A New Continuous Selection Theorem

The purpose of this note is to show a new generalization of the continuous approximate selection theorem of F.

In this article, we first prove one improved version of the Yannelis᎐Prabhakar continuous selection theorem and next, as its applications, a fixed point theorem in noncompact product spaces, a nonempty intersection theorem, some existence theorems of solutions for the generalized quasi-variational i

One of the best-known results of extremal combinatorics is Sperner's theorem, which asserts that the maximum size of an antichain of subsets of an n-element set equals the binomial coefficient n n/2 , that is, the maximum of the binomial coefficients. In the last twenty years, Sperner's theorem has

Pincherle theorems equate convergence of a continued fraction to existence of a recessive solution of the associated linear system. Matrix continued fractions have recently been used in the study of singular potentials in high energy physics. The matrix continued fractions and discrete Riccati equat