2018
DOI: 10.1007/s00029-018-0389-z
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Plane partitions with a “pit”: generating functions and representation theory

Abstract: We study plane partitions satisfying condition a n+1,m+1 = 0 (this condition is called "pit") and asymptotic conditions along three coordinate axes. We find the formulas for generating function of such plane partitions.Such plane partitions label the basis vectors in certain representations of quantum toroidal gl 1 algebra, therefore our formulas can be interpreted as the characters of these representations. The resulting formulas resemble formulas for characters of tensor representations of Lie superalgebra g… Show more

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Cited by 60 publications
(94 citation statements)
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“…The distinction between the different representation is described by the modification of the leg factor in x 1 direction. 13…”
Section: N = 1 Casementioning
confidence: 99%
“…The distinction between the different representation is described by the modification of the leg factor in x 1 direction. 13…”
Section: N = 1 Casementioning
confidence: 99%
“…It was observed in [27] (based on results of [25,[28][29][30]) that W 1+∞ algebra actually contains a three-parameter family of truncations Y N 1 ,N 2 ,N 3 parametrized by non-negative integers N i . These more general truncations can be furthermore identified with VOAs from [31] defined in terms of the quantum Hamiltonian reduction.…”
Section: Jhep01(2020)042mentioning
confidence: 99%
“…The variety A M r (n) is an affine bundle on M r (n) A , whose rank is equal to the codimension of A M r (n) in M r (n). 7 When c (1) , c (2) = 0, in [93], the Heisenberg subalgebra of SH c is generated by {b −l , b l , b 0 , E 0 | l ≥ 0}. To compare with the notation in the current paper, we have…”
Section: Hyperbolic Localizationmentioning
confidence: 99%
“…We define W r1,r2,r3 as a subalgebra of a tensor product of m = r 1 +r 2 +r 3 Heisenberg algebras. The algebra W r1,r2,r3 can be defined according to [7,64,89] as an intersection of kernels of vertex operators of the form…”
Section: Hyperbolic Localizationmentioning
confidence: 99%