A New Recursion in the Theory of Macdonald Polynomials

As SCOTT has shown, the Replacement. scheme of Z F derives a large part, of its strength from the Extensionality axiom. For in the absence of the latter, the supply of demonstrably functional formula matrices is relatively ineagei..l) I n this situation, u-e can restore some of Replacemmt's vigor by

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

SOXE REFLECTIONS ON THE FOUNDATIONS OF ORDINARY RECURSIOS THEORY AND A NEW PROPOSAL by GEORGE TOURLAKIS in Downsview, Ontario (Canada) ') ') This research was partially supported by PU'SERC grant No. A8820. ') Moreover, the Kleene-schemata approach naturally and easily generalizes to recursion of 3,

Polynomial jilters have many applications in real time control, estimation and identification, particularly when information about the system dynamics and noise statistics are not precisely known. In this paper, a generalized recursive algorithm for nth order polynomial jilters is developed. The par

In this paper we describe a recursive procedure for the approximate evaluation of the coefficients of expansion of a function y(x) in a system of polynomials ~. ( ..~(x)1, kEN. Numerical examples and the computational procedure are also discussed.