Asymptotic Behaviour of Spectral Functions and Singularities of Wightman Functions and Field Commutators

## Abstract Beginning in 2006, G. Gentili and D. C. Struppa developed a theory of regular quaternionic functions with properties that recall classical results in complex analysis. For instance, in each Euclidean ball __B__(0, __R__) centered at 0 the set of regular functions coincides with that of

In this article we investigated the spectrum of the quadratic pencil of Schro-Ž . Ž . dinger operators L generated in L ‫ޒ‬ by the equation 2 q 2 w yyЉ q V x q 2U x y y s 0, x g ‫ޒ‬ s 0, ϱ 2 q Ž . about the spectrum of L have also been applied to radial Klein᎐Gordon and one-dimensional Schrodinger

## Abstract The present paper is devoted to the asymptotic and spectral analysis of an aircraft wing model in a subsonic air flow. The model is governed by a system of two coupled integro‐differential equations and a two parameter family of boundary conditions modelling the action of the self‐strai

Two simple pairs of asymptotic expansions in terms of Hermite functions are obtained for the'solutions of the ellipsoidal wave equation.

A holonomic function is an analytic function, which satisfies a linear differential equation Lf = 0 with polynomial coefficients. In particular, the elementary functions exp, log, sin, etc., and many special functions such as erf, Si, Bessel functions, etc., are holonomic functions. In a previous p