Super Riemann surfaces: Uniformization and Teichm�ller theory

Crane, Louis; Rabin, Jeffrey M.

doi:10.1007/bf01223239

Cited by 162 publications

(167 citation statements)

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“…For sake of truth this problem occurs in the usual conformal models [19], but in the context of W algebras it becomes relevant [20] - [28]. The capital role payed by a W symmetry has been pointed out in many physical fields , such as integrable models [29], [30], string theory [31] and supersymmetry [32] - [35]. Many efforts have been made in that direction and important results have been reached [36] - [46].…”

Section: Introductionmentioning

confidence: 99%

Primary currents and Riemannian geometry in algebras

Bandelloni

Lazzarini²

2001

Nuclear Physics B

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Section: Introductionmentioning

confidence: 99%

Primary currents and Riemannian geometry in algebras

Bandelloni

Lazzarini²

2001

Nuclear Physics B

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“…In a similar way, as the result of the supersymmetric version of the uniformization theorem [17], a supertorus is given by a quotient of the two-dimensional superspace by a subgroup of Osp(N |2) which is the anomaly-free part of the superconformal group [17,16]. The action of this subgroup gives the cycles of the supertorus.…”

Section: Commutative Supertorimentioning

confidence: 99%

“…Although the noncommutative torus is a very well known subject, its supersymmetric version, the noncommutative supertorus, still remains virtually unknown. Commutative supertorus was constructed by Rabin and Freund [16] based on the work of Crane and Rabin [17] on super Riemann surfaces. The supertorus was obtained as the quotient of superplane by a subgroup of Osp(1|2) which acts properly discontinuously on the plane together with the metrizable condition.…”

Section: Introductionmentioning

confidence: 99%

Noncommutative supertori in two dimensions

Chang-Young¹,

Kim²,

Nakajima³

2008

J. High Energy Phys.

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First we consider the deformations of superspaces with N = (1, 1) and N = (2, 2) supersymmetries in two dimensions. Among these the construction of noncommutative supertorus with odd spin structure is possible only in the case of N = (2, 2) supersymmetry broken down to N = (1, 1). However, for the even spin structures the construction of noncommutative supertorus is possible for both N = (1, 1) and N = (2, 2) cases. The spin structures are realized by implementing the translational properties along the cycles of commutative supertorus in the operator version: Odd spin structure is realized by the translation in the fermionic direction in the same manner as in the construction of noncommutative torus, and even spin structures are realized with appropriate versions of the spin angular momentum operator.

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“…In this chapter, we introduce N = 2 superconformal transformations and some related notions [28,29,30,6,14]. To keep supersymmetry manifest, all considerations will be carried out in superspace [31,13,14,8], but the projection of the results to ordinary space will be outlined in the end.…”

Section: Chapter 2 N = 2 Superconformal Symmetrymentioning

confidence: 99%