2021
DOI: 10.1007/jhep03(2021)157
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Symmetries of $$ \mathcal{N} $$ = (1, 0) supergravity backgrounds in six dimensions

Abstract: General $$ \mathcal{N} $$ N = (1, 0) supergravity-matter systems in six dimensions may be described using one of the two fully fledged superspace formulations for conformal supergravity: (i) SU(2) superspace; and (ii) conformal superspace. With motivation to develop rigid supersymmetric field theories in curved space, this paper is devoted to the study of the geometric symmetries of supergravity backgrounds. In particular, we introduce the notion of a conformal Killing spinor… Show more

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Cited by 15 publications
(17 citation statements)
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“…The (1, 0) theory in D = 6 has been discussed in SU(2) superspace in [25] and in conformal superspace [20][21][22]. Recently the geometric symmetries of (1, 0) supergravity backgrounds was treated in [48]. The theory was also discussed earlier in harmonic superspace in [24] and, some years ago, in projective superspace [25].…”
Section: =mentioning
confidence: 99%
“…The (1, 0) theory in D = 6 has been discussed in SU(2) superspace in [25] and in conformal superspace [20][21][22]. Recently the geometric symmetries of (1, 0) supergravity backgrounds was treated in [48]. The theory was also discussed earlier in harmonic superspace in [24] and, some years ago, in projective superspace [25].…”
Section: =mentioning
confidence: 99%
“…There are applications in General Relativity (GR) [6,7] to G-structures [8,9], to WZW models [10], to classical mechanics [11] and to symmetries of the Dirac operator and super Laplacians [12,13]. Supersymmetric conformal KTs and KYTs are discussed in [14], in [15] and [16]. Finally KTs arise in the context of hyperKähler geometry [17].…”
Section: Introductionmentioning
confidence: 99%
“…Killing-Yano tensors square to Killing tensors and characterise the symmetries of the Dirac equation [10] and are also related to novel supersymmetries in sigma models and strings [11,12]. Supersymmetric Killing-Yano tensors [13] characterise the symmetries of super Laplacians [14][15][16]. Finally, KTs arise in the context of hyperKähler geometry [17].…”
Section: Introductionmentioning
confidence: 99%