Linear systems, Hankel products and the sinh-Gordon equation

Abstract

Let (-A,B,C) be a linear system in continuous time t>0 with input and output space C2 and state space H. The scattering functions φ(x)(t)=Ce-(t+2x)AB determines a Hankel integral operator φ(x); if φ(x) is trace class, then the Fredholm determinant τ (x)= (I+φ(x)) determines the tau function of (-A,B,C). The paper establishes properties of algebras including Rx=∫x∞ e-tABCe-tAdt on H. Thus the paper obtains solutions of the sinh-Gordon PDE. The tau function for sinh-Gordon satisfies a particular Painl\'eve III' nonlinear ODE and describes a random matrix model, with asymptotic distribution found by the Coulomb fluid method to be the solution of an electrostatic variational problem on an interval.