The Krein-von Neumann Extension and its Connection to an Abstract Buckling Problem

Abstract

We prove the unitary equivalence of the inverse of the Krein--von Neumann extension (on the orthogonal complement of its kernel) of a densely defined, closed, strictly positive operator, S≥ ε IH for some ε >0 in a Hilbert space H to an abstract buckling problem operator. In the concrete case where S=-|C0∞() in L2(; dn x) for ⊂Rn an open, bounded (and sufficiently regular) domain, this recovers, as a particular case of a general result due to G. Grubb, that the eigenvalue problem for the Krein Laplacian SK (i.e., the Krein--von Neumann extension of S), \[ SK v = λ v, λ ≠ 0, \] is in one-to-one correspondence with the problem of the buckling of a clamped plate, \[ (-)2u=λ (-) u in , λ ≠ 0, u∈ H02(), \] where u and v are related via the pair of formulas \[ u = SF-1 (-) v, v = λ-1(-) u, \] with SF the Friedrichs extension of S. This establishes the Krein extension as a natural object in elasticity theory (in analogy to the Friedrichs extension, which found natural applications in quantum mechanics, elasticity, etc.).