A conjecture of Cameron and Kiyota on sharp characters with prescribed values

Abstract

Let be a virtual (generalized) character of a finite group G and L=L() be the image of on G- 1 . The pair (G, ) is said to be sharp of type L if |G|=Π l ∈ L ((1) - l) . If the principal character of G is not an irreducible constituent of , the pair (G,) is called normalized. In this paper, we first provide some counterexamples to a conjecture that was proposed by Cameron and Kiyota in 1988. This conjecture states that if (G,) is sharp and |L|≥ 2, then the inner product (,)G is uniquely determined by L . We then prove that this conjecture is true in the case that (G,) is normalized, is a character of G , and L contains at least an irrational value.