Lambert Multipliers Between LP-spaces as a Banach Algebra

Abstract

For 1 ≤ p < ∞, it is known that the set K*p contains of all Lambert multipliers acting between Lp-spaces is a Banach space. In this study, we introduce a new induced norm by conditional expectation operators to show that K*p is a commutative Banach algebra with respect to this norm. Furthermore, in main result, the Fredholm *-multiplication operators on Lp-spaces are characterized, and some more results are obtained.