On A Variant of Weak Chang's Conjecture

We give a proof for one of the conjectures of S. L. Ma on two Diophantine equations related to abelian difference sets with multiplier &1.

In this paper we study a conjecture of J. B. Carrell on the rationality of a compact Kahler manifold admitting a holomorphic vector field with isolated zeroes. The conjecture, formulated in terms of ‫ރ‬ q -actions, says that if ‫ރ‬ q is acting on a nonsingular projective variety X with exactly one f

Let f # Z[x] with degree k and let p be a prime. By a complete trigonometric sum we mean a sum of the form S(q, f )= q x=1 e q ( f (x)), where q is a positive integer and e q (:)=exp(2?if (x)Âq). Professor Chalk made a conjecture on the upper bound of S(q, f ) when q is a prime power. We prove Chalk

Dirac proved in 1952 that every 2-connected graph of order n and minimum degree k admits a cycle of length at least minfn; 2kg: As a possible improvement, Woodall conjectured in 1975 that if a 2-connected graph of order n has at least n 2 þ k vertices of degree at least k; then it has a cycle of len

Suppose that ⍀ s 1, 2, . . . , ab for some non-negative integers a and b. Denote Ž . by P a, b the set of unordered partitions of ⍀ into a parts of cardinality b. In this Ž . paper we study the decomposition of the permutation module C P a, b where C is Ž . the field of complex numbers. In particula