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Near Linearity of the Macroscopic Hall Current Response in Infinitely Extended Gapped Fermion Systems. [PDF]
Commun Math PhysWesle M +4 more
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Optimal Runge approximation for nonlocal wave equations and unique determination of polyhomogeneous nonlinearities. [PDF]
Calc Var Partial Differ EquLin YH, Tyni T, Zimmermann P.
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Bifurcation and computational analysis of anthracnose virus spread in plants with splashing-rain under hypersensitive response. [PDF]
Sci ProgFaiz K +5 more
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Effective Behaviour of Critical-Contrast PDEs: Micro-Resonances, Frequency Conversion, and Time Dispersive Properties. II. [PDF]
Commun Math PhysCherednichenko K +3 more
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Property (R) for Bounded Linear Operators
Mediterranean Journal of Mathematics, 2011The authors continue their study of Weyl type theorems and related properties for bounded linear operators on complex Banach spaces. In the paper under review, they introduce and study a new related property, called \((R)\). They characterize this property in several ways and describe its relationships with variants of the classical Weyl's theorem ...
AIENA, Pietro, Guillen, J, Pena, P.
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Fuzzy bounded linear operators
Fuzzy Sets and Systems, 2005zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Bag, T., Samanta, S. K.
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Real Powers of Bounded Linear Operators
International Journal of Applied and Computational Mathematics, 2015zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Sebastian, Sabu, Kumar, Kiran
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Property (Sw) for bounded linear operators
Asian-European Journal of Mathematics, 2015In this paper, we define new variant of Weyl type theorems property (Sw) and the Browder version of property (Sw). We also obtain the inclusion relation among these new properties.
Rashid, M. H. M., Prasad, T.
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Γ-inverses of bounded linear operators
Acta Mathematica Sinica, English Series, 2013Let \(\mathcal H\) be a Hilbert space and \(A,P,Q\) be bounded linear operators on \(\mathcal H\). If there exists a bounded linear operator \(X\) on \(\mathcal H\) such that \(APXQA=A\), \(XQAPX=X\), \((QAPX)^*=QAPX\) and \((XQAP)^*=XQAP\), then \(X\) is called the \(\Gamma\)-inverse of \(A\) associated with \(P\) and \(Q\) and is denoted by \(A ...
Xu, Xiao Ming +2 more
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2003
The first section gives several characterizations of bounded linear operators and proves that a symmetric operator whose domain is the whole Hilbert space is actually bounded (Hellinger-Toeplitz theorem). Several concrete examples of bounded linear operators in Hilbert spaces are discussed in the second section. In Section 3 the vector space \(\mathcal{
Philippe Blanchard, Erwin Brüning
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The first section gives several characterizations of bounded linear operators and proves that a symmetric operator whose domain is the whole Hilbert space is actually bounded (Hellinger-Toeplitz theorem). Several concrete examples of bounded linear operators in Hilbert spaces are discussed in the second section. In Section 3 the vector space \(\mathcal{
Philippe Blanchard, Erwin Brüning
openaire +1 more source