External vertices for crystals of type A
We show that a vertex in the reduced crystal is i-external for a residue i if the defect is less than the absolute value of the i-component of the hub. We demonstrate the existence of a bound on the degree after which all vertices of a given defect d are external in at least one i-string. Combining...
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| creator | Amara-Omari, Ola Schaps, Mary |
| description | We show that a vertex in the reduced crystal is i-external for a residue i if
the defect is less than the absolute value of the i-component of the hub. We
demonstrate the existence of a bound on the degree after which all vertices of
a given defect d are external in at least one i-string. Combining this with the
Chuang-Rouquier categorification for the simple modules of the cyclotomic Hecke
algebras of type A and rank e, this would imply a version of Donovan's
Conjecture for the cyclotomics. For e=2, we calculate an approximation to this
bound. |
| doi_str_mv | 10.48550/arxiv.1811.11413 |
| format | Article |
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the defect is less than the absolute value of the i-component of the hub. We
demonstrate the existence of a bound on the degree after which all vertices of
a given defect d are external in at least one i-string. Combining this with the
Chuang-Rouquier categorification for the simple modules of the cyclotomic Hecke
algebras of type A and rank e, this would imply a version of Donovan's
Conjecture for the cyclotomics. For e=2, we calculate an approximation to this
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the defect is less than the absolute value of the i-component of the hub. We
demonstrate the existence of a bound on the degree after which all vertices of
a given defect d are external in at least one i-string. Combining this with the
Chuang-Rouquier categorification for the simple modules of the cyclotomic Hecke
algebras of type A and rank e, this would imply a version of Donovan's
Conjecture for the cyclotomics. For e=2, we calculate an approximation to this
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the defect is less than the absolute value of the i-component of the hub. We
demonstrate the existence of a bound on the degree after which all vertices of
a given defect d are external in at least one i-string. Combining this with the
Chuang-Rouquier categorification for the simple modules of the cyclotomic Hecke
algebras of type A and rank e, this would imply a version of Donovan's
Conjecture for the cyclotomics. For e=2, we calculate an approximation to this
bound.</abstract><doi>10.48550/arxiv.1811.11413</doi><oa>free_for_read</oa></addata></record> |
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| recordid | cdi_arxiv_primary_1811_11413 |
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| subjects | Mathematics - Representation Theory |
| title | External vertices for crystals of type A |
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