Non-vanishing elements and complex group algebras
Abstract
Let G be a finite group, and let Irr(G) denote the set of irreducible complex characters of G. An element x of G is said to be vanishing, if for some in Irr(G), we have (x)=0. Also the element x is called rational if x is conjugate to xi for every integer i co-prime to the order of x. We define the weight of G as ω(G):=(Σ∈ Irr(G)(1))2/|G|. In this paper, we show that for every rational non-vanishing element x∈ G, the order of CG(x) is at least ω(G).
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