The geometry of the space of BPS vortex-antivortex pairs

DOI10.1007/S00220-020-03824-YzbMATH Open1452.30006arXiv1807.00712OpenAlexW3044507945MaRDI QIDQ2006405

Author name not available (Why is that?)

Publication date: 9 October 2020

Published in: (Search for Journal in Brave)

Abstract: The gauged sigma model with target

m a t h b b P^{1}

, defined on a Riemann surface

S i g m a

, supports static solutions in which

k_{+}

vortices coexist in stable equilibrium with

k_{-}

antivortices. Their moduli space is a noncompact complex manifold

M_{(k_{+}, k_{-})} (S i g m a)

of dimension

k_{+} + k_{-}

which inherits a natural K"ahler metric

g_{L^{2}}

governing the model's low energy dynamics. This paper presents the first detailed study of

g_{L^{2}}

, focussing on the geometry close to the boundary divisor

D = p a r t i a l M_{(k_{+}, k_{-})} (S i g m a)

. On

S i g m a = S^{2}

, rigorous estimates of

g_{L^{2}}

close to

D

are obtained which imply that

M_{(1, 1)} (S^{2})

has finite volume and is geodesically incomplete. On

S i g m a = m a t h b b R^{2}

, careful numerical analysis and a point-vortex formalism are used to conjecture asymptotic formulae for

g_{L^{2}}

in the limits of small and large separation. All these results make use of a localization formula, expressing

g_{L^{2}}

in terms of data at the (anti)vortex positions, which is established for general

M_{(k_{+}, k_{-})} (S i g m a)

. For arbitrary compact

S i g m a

, a natural compactification of the space

M_{(k_{+}, k_{-})} (S i g m a)

is proposed in terms of a certain limit of gauged linear sigma models, leading to formulae for its volume and total scalar curvature. The volume formula agrees with the result established for

V o l (M_{(1, 1)} (S^{2}))

, and allows for a detailed study of the thermodynamics of vortex-antivortex gas mixtures. It is found that the equation of state is independent of the genus of

S i g m a

, and that the entropy of mixing is always positive.

Full work available at URL: https://arxiv.org/abs/1807.00712

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