The UV research groups (GIUV) are regulated in the 1st chapter of the Regulation ACGUV48/2013, which explains the procedure for creating new research structures. They are basic research and organizational structures that result from the voluntary association of researchers that share objectives, facilities, resources and common lines of research. These researchers are also committed to the consolidation and stability of their activity, work in groups and the capability to achieve a sustainable funding.
The research groups included in the previously mentioned Regulation are registered in the Register of Research Structures of the Universitat de València (REIUV), managed by the Office of the Vice-principal for Research. The basic information of these organisms can be found in this website.
Participants
Data related to research groups featured in various information dissemination channels shall not, under any circumstances, imply a statement or commitment regarding the employment or academic affiliation of individuals associated with the Universitat de València. Their inclusion is solely the responsibility of the group directors. Updates will be made upon request from interested parties.
- Registered groups in the Register of Research Structures of the Universitat de València - (REIUV)
Reference of the Group:
Description of research activity: The generic field of work is complex analysis in finite and infinite dimension. In a complex variable Dirichelt series. In several variables Borh radii. In infinite dimension linear theory, multilinear theory, local theory and geometry of Banach spaces, ideals of polynomial spaces and the study of algebras and Banach spaces of differentiable functions and their transformations.
Web:
Scientific-technical goals: - Estudio de espacios de Hardy en el politoro infinito dimensional y su relacion con espacios de Series de Dirichlet
Research lines: - Complex analysis in several and inifinite dimensions.Properties of holomorphic functions and Banach spaces and algebras whose elements are these functions are studied.
- Linear and multilinear mappings.Properties of bounded operators between Banach spaces are studied, as well as multilinear applications and polynomials in Banach spaces and the spaces formed by these applications.
- Time-frequency analysis, location operators, Stockwell transform and applications.The study of pseudo-differential operators with time-frequency analysis methods.
Group members:
CNAE:
Associated structure:
Keywords: - Función holomorfa, diferenciabilidad, polinomios, álgebras de Banach, Series de Dirichlet
- Operador acotado, aplicacación multilineal, polinomio, espacio de Banach, geometría de espacios de Banach
- operadores pseudodiferenciales, transformada de Stockwell, operadores pseudodiferenciales
