p/m and p/n approach positive constants as p→∞.
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