Sharpening Jensen's Inequality and a Majorization Theorem

In the context of a certain urn-sampling game, Bennett has studied pairs of sequences for which the products of successive finite differences of the sequences are majorized by the differences of the termwise product of the sequences. Bennett conjectured that the sequences x n =( A&n a ) and y n =( B

In this paper we consider the class of s-Orlicz convex functions defined on a s-Orlicz convex subset of a real linear space. Some inequalities of Jensen's type for this class of mappings are pointed out.

Ao and Hanson, and Guiduli, Gya  rfa  s, Thomasse  and Weidl independently, proved the following result: For any tournament score sequence S (s 1 , s 2 ,F F F,s n ) with s 1 s 2 Á Á Á s n , there exists a tournament T on vertex set f1Y 2Y F F F Y ng such that the score of each vertex i is s i an

In this paper, by using particular techniques, two existence theorems of solutions for generalized quasi-variational inequalities, a minimax theorem, and a section theorem in the spaces without linear structure are established; and finally, a new coincidence theorem in locally convex spaces is obtai