Positive selfadjoint extensions of positive symmetric operators

Abstract: Introduction.Positive selfadjoint extensions of a symmetric operator have been investigated by many mathematicians : J. von Neumann, K. Friedrichs, M. Krein, M. Birman and others. Especially M. Krein [3] observed the class of all positive selfadjoint extensions of a given positive symmetric operator, and proved among others that, in case of a densely denned operator, the greatest and the smallest positive selfadjoint extension exist. The greatest extension is shown to coincide with the extension, established … Show more

“…We draw the reader's attention to a slight difference in the way, Proposition 4.3 was stated in [3], where the supremum is taken over all f ∈ D(V ) (without the extra condition that V f = 0), which only makes sense if one assumes that ker V = {0}. The extra condition V f = 0 is a remedy for this problem and is a direct result from the reasoning of [3].…”

“…It will be the square root of the selfadjoint Kreȋn-von Neumann extension of V -denoted by V 1/2 K -which will play an important role for the results obtained in Section 4. The description of V 1/2 K obtained by Ando and Nishio [3] will allow us to give a necessary and sufficient condition (Theorem 4.7) for an extension of (A, A) to be dissipative, which we only have to check on the space by which we extend the operator A rather than on the whole domain of the extension. From this result, we proceed to give a description of all dissipative extensions of the dual pair (A, A) in terms of contractions from one "small" auxiliary space to another.…”

The Proper Dissipative Extensions of a Dual Pair

“…We draw the reader's attention to a slight difference in the way, Proposition 4.3 was stated in [3], where the supremum is taken over all f ∈ D(V ) (without the extra condition that V f = 0), which only makes sense if one assumes that ker V = {0}. The extra condition V f = 0 is a remedy for this problem and is a direct result from the reasoning of [3].…”

“…It will be the square root of the selfadjoint Kreȋn-von Neumann extension of V -denoted by V 1/2 K -which will play an important role for the results obtained in Section 4. The description of V 1/2 K obtained by Ando and Nishio [3] will allow us to give a necessary and sufficient condition (Theorem 4.7) for an extension of (A, A) to be dissipative, which we only have to check on the space by which we extend the operator A rather than on the whole domain of the extension. From this result, we proceed to give a description of all dissipative extensions of the dual pair (A, A) in terms of contractions from one "small" auxiliary space to another.…”

The Proper Dissipative Extensions of a Dual Pair

“…We'll be more expansive than absolutely necessary, in part, because we'll need this when we briefly turn to N -body scattering in Sects. [13][14][15] and, in part, because the elegant formalism, which I learned from Sigalov-Sigal [566] (see also Hunziker-Sigal [264]), deserves to be better known.…”

Tosio Kato’s work on non-relativistic quantum mechanics: part 2

“…In the present paper we continue our investigations of the extension problem we started in [19] (see [1] for the case of closed positive operators and [16,17,21] for the case of bounded positive operators; see also [12,6,5,13,14,2,20,18,3,4] for related papers). Our aim is to describe the set of all positive selfadjoint extensions of a given positive operator (not necessarily densely defined) using the language of If A is a densely defined operator in H, then its adjoint is denoted by A * .…”

Characterizations of positive selfadjoint extensions