Integral table algebras, affine diagrams, and the analysis of degree two
From MaRDI portal
Publication:1906653
DOI10.1006/jabr.1995.1382zbMath0924.20004OpenAlexW2063385487MaRDI QIDQ1906653
Publication date: 9 November 1999
Published in: Journal of Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1006/jabr.1995.1382
association schemescharacter ringsintegral table algebraslabeled graphsgroup algebras of finite groupsgeneralized Euclidean diagramsfaithful basis elements
Association schemes, strongly regular graphs (05E30) Ordinary representations and characters (20C15) Group rings of finite groups and their modules (group-theoretic aspects) (20C05)
Related Items
On standard integral table algebras generated by an element of width 2., On normalized integral table algebras generated by a non-real faithful element of degree 2 with \(p\) linear elements, On homogeneous integral table algebras, Normalized integral table algebras generated by a faithful real element of degree 2 and having 4 linear elements, Fusion rings with few degrees., Toward the classification of normalized integral table algebras generated by a faithful non-real element of degree 3 with L1(B)={1} (I), On normalized integral table algebras generated by a non-real faithful element of degree 2 with |L1(B)|=2, Generalized table algebras, Primitive commutative association schemes with a non-symmetric relation of valency 3, Nilpotency property in table algebras, A generalization of the Terwilliger algebra, On four normalized table algebras generated by a faithful nonreal element of degree 3., On Homogeneous Standard Integral Table Algebras of Degree 4, The Dual Morphisms inC-Algebras, Table algebras, A Class ofP-polynomial Table Algebras with and without Integer Multiplicities, Integral standard table algebras with a faithful nonreal element of degree 3, On primitive commutative association schemes with a nonsymmetric relation of valency 4, The generalized Terwilliger algebra and its finite-dimensional modules when \(d=2\), On even generalized table algebras
