2023
DOI: 10.1007/jhep02(2023)204
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Unifying the 6D $$ \mathcal{N} $$ = (1, 1) string landscape

Abstract: We propose an organizing principle for string theory moduli spaces in six dimensions with $$ \mathcal{N} $$ N = (1, 1), based on a rank reduction map, into which all known constructions fit. In the case of cyclic orbifolds, which are the main focus of the paper, we make an explicit connection with meromorphic 2D (s)CFTs with c = 24 (c = 12) and show how these encode every possible gauge symmetry enhancement in their associated 6D theories. These results generalize naturally t… Show more

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Cited by 6 publications
(1 citation statement)
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“…[73,74] and references therein). In addition, N " p1, 1q theories in 6D were recently classified in [75]. Dimensional JHEP08(2023)089 reduction of the various higher dimensional theories given in these references always yields an odd number of vector multiplets in 5D, which supports our findings.…”
Section: N "supporting
confidence: 87%
“…[73,74] and references therein). In addition, N " p1, 1q theories in 6D were recently classified in [75]. Dimensional JHEP08(2023)089 reduction of the various higher dimensional theories given in these references always yields an odd number of vector multiplets in 5D, which supports our findings.…”
Section: N "supporting
confidence: 87%