Image characterization of certain Sobolev spaces under Schr¨odinger semigroup

C, Siva Rama Krishnan and D, Venku Naidu and D, Sukumar (2018) Image characterization of certain Sobolev spaces under Schr¨odinger semigroup. PhD thesis, Indian institute of technology Hyderabad.

Full text not available from this repository. (Request a copy)

Abstract

This thesis deals with the study of characterizing the image of some function spaces under Schr¨odinger semigroup. This thesis is divided in to four parts. In chapter 2 we consider the Schr¨odinger semigroup for Laplacian � on Rn and characterize the image of Sobolev space on Rn under this semi group as weighted Bergman space HL2(C; um t (z)dz) (up to equivalence of norms). Similarly we characterize the image of Hermite-Sobolev space under Schr¨odinger semigroup associated to Hermite operator H on Rn. In chapter 3, we consider the Schr¨odinger semigroup for the Dunkl-Laplacian ��, associated to a finite reflection group G on Rn. We characterize the image of L2(Rn; eu2h�(u)du) under this semigroup as a reproducing kernel Hilbert space. For the reflection group Zn 2 , we identify the images of the Dunkl-Sobolev spaces in L2(Rn; h�(u)du) under the associated Schr¨odinger semigroup eit� as a reproducing kernel Hilbert space (up to equivalence of norms). Also we establish similar kind of results for Schr¨odinger semigroup associated to Dunkl-Hermite operator. Chapter 4 deals with the sampling in the space, HL2(C; um t (z)dz). We show that for given a separated sequence Z in C is a sampling for HL2(C; u0 t (z)dz) if and only if its lower density D

[error in script]
IITH Creators:
IITH CreatorsORCiD
D, Venku NaiduUNSPECIFIED
D, SukumarUNSPECIFIED
Item Type: Thesis (PhD)
Uncontrolled Keywords: Dunki Operator, Sobolev Space, Weighted Bergman space, Sampling
Subjects: Mathematics
Divisions: Department of Mathematics
Depositing User: Team Library
Date Deposited: 30 Jul 2018 09:51
Last Modified: 21 Sep 2019 06:06
URI: http://raiithold.iith.ac.in/id/eprint/4332
Publisher URL:
Related URLs:

Actions (login required)

View Item View Item
Statistics for RAIITH ePrint 4332 Statistics for this ePrint Item