Spaces of Lattice Diagram Polynomials in One Set of Variables

We study Nikolskii-type inequalities for the L norms of an algebraic polynop mial in one variable, defined either by a contour integral or by an area integral over a Jordan domain in ‫.ރ‬ Further, we generalize the one-dimensional results to the case of polynomials in several variables over product

Polynomial sets and polynomial expansion theorems are developed for solutions n Ž . n m Ž . j Ž . j < of Cauchy problems of the form Ѩ u x, t rѨt s "D u x, t , Ѩ u x, t rѨt ts0 Ž . s x , j s 0, 1, . . . , n y 1. If m ) n, then the data functions must be entire of j Ž . Ž . growth s sr s y 1 where s

In this article, we present the theory of Kripke semantics, along with the mathematical framework and applications of Kripke semantics. We take the Kripke-Sato approach to define the knowledge operator in relation to Hintikka's possible worlds model, which is an application of the semantics of intui

Let P be a cone in a Banach space E. In this paper, we show the existence of solutions of the operator equation y g yAx q Tx for y g P, where T is a 1-set-contraction operator in P and A is an accretive operator in P satisfying Ž . Ž . R I q A s P for all ) 0. Further, a sufficient condition for R I