Geodesic
Invariant Subspace Theorems for Finite Riemann Surfaces
Canadian journal of mathematics, Tome 18 (1966) no. 1, pp. 240-255

Voir la notice de l'article provenant de la source Cambridge University Press

The purpose of this paper is to extend various invariant subspace theorems for the circle group to multiply connected domains. Such attempts are not new. Actually, Sarason (4) studied the invariant subspaces of annulus operators acting on L2 and showed certain parallelisms between the unit disk case and the annulus case. Voichick (8) observed analytic functions on a finite Riemann surface and generalized the Beurling theorem on the closed invariant subspaces of H2 as well as the Beurling–Rudin theorem on the closed ideals of the disk algebra. Here we shall consider LP(Γ) and C(Γ) defined on the boundary Γ of a finite orientable Riemann surface R. 
Hasumi, Morisuke. Invariant Subspace Theorems for Finite Riemann Surfaces. Canadian journal of mathematics, Tome 18 (1966) no. 1, pp. 240-255. doi: 10.4153/CJM-1966-027-1
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