The number of congruence classes in \(M_ n(\mathbb{F}_ q)\)
From MaRDI portal
Publication:1344092
DOI10.1006/FFTA.1995.1004zbMath0819.15012OpenAlexW2082117433MaRDI QIDQ1344092
Publication date: 9 February 1995
Published in: Finite Fields and their Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1006/ffta.1995.1004
Matrices over special rings (quaternions, finite fields, etc.) (15B33) Quadratic and bilinear forms, inner products (15A63)
Related Items (11)
Braid group representations from twisted tensor products of algebras ⋮ Conjugacy class properties of the extension of \(\text{GL}(n,q)\) generated by the inverse transpose involution. ⋮ E-series of character varieties of non-orientable surfaces ⋮ Equivalence and normal forms of bilinear forms ⋮ Structure of isometry group of bilinear spaces ⋮ Canonical forms for complex matrix congruence and \(^{*}\)-congruence ⋮ The congruence of a matrix with its transpose ⋮ On congruence of complex matrices ⋮ Bilinear forms over an algebraically closed field ⋮ The number of pairs of quadratic forms over \(\mathbb{F}_q\) (\(q\) odd) ⋮ Matrix representatives for three-dimensional bilinear forms over finite fields
This page was built for publication: The number of congruence classes in \(M_ n(\mathbb{F}_ q)\)
