Decomposition of some special functions with respect to the cyclic group of order n and applications

Let n be an arbitrary positive integer, We decompose the Laguerre polynomials L(m ~) as the sum of n polynomials L~'"'k); mE~; k=O, 1 ..... n-1; defined by In this paper, we establish the close relation between these components and the Brafman polynomials. The use of a technique described in an ear

Given a polynomial solution of a differential equation, its m-ary decomposition, i.e. its decomposition as a sum of m polynomials P [j] (x) = k α j,k x λ j,k containing only exponents λ j,k with λ j,k+1 -λ j,k = m, is considered. A general algorithm is proposed in order to build holonomic equations

A system of functions 0-normalized with respect to the operator ∆ in some domain Ω ⊂ R n is constructed. Application of this system to boundary value problems for the polyharmonic equation is considered. Connection between harmonic functions and solutions of the Helmholtz equation is investigated.

We present a general recursive algorithm for the efficient construction of N-body wave functions that belong to a given irreducible representation (irrep) of the orthogonal group and are at the same time characterized by a well-defined permutational symmetry. The main idea is to construct independen