A notion of nonuniform multiresolution analysis(NUMRA)with multiplicity D(a positive integer)based on the theory of one-dimensional spectral pairs is studie
The q-Laplace transforms of the basic analogue of H-function of two variables have been evaluated in the present paper.Special cases of the main results are
In the present investigation,the Mittag-Leffler function with their normalization are considered.Several sufficient conditions are obtained so that the Mitt
We study algebraic equalities and their topological consequences in weighted Banach,Fréchet,or(LB)-spaces of holomorphic-like functions on a locally compac
The aim of this paper is to study some properties of the generalized incomplete hypergeometric functions.Here we establish two theorems which provides the i
The subject of fractional calculus has gained noticeable importance and popularity due to its established applications in many fields of science and enginee
We study,the Szeg(o)asymptotics of extremal polynomials with respect to a measure which consists of an absolutely continuous part on [-1,1] and a infinite n
In this poster our aim is to derive two generalized integral formulas involving generalized Bessel functions of the first kind,which are expressed in terms
Novel Krylov-subspace algorithms were developed for massively parallel quantum material simulations or electronic structure calculations.The method solves t
The main object of this paper is to derive certain transformation formulas expressing potentially useful incomplete hypergeometric functions in terms of a f