In this article, we give an approach to Borel functional calculus for quaternionic normal operators, which are not necessarily bounded. First, we establish the definition of functional calculus for a subclass of quaternion valued Borel functions, and then we extend the same to the class of quaternion valued Borel functions as well as L∞-functions. We also prove spectral mapping theorem as a consequenc
In this paper we prove the spectral theorem for quaternionic unbounded normal operators using the no...
The quaternionic analogue of the Riesz-Dunford functional calculus and the theory of semigroups and ...
We consider conditions under which a continuous functional calculus for a Banach space operator T &#...
Abstract. In some recent works we have developed a new functional calculus for bounded and unbounde...
In this paper we extend the H∞ functional calculus to quaternionic operators and to n-tuples of nonc...
In this paper we extend the H∞ functional calculus to quaternionic operators and to n-tuples of nonc...
In this thesis, we concentrate on the spectral theory of quaternionic operators. First we prove the...
In this paper we prove the spectral theorem for quaternionic unbounded normal operators using the no...
The book contains recent results concerning a functional calulus for n-tuples of not necessarily com...
textThis paper covers basic theory of Grobner Bases and an algebraic analysis of the linear constant...
The subject of this monograph is the quaternionic spectral theory based on the notion of S-spectrum....
In this note, we show that if a Banach space X has a predual, then every bounded linear operator on ...
In this article, we prove two versions of the spectral theorem for quaternionic compact normal opera...
Let H be a right quaternionic Hilbert space and let T be a quaternionic normal operator with domain ...
In this paper we announce the development of a functional calculus for operators defined on quaterni...
In this paper we prove the spectral theorem for quaternionic unbounded normal operators using the no...
The quaternionic analogue of the Riesz-Dunford functional calculus and the theory of semigroups and ...
We consider conditions under which a continuous functional calculus for a Banach space operator T &#...
Abstract. In some recent works we have developed a new functional calculus for bounded and unbounde...
In this paper we extend the H∞ functional calculus to quaternionic operators and to n-tuples of nonc...
In this paper we extend the H∞ functional calculus to quaternionic operators and to n-tuples of nonc...
In this thesis, we concentrate on the spectral theory of quaternionic operators. First we prove the...
In this paper we prove the spectral theorem for quaternionic unbounded normal operators using the no...
The book contains recent results concerning a functional calulus for n-tuples of not necessarily com...
textThis paper covers basic theory of Grobner Bases and an algebraic analysis of the linear constant...
The subject of this monograph is the quaternionic spectral theory based on the notion of S-spectrum....
In this note, we show that if a Banach space X has a predual, then every bounded linear operator on ...
In this article, we prove two versions of the spectral theorem for quaternionic compact normal opera...
Let H be a right quaternionic Hilbert space and let T be a quaternionic normal operator with domain ...
In this paper we announce the development of a functional calculus for operators defined on quaterni...
In this paper we prove the spectral theorem for quaternionic unbounded normal operators using the no...
The quaternionic analogue of the Riesz-Dunford functional calculus and the theory of semigroups and ...
We consider conditions under which a continuous functional calculus for a Banach space operator T &#...
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