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National Repository of Grey Literature

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The Gabriel-Roiter measure in representation theory Krasula, Dominik ; Šťovíček, Jan (advisor) ; Trlifaj, Jan (referee) The Gabriel-Roiter measure is a module-theoretic invariant, defined in 1972 by P. Gabriel. It is an order-preserving function that refines a composition length of a module by also taking lengths of indecomposable submodules into account. We calculate all Gabriel-Roiter measures for finite-length representa- tions of an orientation of a Dynkin graph D4 and an orientation of a Euclidean graph ˜A3. In 2007, H. Krause proposed a combinatorial definition of the Gabriel-Roiter measure based on other length functions instead of composition length. We study these alternative Gabriel-Roiter measures on thin representations of quiv- ers whose underlying graph is a tree. 1 Detailed record

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