Abstract

In this paper, we study its possible to construct an self-adjoint for operators on banach space. Firstly, the necessary mathematical background namely, banach space, inner product space is reviewed. secondly we show the relationship between self-adjoint operator and other operator. self-adjoint operator on a finite dimensional complex vector space V with inner product <..,.> is a linear map P ( from V to itself ) that is its own adoint. self-adjoint operators are used in functional analysis and quantum mechanics.

Keywords

References

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