Bulk asymptotics of skew-orthogonal polynomials for quartic double well potential and universality in the matrix model

Abstract

We derive bulk asymptotics of skew-orthogonal polynomials (sop) πm, β=1, 4, defined w.r.t. the weight (-2NV(x)), V (x)=gx4/4+tx2/2, g>0 and t<0. We assume that as m,N ∞ there exists an ε > 0, such that ε≤ (m/N)≤ λ cr-ε, where λ cr is the critical value which separates sop with two cuts from those with one cut. Simultaneously we derive asymptotics for the recursive coefficients of skew-orthogonal polynomials. The proof is based on obtaining a finite term recursion relation between sop and orthogonal polynomials (op) and using asymptotic results of op derived in bleher. Finally, we apply these asymptotic results of sop and their recursion coefficients in the generalized Christoffel-Darboux formula (GCD) ghosh3 to obtain level densities and sine-kernels in the bulk of the spectrum for orthogonal and symplectic ensembles of random matrices.