An Example of J-unitary Operator. Solving a Problem Stated by M.G. Krein
Abstract
Theorem 1. Given a number c >= 1, there exists a J-unitary operator V, such that: (a) r(V)= r(V-1)= c ; (b) S(c-1V)=S(c-1V-1) =S(c-1V*-1) = S(c-1V*)=0 (c) there exist maximal strictly positive and strictly negative V 1-invariant subspaces L+, L-, such that they are mutually J-orthogonal and L+ + L- is dense in the space. (d1) if L1 is non-zero V-invariant subspace, then r(V|L1)=r(V) (d2) if L2 is non-zero V-1-invariant subspace, then r(V-1|L2)=r(V-1) .
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