On the Asymptotic Analysis of Discontinuous Systems

In this paper we consider some Kolmogorov -Feller equations with a small parameter h. We present a method for constructing the exact (exponential) asymptotics of the fundamental solution of these equations for finite time intervals uniformly with respect to h. This means that we construct an asympt

## Abstract Using the generalized; analytic function of Vekua we obtain the results on the asymptotic behaviour of form factors deduced form the analytical theory of elementary particles.

Let N = N (q) be the number of nonzero digits in the binary expansion of the odd integer q. A construction method is presented which produces, among other results, a block circulant complex Hadamard matrix of order 2 α q, where α ≥ 2N -1. This improves a recent result of Craigen regarding the asympt