Duality Theory for p-th Power Factorable Operators - 8 Angebote vergleichen
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1
Duality Theory for p-th Power Factorable Operators
DE PB NW
ISBN: 9783639518436 bzw. 3639518438, in Deutsch, Scholar'S Press, Taschenbuch, neu.
Lieferung aus: Deutschland, Versandkostenfrei.
buecher.de GmbH & Co. KG, [1].
The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal's Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q'-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politècnica de València and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted.2013. 160 S. 220 mmVersandfertig in 6-10 Tagen, Softcover.
buecher.de GmbH & Co. KG, [1].
The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal's Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q'-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politècnica de València and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted.2013. 160 S. 220 mmVersandfertig in 6-10 Tagen, Softcover.
2
Duality Theory for p-th Power Factorable Operators
DE PB NW
ISBN: 9783639518436 bzw. 3639518438, in Deutsch, Scholar'S Press, Taschenbuch, neu.
Lieferung aus: Deutschland, Versandkostenfrei.
buecher.de GmbH & Co. KG, [1].
The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal's Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q'-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politècnica de València and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted.2013. 160 S. 220 mmVersandfertig in 6-10 Tagen, Softcover.
buecher.de GmbH & Co. KG, [1].
The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal's Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q'-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politècnica de València and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted.2013. 160 S. 220 mmVersandfertig in 6-10 Tagen, Softcover.
3
Duality Theory for p-th Power Factorable Operators (2008)
DE NW
ISBN: 9783639518436 bzw. 3639518438, in Deutsch, VDM Verlag Dr. Müller, Saarbrücken, Deutschland, neu.
Lieferung aus: Vereinigtes Königreich Großbritannien und Nordirland, Lieferzeit: 11 Tage.
The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal's Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q'-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politècnica de València and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted.
The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal's Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q'-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politècnica de València and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted.
4
Symbolbild
Duality Theory for p-th Power Factorable Operators (2008)
EN PB NW
ISBN: 9783639518436 bzw. 3639518438, in Englisch, Scholar's Press, Taschenbuch, neu.
and Kernel Operators, The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal's Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q'-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politècnica de València and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted.
5
Duality Theory for p-th Power Factorable Operators - and Kernel Operators (2008)
DE PB NW
ISBN: 9783639518436 bzw. 3639518438, in Deutsch, Scholar's Press, Taschenbuch, neu.
Lieferung aus: Deutschland, Versandkostenfrei.
Duality Theory for p-th Power Factorable Operators: The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal`s Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q`-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politécnica de Valência and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted. Englisch, Taschenbuch.
Duality Theory for p-th Power Factorable Operators: The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal`s Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q`-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politécnica de Valência and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted. Englisch, Taschenbuch.
6
Duality Theory for p-th Power Factorable Operators - and Kernel Operators (2008)
~EN PB NW
ISBN: 9783639518436 bzw. 3639518438, vermutlich in Englisch, Scholar's Press, Taschenbuch, neu.
Duality Theory for p-th Power Factorable Operators: The class of p-th power factorable operators was developed in 2008 by Okada, Ricker and Sánchez Pérez. This is a family of Banach space valued (linear and continuous) operators defined on a Banach function space over a finite measure, which can be extended to the p-th power space of its original domain. This class of operators has been applied to obtain generaliztions of Maurey-Rosenthal`s Theorem, and also to the study of the largest (by inclusion) p-convex domain of the convolution operators and the Fourier transform. Here we develop the duality of this class and obtain generalizations of these results by means of factorizations through p-convex and q`-concave spaces, these spaces have optimal properties in its domain and range, respectively. This technique is very useful, since now we have shown that these properties are invariant by complex interpolation and also we see how we can easily apply to kernel operators, as the Laplace transform. This memoir arises from the Ph.D. thesis of the author presented at the Universitat Politècnica de València and supervised by the professors Fernando Mayoral Masa and Enrique A. Sánchez Pérez, with whom the author is greatly indebted. Englisch, Taschenbuch.
7
Symbolbild
Duality Theory for p-th Power Factorable Operators: and Kernel Operators (2013)
DE PB NW RP
ISBN: 9783639518436 bzw. 3639518438, in Deutsch, Scholars' Press, Taschenbuch, neu, Nachdruck.
Von Händler/Antiquariat, English-Book-Service - A Fine Choice [1048135], Waldshut-Tiengen, Germany.
This item is printed on demand for shipment within 3 working days.
This item is printed on demand for shipment within 3 working days.
8
Duality Theory for p-th Power Factorable Operators
~EN PB NW
ISBN: 9783639518436 bzw. 3639518438, vermutlich in Englisch, Scholar's Press, Taschenbuch, neu.
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