TY - JOUR

T1 - Branes through finite group actions

AU - Heller, Sebastian

AU - Schaposnik, Laura P.

N1 - Funding information: This paper began during the workshop Higgs Bundles in Geometry and Physics at the University of Heidelberg February 28–March 3 2016, and the authors would like to thank the organizers for such a stimulating environment. The work of LPS is partially supported by National Science FoundationDMS-1509693 and the work of SH is partially supported by DFGHE 6828/1-2. This paper began during the workshop Higgs Bundles in Geometry and Physics at the University of Heidelberg February 28–March 3 2016, and the authors would like to thank the organizers for such a stimulating environment. The work of LPS is partially supported by National Science Foundation DMS-1509693 and the work of SH is partially supported by DFG HE 6828/1-2 .

PY - 2018/7

Y1 - 2018/7

N2 - Mid-dimensional \((A,B,A)\) and \((B,B,B)\)-branes in the moduli space of flat \(G_{\mathbb C}\)-connections appearing from finite group actions on compact Riemann surfaces are studied. The geometry and topology of these spaces is then described via the corresponding Higgs bundles and Hitchin fibrations.

AB - Mid-dimensional \((A,B,A)\) and \((B,B,B)\)-branes in the moduli space of flat \(G_{\mathbb C}\)-connections appearing from finite group actions on compact Riemann surfaces are studied. The geometry and topology of these spaces is then described via the corresponding Higgs bundles and Hitchin fibrations.

KW - math.AG

KW - math-ph

KW - math.DG

KW - math.MP

KW - Spectral data

KW - Higgs bundles

KW - Hitchin fibration

KW - (B,B,B)-branes

KW - Finite group action

UR - http://www.scopus.com/inward/record.url?scp=85045119310&partnerID=8YFLogxK

U2 - 10.1016/j.geomphys.2018.03.014

DO - 10.1016/j.geomphys.2018.03.014

M3 - Article

VL - 129

SP - 279

EP - 293

JO - Journal of Geometry and Physics,

JF - Journal of Geometry and Physics,

ER -