Discrete (Legendre) orthogonal polynomials—a survey

A finite series expansion method using discrete Legendre orthogonal polynomials (DLOPs) is applied to analyze linear time-varying discrete systems. An effective algorithm is derived to establish a representation which relates the DLOP coeficient vector of a product function to those of its two-comp

A method of jkite series expansion using discrete Legendre orthogonal polynomials (DLOP's) is proposed for the fmite-time optimal control of time-varying discrete systems with a quadratic performance index. Computational algorithms are derivedfor solving two-point boundary-value canonical state equ

We prove that if both [P n (x)] n=0 and [{ r P n (x)] n=r are orthogonal polynomials for any fixed integer r 1, then [P n (x)] n=0 must be discrete classical orthogonal polynomials. This result is a discrete version of the classical Hahn's theorem stating that if both [P n (x)] n=0 and [(dÂdx) r P n