AbstractAn operator T∈B(H) is complex symmetric if there exists a conjugate-linear, isometric involution C:H→H so that T=CT∗C. We provide a concrete description of all complex symmetric partial isometries. In particular, we prove that any partial isometry on a Hilbert space of dimension ⩽4 is complex symmetric
We discuss several algebraic and analytic aspects of the eigenstructure (si.e., eigenvalues, eigenve...
Abstract. An operator T on a complex Hilbert space is called a 2{isometry if T 2T 22T T +I = 0. Our ...
If C is a conjugation (an isometric, conjugate-linear involution) on a separable complex Hilbert spa...
An operator $T \in B(\h)$ is complex symmetric if there exists a conjugate-linear, isometric involut...
An operator $T \in B(\h)$ is complex symmetric if there exists a conjugate-linear, isometric involut...
AbstractAn operator T∈B(H) is complex symmetric if there exists a conjugate-linear, isometric involu...
We say that an operator $T \in B(H)$ is complex symmetric if there exists a conjugate-linear, isomet...
A bounded linear operator T on a complex Hilbert space H is called complex symmetric if T = CT*C, wh...
If T=U∣T∣ denotes the polar decomposition of a bounded linear operator T, then the Aluthge transform...
If T=U∣T∣ denotes the polar decomposition of a bounded linear operator T, then the Aluthge transform...
Abstract. We study a few classes of Hilbert space operators whose matrix representations are complex...
We study a few classes of Hilbert space operators whose matrix representations are complex symmetric...
We discuss several algebraic and analytic aspects of the eigenstructure (si.e., eigenvalues, eigenve...
Abstract In this paper, we introduce the class of [m]-complex symmetric operators and study various ...
AbstractIn this paper we study properties of complex symmetric operators. In particular, we prove th...
We discuss several algebraic and analytic aspects of the eigenstructure (si.e., eigenvalues, eigenve...
Abstract. An operator T on a complex Hilbert space is called a 2{isometry if T 2T 22T T +I = 0. Our ...
If C is a conjugation (an isometric, conjugate-linear involution) on a separable complex Hilbert spa...
An operator $T \in B(\h)$ is complex symmetric if there exists a conjugate-linear, isometric involut...
An operator $T \in B(\h)$ is complex symmetric if there exists a conjugate-linear, isometric involut...
AbstractAn operator T∈B(H) is complex symmetric if there exists a conjugate-linear, isometric involu...
We say that an operator $T \in B(H)$ is complex symmetric if there exists a conjugate-linear, isomet...
A bounded linear operator T on a complex Hilbert space H is called complex symmetric if T = CT*C, wh...
If T=U∣T∣ denotes the polar decomposition of a bounded linear operator T, then the Aluthge transform...
If T=U∣T∣ denotes the polar decomposition of a bounded linear operator T, then the Aluthge transform...
Abstract. We study a few classes of Hilbert space operators whose matrix representations are complex...
We study a few classes of Hilbert space operators whose matrix representations are complex symmetric...
We discuss several algebraic and analytic aspects of the eigenstructure (si.e., eigenvalues, eigenve...
Abstract In this paper, we introduce the class of [m]-complex symmetric operators and study various ...
AbstractIn this paper we study properties of complex symmetric operators. In particular, we prove th...
We discuss several algebraic and analytic aspects of the eigenstructure (si.e., eigenvalues, eigenve...
Abstract. An operator T on a complex Hilbert space is called a 2{isometry if T 2T 22T T +I = 0. Our ...
If C is a conjugation (an isometric, conjugate-linear involution) on a separable complex Hilbert spa...
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