This paper is published in Volume-2, Issue-6, 2016
Area
Operator Theory
Author
Sivakumar N, Dhivya G
Org/Univ
Hindusthan College of Arts and Science, Tamil Nadu, India
Keywords
Hilbert space, Normal operator, Self adjoint, Isometry, Parahyponormal operators and quasi parahyponormal operators.
Citations
IEEE
Sivakumar N, Dhivya G. On Parahyponormal and Quasi Parahyponormal Operators, International Journal of Advance Research, Ideas and Innovations in Technology, www.IJARIIT.com.
APA
Sivakumar N, Dhivya G (2016). On Parahyponormal and Quasi Parahyponormal Operators. International Journal of Advance Research, Ideas and Innovations in Technology, 2(6) www.IJARIIT.com.
MLA
Sivakumar N, Dhivya G. "On Parahyponormal and Quasi Parahyponormal Operators." International Journal of Advance Research, Ideas and Innovations in Technology 2.6 (2016). www.IJARIIT.com.
Sivakumar N, Dhivya G. On Parahyponormal and Quasi Parahyponormal Operators, International Journal of Advance Research, Ideas and Innovations in Technology, www.IJARIIT.com.
APA
Sivakumar N, Dhivya G (2016). On Parahyponormal and Quasi Parahyponormal Operators. International Journal of Advance Research, Ideas and Innovations in Technology, 2(6) www.IJARIIT.com.
MLA
Sivakumar N, Dhivya G. "On Parahyponormal and Quasi Parahyponormal Operators." International Journal of Advance Research, Ideas and Innovations in Technology 2.6 (2016). www.IJARIIT.com.
Abstract
In this paper we discuss about a new class of operators on Hilbert space. We call these operators as parahyponormal operators. Moreover, here we discussed some results on quasi parahyponormal and M-Quasi parahyponormal operators.
