Sine-Gordon solitons in AdS, dS and other hyperbolic spaces
Abstract
We find infinitely many soliton-like solutions in a deformation of the sine-Gordon theory in (d+1)-dimensional AdSd+1 (anti-de Sitter) spacetime for d ≥ 2, as well as single solitonic solutions in dSd+1 (de Sitter) and Hd+1 (Lobachevsky) spaces for d ≥ 1 and in AdS2. We also find a deformation of the kink solution in scalar field theory with a polynomial potential in AdS2. The deformation of the sine-Gordon theory strikingly resembles the bosonic part of the flat-space supersymmetric sine-Gordon theory. In the infinite radius limit, single soliton solutions reduce to solitons in flat space. Meanwhile, the multisoliton solution of AdSd+1, d≥ 2 for certain values of the parameters reduces in the same limit to a single soliton solution boosted in the normal direction. However, there are also multisoliton solutions in AdSd+1, d ≥ 2 that do not have a flat space limit.
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