TY - JOUR
T1 - Cartan Connections and Integrable Vortex Equations
AU - Ross, Calum
N1 - Publisher Copyright:
© 2022 The Author(s)
PY - 2022/9/30
Y1 - 2022/9/30
N2 - We demonstrate that integrable abelian vortex equations on constant curvature Riemann surfaces can be reinterpreted as flat non-abelian Cartan connections. By lifting to three dimensional group manifolds we find higher dimensional analogues of vortices. These vortex configurations are also encoded in a Cartan connection. We give examples of different types of vortex that can be interpreted this way, and compare and contrast this Cartan representation of a vortex with the symmetric instanton representation.
AB - We demonstrate that integrable abelian vortex equations on constant curvature Riemann surfaces can be reinterpreted as flat non-abelian Cartan connections. By lifting to three dimensional group manifolds we find higher dimensional analogues of vortices. These vortex configurations are also encoded in a Cartan connection. We give examples of different types of vortex that can be interpreted this way, and compare and contrast this Cartan representation of a vortex with the symmetric instanton representation.
KW - Cartan geometry
KW - Dirac Operator
KW - Integrable vortex equations
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U2 - 10.1016/j.geomphys.2022.104613
DO - 10.1016/j.geomphys.2022.104613
M3 - Article (journal)
SN - 0393-0440
VL - 179
SP - 1
EP - 19
JO - Journal of Geometry and Physics
JF - Journal of Geometry and Physics
M1 - 104613
ER -