A Triple Product Identity for Macdonald Polynomials

We determine the identities of degree F 9 satisfied by the new ternary opera-Ž . tions abc q bca q cab q acb q bac q cba symmetric sum , abc q bca q cab y Ž . Ž . acb y bac y cba alternating sum , and abc q bca q cab cyclic sum on every Ž . Ž . triple system satisfying the total associativity identi

In this note, we present a direct product construction for 5-sparse triple systems.

We investigate orthogonal polynomials for a Sobolev type inner product \(\langle f, g\rangle=(f, g)+\lambda f^{\prime}(c) g^{\prime}(c)\), where \((f, g)\) is an ordinary inner product in \(L_{2}(\mu)\) with \(\mu\) a positive measure on the real line. We compare the Sobolev orthogonal polynomials w

Given an undirected graph with nonnegative edge lengths and nonnegative vertex weights, the routing requirement of a pair of vertices is assumed to be the product of their weights. The routing cost for a pair of vertices on a given spanning tree is defined as the length of the path between them mult

## Abstract Let __d__μ(__x__) = (1 − __x__^2^)^α−1/2^__dx__,α> − 1/2, be the Gegenbauer measure on the interval [ − 1, 1] and introduce the non‐discrete Sobolev inner product where λ>0. In this paper we will prove a Cohen type inequality for Fourier expansions in terms of the polynomials orthogona

A new formula for the product of the zeros of a Bessel function of the first kind of positive order, or the zeros of its nth derivative, where the value of n does not exceed the order of the Bessel function, is presented, together with an outline of its proof.  2002 Elsevier Science (USA)