On the solution of the Zakharov-Shabat system, which arises in the analysis of the largest real eigenvalue in the real Ginibre ensemble

Abstract

Let λmax be a shifted maximal real eigenvalue of a random N× N matrix with independent N(0,1) entries (the `real Ginibre matrix') in the N∞ limit. It was shown by Poplavskyi, Tribe, Zaboronski PZT that the limiting distribution of the maximal real eigenvalue has s-∞ asymptotics P [ λmax < s ] = e122π ζ(32)s + O(1), where ζ is the Riemann zeta-function. This limiting distribution was expressed by Baik, Bothner BB18 in terms of the solution q(x) of a certain Zakharov-Shabat inverse scattering problem, and the asymptotics was extended to the form P [ λmax < s ] = e122πζ(32)t c(1+O(1)),\ s-∞. We show that q(x) is a smooth function, which behaves as 1x as x-∞. Second, we show that the error term in the asymptotics is subexponential, i.e. smaller that e-C|s| for any C. Third, we identify the constant c as a conserved quantity of a certain fast decaying solution u(x,t) of the Korteweg-de Vries equation. This, in principle, gives a way to determine c via the known long-time t+∞ asymptotics of u(x,t). We also conjecture a representation for the c in terms of an integral of the Hastings-MacLeod solution of Painlev\'e II equation.