Mathematics – Functional Analysis
Scientific paper
2001-04-24
Mathematics
Functional Analysis
Revised version. To appear in: Ann. Scuola Norm. Sup. Pisa Cl. Sci
Scientific paper
Let $A_\N$ be the symmetric operator given by the restriction of $A$ to $\N$, where $A$ is a self-adjoint operator on the Hilbert space $\H$ and $\N$ is a linear dense set which is closed with respect to the graph norm on $D(A)$, the operator domain of $A$. We show that any self-adjoint extension $A_\Theta$ of $A_\N$ such that $D(A_\Theta)\cap D(A)=\N$ can be additively decomposed by the sum $A_\Theta=\A+T_\Theta$, where both the operators $\A$ and $T_\Theta$ take values in the strong dual of $D(A)$. The operator $\A$ is the closed extension of $A$ to the whole $\H$ whereas $T_\Theta$ is explicitly written in terms of a (abstract) boundary condition depending on $\N$ and on the extension parameter $\Theta$, a self-adjoint operator on an auxiliary Hilbert space isomorphic (as a set) to the deficiency spaces of $A_\N$. The explicit connection with both Kre\u\i n's resolvent formula and von Neumann's theory of self-adjoint extensions is given.
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