Article
Toeplitz and Hankel Type Operators on an Annulus
Mathematika
(1994)
Abstract
Let Ω be a regular domain in the extended complex plane, i.e., it is a bounded domain and its boundary consists of a finite number of disjoint analytic simple closed curves. Let dm(z) be the Lebesgue area measure on Ω and let ds = dm(z)/ω(z) be the Poincare metric on Ω, a Riemannian metric of negative constant curvature. It may be proved that Ω(z) ≈ Euclidean distance from z to the boundary of Ω (see [8]).
Disciplines
Publication Date
1994
Citation Information
Qingtang Jiang and Lizhong Peng. "Toeplitz and Hankel Type Operators on an Annulus" Mathematika Vol. 41 Iss. 2 (1994) p. 266 - 276 Available at: http://works.bepress.com/qingtang-jiang/35/