English

Operators that attain the reduced minimum

Functional Analysis 2018-01-09 v2

Abstract

Let H1,H2H_1, H_2 be complex Hilbert spaces and TT be a densely defined closed linear operator from its domain D(T)D(T), a dense subspace of H1H_1, into H2H_2. Let N(T)N(T) denote the null space of TT and R(T)R(T) denote the range of TT. Recall that C(T):=D(T)N(T)C(T) := D(T) \cap N(T)^{\perp} is called the {\it carrier space of} TT and the {\it reduced minimum modulus } γ(T)\gamma(T) of TT is defined as: γ(T):=inf{T(x):xC(T),x=1}. \gamma(T) := \inf \{\|T(x)\| : x \in C(T), \|x\| = 1 \} . Further, we say that TT {\it attains its reduced minimum modulus} if there exists x0C(T)x_0 \in C(T) such that x0=1\|x_0\| = 1 and T(x0)=γ(T)\|T(x_0)\| = \gamma(T). We discuss some properties of operators that attain reduced minimum modulus. In particular, the following results are proved.

Keywords

Cite

@article{arxiv.1704.07534,
  title  = {Operators that attain the reduced minimum},
  author = {S. H. Kulkarni and G. Ramesh},
  journal= {arXiv preprint arXiv:1704.07534},
  year   = {2018}
}

Comments

submitted to a journal. arXiv admin note: text overlap with arXiv:1606.05736, arXiv:1609.06869. Deleted the last section from the earlier version

R2 v1 2026-06-22T19:26:47.532Z