2013
DOI: 10.1515/crelle-2012-0014
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Nilpotent operators and weighted projective lines

Abstract: Abstract. We show a surprising link between singularity theory and the invariant subspace problem of nilpotent operators as recently studied by C. M. Ringel and M. Schmidmeier, a problem with a longstanding history going back to G. Birkhoff. The link is established via weighted projective lines and (stable) categories of vector bundles on those.The setup yields a new approach to attack the subspace problem. In particular, we deduce the main results of Ringel and Schmidmeier for nilpotency degree p from propert… Show more

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Cited by 42 publications
(83 citation statements)
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“…For each i = 1, 2, 3, the set {S i,j } j ∈Z p i forms a full list of consecutive with respect to τ −1 X quasi-simple objects in the exceptional tubes in C ∞ . The families {S i,j } yield another ordered basis (a) the sequences rk(T ) = (rk(T i )) i∈ [10] , deg(T ) = (deg(T i )) i∈ [10] and μ(T ) = (μ(T i )) i∈ [10] of ranks, degrees and slopes of indecomposable direct summands…”
Section: 5mentioning
confidence: 99%
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“…For each i = 1, 2, 3, the set {S i,j } j ∈Z p i forms a full list of consecutive with respect to τ −1 X quasi-simple objects in the exceptional tubes in C ∞ . The families {S i,j } yield another ordered basis (a) the sequences rk(T ) = (rk(T i )) i∈ [10] , deg(T ) = (deg(T i )) i∈ [10] and μ(T ) = (μ(T i )) i∈ [10] of ranks, degrees and slopes of indecomposable direct summands…”
Section: 5mentioning
confidence: 99%
“…One can show that if T is a tilting bundle, then the equality [rk(T l )] l∈ [10] = h 1 (:= [10] = h ∞ . In fact, these two equalities follow from some formula which holds for tilting sheaves over all weighted projective lines of tubular type, and can be treated as a tool for finding rk(T ) and deg(T ) of potential "tilted realization" of a given tubular algebra in general situations (this will be discussed in a subsequent publication).…”
Section: Remark 37 the Shape Of The Sequences Rk(t ) And Deg(t ) (Comentioning
confidence: 99%
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