Relations between continuous and discrete integrable systems

A b s t r a c t . Relations between discrete and continuous complexity models are considered. The present paper is devoted to combine both models. In particular we analyze the 3-Satisfiability problem. The existence of fast decision procedures for this problem over the reds is examined based on cert

## Abstract The discrete Lotka power function describes the number of sources (e.g., authors) with __n__ = 1, 2, 3, … items (e.g., publications). As in econometrics, informetrics theory requires functions of a continuous variable __j__, replacing the discrete variable __n__. Now __j__ represents it

We present an analysis of various integration schemes which are applied to the numerical integration of, first, a one-dimensional Hamiltonian system and, second, Painlevt equations I and II. Both systems are well-known integrable ones. Integrable integrators are best suited for the simulation of int

Limit relations between classical continuous (Jacobi, Laguerre, Hermite) and discrete (Charlier, Meixner, Kravchuk, Hahn) orthogonal polynomials are well known and can be described by relations of type lim;~ P~(x; 2) = Qn(X). Deeper information on these limiting processes can be obtained from the ex