Equivariant asymptotics of Szegö kernels under Hamiltonian 
                
                  
                
                $${{\varvec{U}}}(\mathbf{2})$$
                
                  
                    
                      
                        U
                      
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                      2
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              -actions

Galasso, Andrea; Paoletti, Roberto

doi:10.1007/s10231-018-0791-3

Annali di Matematica

2018

DOI: 10.1007/s10231-018-0791-3

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Equivariant asymptotics of Szegö kernels under Hamiltonian $${{\varvec{U}}}(\mathbf{2})$$ U ( 2 ) -actions

Andrea Galasso

Roberto Paoletti

Abstract: Let M be complex projective manifold and A a positive line bundle on it. Assume that a compact and connected Lie group G acts on M in a Hamiltonian manner and that this action linearizes to A. Then, there is an associated unitary representation of G on the associated algebro-geometric Hardy space. If the moment map is nowhere vanishing, the isotypical components are all finite dimensional; they are generally not spaces of sections of some power of A. One is then led to study the local and global asymptotic pro… Show more

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Cited by 6 publications

References 27 publications

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Conic reductions for Hamiltonian actions of U(2) and its maximal torus

Paoletti

2022

Rend. Circ. Mat. Palermo, II. Ser

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Suppose given a Hamiltonian and holomorphic action of $$G=U(2)$$ G = U ( 2 ) on a compact Kähler manifold M, with nowhere vanishing moment map. Given an integral coadjoint orbit $$\mathcal {O}$$ O for G, under transversality assumptions we shall consider two naturally associated ‘conic’ reductions. One, which will be denoted $$\overline{M}^G_{\mathcal {O}}$$ M ¯ O G , is taken with respect to the action of G and the cone over $$\mathcal {O}$$ O ; another, which will be denoted $$\overline{M}^T_{\varvec{\nu }}$$ M ¯ ν T , is taken with respect to the action of the standard maximal torus $$T\leqslant G$$ T ⩽ G and the ray $$\mathbb {R}_+\,\imath \varvec{\nu }$$ R + ı ν along which the cone over $$\mathcal {O}$$ O intersects the positive Weyl chamber. These two reductions share a common ‘divisor’, which may be viewed heuristically as bridging between their structures. This point of view motivates studying the (rather different) ways in which the two reductions relate to the the latter divisor. In this paper we provide some indications in this direction. Furthermore, we give explicit transversality criteria for a large class of such actions in the projective setting, as well as a description of corresponding reductions as weighted projective varieties, depending on combinatorial data associated to the action and the orbit.

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Conic reductions for Hamiltonian actions of U(2) and its maximal torus

Paoletti

2022

Rend. Circ. Mat. Palermo, II. Ser

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Remarks on asymptotic isometric embeddings of conic transforms for torus actions

Galasso

2024

Rend. Circ. Mat. Palermo, II. Ser

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Consider a Hodge manifold and assume that a torus acts on it in a Hamiltonian and holomorphic manner and that this action linearizes on a given quantizing line bundle. Inside the dual of the line bundle one can define the circle bundle, which is a strictly pseudoconvex CR manifold. Then, there is an associated unitary representation on the Hardy space of the circle bundle. Under suitable assumptions on the moment map, we consider certain loci in unit circle bundle, naturally associated to a ray through an irreducible weight. Their quotients are called conic transforms. We introduce maps which are asymptotic embeddings of conic transforms making use of the corresponding equivariant Szegő projector.

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Szegö kernel equivariant asymptotics under Hamiltonian Lie group actions

Paoletti

2022

J Geom Anal

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Equivariant asymptotics of Szegö kernels under Hamiltonian $${{\varvec{U}}}(\mathbf{2})$$ U ( 2 ) -actions

Cited by 6 publications

References 27 publications

Conic reductions for Hamiltonian actions of U(2) and its maximal torus

Conic reductions for Hamiltonian actions of U(2) and its maximal torus

Remarks on asymptotic isometric embeddings of conic transforms for torus actions

Szegö kernel equivariant asymptotics under Hamiltonian Lie group actions

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