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- Semi-invariant_of_a_quiver abstract "In mathematics, given a quiver Q with set of vertices Q0 and set of arrows Q1, a representation of Q assigns a vector space Vi to each vertex and a linear map V(α): V(s(α)) → V(t(α)) to each arrow α, where s(α), t(α) are, respectively, the starting and the ending vertices of α. Given an element d ∈ ℕQ0, the set of representations of Q with dim Vi = d(i) for each i has a vector space structure.It is naturally endowed with an action of the algebraic group ∏i∈ Q0 GL(d(i)) by simultaneous base change. Such action induces one on the ring of functions. The ones which are invariants up to a character of the group are called semi-invariants. They form a ring whose structure reflects representation-theoretical properties of the quiver.".
- Semi-invariant_of_a_quiver wikiPageID "42294499".
- Semi-invariant_of_a_quiver wikiPageLength "8900".
- Semi-invariant_of_a_quiver wikiPageOutDegree "16".
- Semi-invariant_of_a_quiver wikiPageRevisionID "692822687".
- Semi-invariant_of_a_quiver wikiPageWikiLink Category:Directed_graphs.
- Semi-invariant_of_a_quiver wikiPageWikiLink Category:Invariant_theory.
- Semi-invariant_of_a_quiver wikiPageWikiLink Category:Representation_theory.
- Semi-invariant_of_a_quiver wikiPageWikiLink Dynkin_diagram.
- Semi-invariant_of_a_quiver wikiPageWikiLink Prehomogeneous_vector_space.
- Semi-invariant_of_a_quiver wikiPageWikiLink Quiver_(mathematics).
- Semi-invariant_of_a_quiver wikiPageWikiLink File:1-loop_quiver.svg.
- Semi-invariant_of_a_quiver wikiPageWikiLink File:4-subspace_quiver.svg.
- Semi-invariant_of_a_quiver wikiPageWikiLinkText "Semi-invariant of a quiver".
- Semi-invariant_of_a_quiver wikiPageUsesTemplate Template:Citation.
- Semi-invariant_of_a_quiver subject Category:Directed_graphs.
- Semi-invariant_of_a_quiver subject Category:Invariant_theory.
- Semi-invariant_of_a_quiver subject Category:Representation_theory.
- Semi-invariant_of_a_quiver comment "In mathematics, given a quiver Q with set of vertices Q0 and set of arrows Q1, a representation of Q assigns a vector space Vi to each vertex and a linear map V(α): V(s(α)) → V(t(α)) to each arrow α, where s(α), t(α) are, respectively, the starting and the ending vertices of α.".
- Semi-invariant_of_a_quiver label "Semi-invariant of a quiver".
- Semi-invariant_of_a_quiver sameAs Q17103195.
- Semi-invariant_of_a_quiver sameAs m.01029zd8.
- Semi-invariant_of_a_quiver sameAs Q17103195.
- Semi-invariant_of_a_quiver wasDerivedFrom Semi-invariant_of_a_quiver?oldid=692822687.
- Semi-invariant_of_a_quiver isPrimaryTopicOf Semi-invariant_of_a_quiver.