In the context of almost complex quantization, a natural generalization of algebro-geometric linear series on a compact symplectic manifold has been proposed. Here we suppose given a compatible action of a finite group and consider the linear subseries associated to the irreducible representations of G, give conditions under which these are base-point-free and study properties of the associated projective morphisms. The results obtained are new even in the complex projective case.
Paoletti, R. (2004). Szego kernels and finite group actions. TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 356(8), 3069-3076 [10.1090/S0002-9947-03-03490-1].
Szego kernels and finite group actions
PAOLETTI, ROBERTO
2004
Abstract
In the context of almost complex quantization, a natural generalization of algebro-geometric linear series on a compact symplectic manifold has been proposed. Here we suppose given a compatible action of a finite group and consider the linear subseries associated to the irreducible representations of G, give conditions under which these are base-point-free and study properties of the associated projective morphisms. The results obtained are new even in the complex projective case.
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
