Improvement on the bound of Hermite matrix polynomials

For distinct points xo, xl,..., xn in R, a function f of Cd[a, b] and nonnegative integers do, dl,..., dn <\_ d, the Hermite interpolation polynomial of f(x) in Lagrange type determined by the = n d data{f(O(xi)}(i=O, 1 ..... n,l=O, 1 ... ## . ,di) isthepolynomialwithdegreem+n(m ~-~=o z) which is

This paper deals with Hermite matrix polynomials expansions of some relevant matrix functions appearing in the solution of differential systems. Properties of Hermite matrix polynomials such as the three terms recurrence formula permit an efficient computation of matrix functions avoiding important

A be a matrix in Crxp such that R&Z) > -l/2 for all the eigenvalues of A and let {fl(A,'/2) (z)} be the normalized sequence of Laguerre matrix polynomials associated with A. In this paier, it is proved that n, (A,1/2) (x) = o(na(A)/z ln'-l(n)) and ni$,A+':/2' (x uniformly on bounded intervals, wher

The Liouville-Stekloff method for approximating solutions of homogeneous linear ODE and a general result due to Tricomi which provides estimates for the zeros of functions by means of the knowledge of an asymptotic representation are used in order to improve a classical asymptotic formula for the gr