Integral Representations of the Wilson Polynomials and the Continuous Dual Hahn Polynomials

studied the expansion of the colored Jones polynomial of a knot in powers of q &1 and color. They conjectured an upper bound on the power of color versus the power of q &1. They also conjectured that the bounding line in their expansion generated the inverse Alexander Conway polynomial. These conjec

In this paper we introduce and study the notions of isotropic mapping and essential kernel. In addition some theorems on the Borel graph and Baire mapping for polynomial operators are proved. It is shown that a polynomial functional from an infinite dimensional complex linear space into the field of

Polynomial and Pade representations of the kinetic energy component ẃ x w x T of the correlation energy density functional E are presented in this article. Two c c w x approximate local formulas similar to the Wigner form for E are investigated for c w x T . Applications of these formulas along with

A necessary and sufficient condition of regularity of \((0,1, \ldots, m-2, m)\)-interpolation on the zeros of the Jacobi polynomials \(P_{n}^{(x, \beta)}(x)(\alpha, \beta \geqslant-1)\) in a manageable form is established. Meanwhile, the explicit representation of the fundamental polynomials, when t