Free Perpetuities I: Existence, Subordination and Tail Asymptotics
Abstract
We study the free analogue of the classical affine fixed-point (or perpetuity) equation \[ X d= A1/2X\,A1/2 + B, \] where X is assumed to be *-free from the pair (A,B), with A 0 and B=B*. Our analysis covers both the subcritical regime, where τ(A)<1, and the critical case τ(A)=1, in which the solution X is necessarily unbounded. When τ(A)=1, we prove that the series defining X converges bilaterally almost uniformly (and almost uniformly under additional tail assumptions), while the perpetuity fails to have higher moments even if all moments of A and B exist. Our approach relies on a detailed study of the asymptotic behavior of moments under free multiplicative convolution, which reveals a markedly different behavior from the classical setting. By employing subordination techniques for non-commutative random variables, we derive precise asymptotic estimates for the tail of the distributions of X in both one-sided and symmetric cases. Interestingly, in the critical case, the free perpetuity exhibits a power-law tail behavior that mirrors the phenomenon observed in the celebrated Kesten's theorem.
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