New additive results for Cauchy dual and MP$-$inverse OF Weighted composition operators
Abstract
In this paper, we prove some basic results for Cauchy dual of
weighted composition operators. Also we introduce some new classes
of operators, called $\dag$-hyponormal, $\dag$-quasi-hyponormal, and
we provide necessary and sufficient conditions for Cauchy dual and
MP$-$inverse of weighted composition operators on $L^{2}(\Sigma)$ to
belong to these classes . In addition, we study the complex symmetry
of these types of operators. Moreover, some
examples are provided to illustrate the obtained results
weighted composition operators. Also we introduce some new classes
of operators, called $\dag$-hyponormal, $\dag$-quasi-hyponormal, and
we provide necessary and sufficient conditions for Cauchy dual and
MP$-$inverse of weighted composition operators on $L^{2}(\Sigma)$ to
belong to these classes . In addition, we study the complex symmetry
of these types of operators. Moreover, some
examples are provided to illustrate the obtained results
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