Normal Extensions of a Singular Multipoint Differential Operator for First Order
Abstract
In this work, firstly in the direct sum of Hilbert spaces of vector-functions L2 (H,(-∞,a1)) L2 (H,(a2,b2))2 (H,(a3,+∞)), - ∞<a1<a2<b2<a3<+∞ all normal extensions of the minimal operator generated by linear singular multipoint formally normal differential expression l=(l1,l2,l3),lk = ddt+Ak with a selfadjoint operator coefficient Ak k=1,2,3 in any Hilbert space H, are described in terms of boundary values. Later structure of the spectrum of these extensions is investigated.
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