Maximal discs of Weil-Petersson class in AdS2,1
Abstract
We introduce maximal discs of Weil-Petersson class in the 3-dimensional Anti-de Sitter space AdS2,1, whose parametrization space can be identified with the cotangent bundle T*T0(1) of Weil-Petersson universal Teichm\"uller space T0(1). We prove that the Mess map defines a symplectic diffeomorphism from T*T0(1) to T0(1)× T0(1), with respect to the canonical symplectic form on T*T0(1) and the difference of pullbacks of the Weil-Petersson symplectic forms from each factor of T0(1)× T0(1). Furthermore, we show that the functional given by the anti-holomorphic energies of the induced Gauss maps associated with maximal discs of Weil-Petersson class serves as a K\"ahler potential for the restriction of the canonical symplectic form to certain submanifolds T0(1) ⊂ T*T0(1), which bijectively parametrize the space of maximal discs of Weil-Petersson class in AdS2,1.
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