Generalizations of Whipple's theorem on the sum of a 3F2

We raise a conjecture which would generalize Radon's theorem and would provide combinatorial proof for the result from [7], which generalizes Rado's theorem on general measure and the Ham sandwich theorem. We prove that the conjecture holds in several particular cases.

This paper contains several generalizations of the Mazur-Ulam isometric theorem in F \* -spaces which are not assumed to be locally bounded. Let X and Y be two real F \* -spaces, and let X be locally pseudoconvex or δ-midpoint bounded. Assume that a operator T maps X onto Y in a δ-locally 1/2 i -iso

The work is devoted to the calculation of asymptotic value of the choice number of the complete r-partite graph K m \* r = K m,. ..,m with equal part size m. We obtained the asymptotics in the case ln r = o(ln m). The proof generalizes the classical result of A.L. Rubin for the case r = 2.