A recursive proof of a B-spline identity for degree elevation

Based on the classical Hermite spline interpolant H 2n-1 , which is the piecewise interpolation polynomial of class C n-1 and degree 2n -1, a piecewise interpolation polynomial H 2n of degree 2n is given. The formulas for computing H 2n by H 2n-1 and computing H 2n+1 by H 2n are shown. Thus a simple

A short proof is given of the fact that every graph has an interval representation of depth 2 in which each vertex u is represented by at most &f(u) + 11 intervals, except for an arbitrarily specified vertex w that appears left-most in the representation and is represented by at most [&d(w) + 1)1 in

The Kostka numbers K \* + play an important role in symmetric function theory, representation theory, combinatorics and invariant theory. The q-Kostka polynomials K \* + (q) are the q-analogues of the Kostka numbers and generalize and extend the mathematical meaning of the Kostka numbers. Lascoux an