Dimension statistics of representations of finite groups
Abstract
The first part of this paper deals with unipotent and reductive groups over finite fields with q elements in which either q goes to infinity or G=GLn(q) and n goes to infinity. The second part of the paper deals with the symmetric group Sn. The main conclusion that we want to bring out in the case of reductive groups G(q), q varying, is that the dimension data, resp. the size of conjugacy classes, is in a statistical sense, ``roughly'' constant and the same (up to taking the squares). We introduce the notion of asympototically constant, and asympototically log constant to make precise these notions, which we apply to various groups discussed in this paper including the symmetric groups Sn.
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