Stephen Hermes scite author profile

Stephen Hermes

5Publications

69Citation Statements Received

144Citation Statements Given

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140

Affiliations

Parabon Computation (United States), Wellesley College, Brandeis University

Publications

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Semi-invariant pictures and two conjectures on maximal green sequences

Brüstle¹,

Hermes²,

Igusa³

et al. 2017

Journal of Algebra

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Abstract. We use semi-invariant pictures to prove two conjectures about maximal green sequences. First: if Q is any acyclic valued quiver with an arrow j → i of infinite type then any maximal green sequence for Q must mutate at i before mutating at j. Second: for any quiver Q obtained by mutating an acyclic valued quiver Q of tame type, there are only finitely many maximal green sequences for Q . Both statements follow from the Rotation Lemma for reddening sequences and this in turn follows from the Mutation Formula for the semi-invariant picture for Q.

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The No Gap Conjecture for tame hereditary algebras

Hermes

Igusa

2019

Journal of Pure and Applied Algebra

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The "No Gap Conjecture" of Brüstle-Dupont-Pérotin states that the set of lengths of maximal green sequences for hereditary algebras over an algebraically closed field has no gaps. This follows from a stronger conjecture that any two maximal green sequences can be "polygonally deformed" into each other. We prove this stronger conjecture for all tame hereditary algebras over any field.2010 Mathematics Subject Classification. 16G20; 20F55.

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Semi-invariant pictures and two conjectures on maximal green sequences

Brüstle¹,

Hermes²,

Igusa³

et al. 2015

Preprint

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Minimal model of Ginzburg algebras

Hermes

2016

Journal of Algebra

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Abstract. We compute the minimal model for Ginzburg algebras associated to acyclic quivers Q. In particular, we prove that there is a natural grading on the Ginzburg algebra making it formal and quasi-isomorphic to the preprojective algebra in non-Dynkin type, and in Dynkin type is quasi-isomorphic to a twisted polynomial algebra over the preprojective with a unique higher A∞-composition. To prove these results, we construct and study the minimal model of an A∞-envelope of the derived category D b (Q) whose higher compositions encode the triangulated structure of D b (Q).

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The No Gap Conjecture for tame hereditary algebras

Hermes¹,

Igusa²

2016

Preprint

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Stephen Hermes

Semi-invariant pictures and two conjectures on maximal green sequences

The No Gap Conjecture for tame hereditary algebras

Semi-invariant pictures and two conjectures on maximal green sequences

Minimal model of Ginzburg algebras

The No Gap Conjecture for tame hereditary algebras

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