A. N. Panov
Published 2020-05-05Version 1
The notion of a supercharacter theory was proposed by P. Diaconis and I.M. Isaacs in 2008. A supercharacter theory for a given finite group is a pair of the system of certain complex characters and the partition of group into classes that have properties similar to the system of irreducible characters and the partition into conjugacy classes. In the present paper, we consider the group obtained by the Borel contraction from the general linear group over a finite field. For this group, we construct the supercharacter theory. In terms of rook placements, we classify supercharacters and superclasses, calculate values of supercharacters on superclasses
Regular characters of $GL_n(O)$ and Weil representations over finite fields
Principal series for general linear groups over finite commutative rings
Weil representations over finite fields and Shintani lift
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