A NOTE ON GROUP INVARIANT INCIDENCE FUNCTIONS

Yıl 2007, Cilt: 2 Sayı: 2, 90 - 99, 01.12.2007

Michael Braun

Öz

Partially ordered sets (X, ≼) and the corresponding incidence algebra I(X, F) are important algebraic structures also playing a crucial role for the enumeration, construction and the classification of many discrete structures. In this paper we consider partially ordered sets X on which some group G acts via the mapping X ×G → X, (x, g) 7→ xg and investigate such incidence functions ϕ : X × X → F of the incidence algebra I(X, F) which are invariant under the group action, i. e. which satisfy the condition ϕ(x, y) = ϕ(xg, yg) for all x, y ∈ X and g ∈ G. Within these considerations we define for such incidence functions ϕ the matrices ϕ∧ respectively ϕ∨ by summation of entries of ϕ and we investigate the structure of these matrices and generalize the results known from group actions on posets.

Anahtar Kelimeler

Incidence algebra, group action, Plesken matrices

Kaynakça

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• R. Laue, Eine konstruktive Version des Lemmas von Burnside, Bayreuther Mathematische Schriften 28 (1989), 111-125.
• R. Laue, Construction of Combinatorial Objects – a Tutorial, Bayreuther Mathematische Schriften 43 (1993), 53-96.
• W. Plesken, Counting with Groups and Rings, J. Reine Angewandte Mathe- matik 334 (1982), 40-68. Michael Braun Kreuzerweg 23
• D-81825 Munich Germany
• E-mail: mic_bra@web.de