Associated Representations of finite pattern groups
Abstract
In this paper, we consider the construction of irreducible representations of finite pattern groups in terms of Panov's associative polarization, which is a finite-field analogue of Kirillov's orbital method. Using this construction, first, we are able to classify the irreducible representations of the unipotent radical of the standard parabolic subgroups of GLn with 4 parts; second, we can parameterize irreducible characters of degree q in terms of coadjoint orbits of cardinality q2, for any finite pattern groups G over Fq, where Fq is a finite field with q elements.
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