Mapping properties of the Bergman projections on elementary Reinhardt domains
-
Shuo Zhang
Abstract
The elementary Reinhardt domain associated to multi-index k = (k1, …, kn) ∈ ℤn is defined by
In this paper, we study the mapping properties of the associated Bergman projection on Lp spaces and Lp Sobolev spaces of order ≥ 1.
Acknowledgement
The author thanks his Ph.D. advisor Prof. Feng Rong for helpful comments and suggestions to this manuscript. The author also thanks the referees for many useful comments.
(Communicated by Gregor Dolinar)
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Articles in the same Issue
- Regular Papers
- Quasi-decompositions and quasidirect products of Hilbert algebras
- Residuation in finite posets
- On a problem in the theory of polynomials
- Fekete-Szegö problem for starlike functions connected with k-Fibonacci numbers
- Mapping properties of the Bergman projections on elementary Reinhardt domains
- Lemniscate-like constants and infinite series
- On the Oscillation of second order nonlinear neutral delay differential equations
- Oscillation theorems for certain second-order nonlinear retarded difference equations
- De la Vallée Poussin inequality for impulsive differential equations
- Hs-Boundedness of a class of Fourier Integral Operators
- Dynamical behavior of a P-dimensional system of nonlinear difference equations
- Some inequalities for exponentially convex functions on time scales
- Impact of different types of non linearity on the oscillatory behavior of higher order neutral difference equations
- The sine extended odd Fréchet-G family of distribution with applications to complete and censored data
- A new two-parameter lifetime distribution with flexible hazard rate function: Properties, applications and different method of estimations
- Simulations of nonlinear parabolic PDEs with forcing function without linearization
- An existence level for the residual sum of squares of the power-law regression with an unknown location parameter
- A relationship between the category of chain MV-algebras and a subcategory of abelian groups
