On the (Formula presented.)-Hyperholomorphic Besov Space

Resultado de la investigación: Contribución a una revistaArtículo

Resumen

© 2014, Springer Basel. Let $$p>1$$p>1 and let $$\psi $$ψ be a structural set in $$\mathbb H$$H. This paper presents a seminormed $$\psi $$ψ-hyperholomorphic Besov space which satisfies the conformal covariant property preserving the “$$\psi $$ψ structure”. This is an analogue of what happens in the well-known one-dimensional complex Besov space, see Danikas (Function spaces and complex analysis, Joensuu 1997 (Ilomantsi) 935, 1999), Zhu (Operator theory in function spaces, 1990). These computations presented here are important complements to some results given in Cnops and Delanghe (Appl Anal 73:45–64, 1999) and Gürlebeck et al. (Complex Var Theory Appl 39:115–135, 1999) concerning to the theory of quaternionic right-linear space of $$\psi $$ψ-hyperholomorphic functions, see Shapiro and Vasilevski (Complex Var Theory Appl 27:17–46, 1995) and Shapiro and Vasilevski (Complex Var Theory Appl 27:67–96, 1995).
Idioma originalInglés estadounidense
Páginas (desde-hasta)1219-1227
Número de páginas1096
PublicaciónComplex Analysis and Operator Theory
DOI
EstadoPublicada - 18 jun 2015

Huella dactilar

Besov Spaces
Function Space
Psi Function
Operator Theory
Mathematical operators
Complex Analysis
Linear Space
Complement
Analogue

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title = "On the (Formula presented.)-Hyperholomorphic Besov Space",
abstract = "{\circledC} 2014, Springer Basel. Let $$p>1$$p>1 and let $$\psi $$ψ be a structural set in $$\mathbb H$$H. This paper presents a seminormed $$\psi $$ψ-hyperholomorphic Besov space which satisfies the conformal covariant property preserving the “$$\psi $$ψ structure”. This is an analogue of what happens in the well-known one-dimensional complex Besov space, see Danikas (Function spaces and complex analysis, Joensuu 1997 (Ilomantsi) 935, 1999), Zhu (Operator theory in function spaces, 1990). These computations presented here are important complements to some results given in Cnops and Delanghe (Appl Anal 73:45–64, 1999) and G{\"u}rlebeck et al. (Complex Var Theory Appl 39:115–135, 1999) concerning to the theory of quaternionic right-linear space of $$\psi $$ψ-hyperholomorphic functions, see Shapiro and Vasilevski (Complex Var Theory Appl 27:17–46, 1995) and Shapiro and Vasilevski (Complex Var Theory Appl 27:67–96, 1995).",
author = "{Gonz{\'a}lez Cervantes}, {Jos{\'e} Oscar}",
year = "2015",
month = "6",
day = "18",
doi = "10.1007/s11785-014-0431-x",
language = "American English",
pages = "1219--1227",
journal = "Complex Analysis and Operator Theory",
issn = "1661-8254",
publisher = "Birkhauser Verlag Basel",

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On the (Formula presented.)-Hyperholomorphic Besov Space. / González Cervantes, José Oscar.

En: Complex Analysis and Operator Theory, 18.06.2015, p. 1219-1227.

Resultado de la investigación: Contribución a una revistaArtículo

TY - JOUR

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PY - 2015/6/18

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N2 - © 2014, Springer Basel. Let $$p>1$$p>1 and let $$\psi $$ψ be a structural set in $$\mathbb H$$H. This paper presents a seminormed $$\psi $$ψ-hyperholomorphic Besov space which satisfies the conformal covariant property preserving the “$$\psi $$ψ structure”. This is an analogue of what happens in the well-known one-dimensional complex Besov space, see Danikas (Function spaces and complex analysis, Joensuu 1997 (Ilomantsi) 935, 1999), Zhu (Operator theory in function spaces, 1990). These computations presented here are important complements to some results given in Cnops and Delanghe (Appl Anal 73:45–64, 1999) and Gürlebeck et al. (Complex Var Theory Appl 39:115–135, 1999) concerning to the theory of quaternionic right-linear space of $$\psi $$ψ-hyperholomorphic functions, see Shapiro and Vasilevski (Complex Var Theory Appl 27:17–46, 1995) and Shapiro and Vasilevski (Complex Var Theory Appl 27:67–96, 1995).

AB - © 2014, Springer Basel. Let $$p>1$$p>1 and let $$\psi $$ψ be a structural set in $$\mathbb H$$H. This paper presents a seminormed $$\psi $$ψ-hyperholomorphic Besov space which satisfies the conformal covariant property preserving the “$$\psi $$ψ structure”. This is an analogue of what happens in the well-known one-dimensional complex Besov space, see Danikas (Function spaces and complex analysis, Joensuu 1997 (Ilomantsi) 935, 1999), Zhu (Operator theory in function spaces, 1990). These computations presented here are important complements to some results given in Cnops and Delanghe (Appl Anal 73:45–64, 1999) and Gürlebeck et al. (Complex Var Theory Appl 39:115–135, 1999) concerning to the theory of quaternionic right-linear space of $$\psi $$ψ-hyperholomorphic functions, see Shapiro and Vasilevski (Complex Var Theory Appl 27:17–46, 1995) and Shapiro and Vasilevski (Complex Var Theory Appl 27:67–96, 1995).

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