Abstract
In this paper we present the results of the maximality of operators not nec-essarily bounded. For that, we will see the results obtained by operators in situation ofextension. Regarding the normal product of normal operators we seem to be the key tomaximality.
Highlights
We assume that all operators operators are non necessarily bounded on a complex Hilbert space H, Let us, recall some notations that will be met below
In this paper we present the results of the maximality of operators not necessarily bounded
Regarding the normal product of normal operators we seem to be the key to maximality
Summary
We assume that all operators operators are non necessarily bounded on a complex Hilbert space H, Let us, recall some notations that will be met below. In this paper we present the results of the maximality of operators not necessarily bounded. Normal; self-adjoint; symmetric operators; commutativity; maximality of operators. [1]) Let T ∈ B(H) and let M, N be two normal non necessarily bounded operators.
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