On a Conjecture of K. Harada, II

Ka tai himself gave partial solutions. In he proved that &2f (n)&=0(n &1 ) ( 3 ) article no. 0027

On a Conjecture of Cameron and Liebler ## KELDON DRUDGE Cameron-Liebler line classes arose from an attempt by Cameron and Liebler to classify those collineation groups of PG(n, q) which have the same number of orbits on points as on lines. They satisfy several equivalent properties; among them, c

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

In this paper we prove a particular case of a conjecture of Ash that states the existence of Galois representations associated to Hecke eigenclasses in cohomology.