A connection between Lagurre's and Hermite's matrix polynomials

The R. x n generalized Pascal matrix P(t) whose elements are related to the hypergeometric function zFr(a, b; c; Z) is presented and the Cholesky decomposition of P(t) is obtained.

The positive semidefinite and Euclidean distance mat~x completion problems have received a lot of attention in the literature. Results have been obtained for these two problems that are very similar in their formulations. Although there is a strong relationship between positive semidefinite matrices

We establish an explicit connection between solutions of the scalar conservation law and infinite hyperbolic systems of linear partial differential equations. As an immediate corollary of this connection combined with the well-known local existence theorem for the scalar conservation law, we obtain

Euler's Connection describes an exact equivalence between certain continued fractions and power series. If the partial numerators and denominators of the continued fractions are perturbed slightly, the continued fractions equal power series plus easily computed error terms. These continued fractions