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THE INVARIANT SUBSPACES AND SPECTRAL PROPERTIES OF LINEAR OPERATORS (Application of Geometry to Operator Theory)openaire
On norm closed $z$-invariant subspaces of $H^\infty$ (Harmonic, Analytic function spaces and Linear Operators, II)openaire
Nontrivial invariant subspaces of linear operator pencils
Canadian Mathematical Bulletin, 2023 AbstractIn this paper, we introduce the spherical polar decomposition of the linear pencil of an ordered pair $\mathbf {T}=(T_{1},T_{2})$ and investigate nontrivial invariant subspaces between the generalized spherical Aluthge transform of the linear pencil of $\mathbf {T}$ and the linear pencil of the original pair $\mathbf {T}$ of bounded ...
Kim, Jaewoong, Yoon, Jasang
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Communications in Nonlinear Science and Numerical Simulation
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Jaewoong Kim, Jasang Yoon
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Jaewoong Kim, Jasang Yoon
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Two invariant subspaces and spectral properties of a linear operator
Acta Scientiarum Mathematicarum, 2016zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Djordjević, S. V. +2 more
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On the Variety of Invariant Subspaces of a Finite-Dimensional Linear Operator
Transactions of the American Mathematical Society, 1982If V V is a finite-dimensional vector space over
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Invariant Subspaces for T-Invariant Linear Operators
19871 — Some examples. We consider the eigenvalue problems: $$\matrix{ {{\Delta _2}{\rm{u + }}\lambda {\rm{u}} = 0} & {{\rm{in}}\,\Omega ,} & {{\rm{u}} = 0} & {{\rm{on}}\,\partial \Omega } \cr } $$ (1) and $$\matrix{ {{\Delta _4}{\rm{u}} - \lambda {\rm{u}} = 0} & {{\rm{in}}\,\Omega ,} & {{\rm{u}} = {{\rm{u}}_{{{\rm{x}}_1}}} = {{\rm{u}}_{{{\rm{
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