A simple proof of the Fredholm alternative and a characterization of the Fredholm operators
Abstract
Let A be a linear bounded operator in a Hilbert space H, N(A) and R(A) its null-space and range, and A* its adjoint. The operator A is called Fredholm iff dim N(A)= dim N(A*):=n<∞ and R(A) and R(A*) are closed subspaces of H. A simple and short proof is given of the following known result: A is Fredholm iff A=B+F, where B is an isomorphism and F is a finite-rank operator. The proof consists in reduction to a finite-dimensional linear algebraic system which is equivalent to the equation Au=f in the case of Fredholm operators.
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