Pérez Fernández, Teresa Encarnación Autor
Sobolev orthogonal polynomials on product domains
- Lidia Fernández Rodríguez
- Francisco Marcellán Español
- Teresa Encarnacion Pérez Fernández
- Miguel A. Piñar
- Yuan Xu
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS - 15/08/2015
- Cuartil SJR: Q1
- Factor Impacto JCR: 1,328 (2015)
- CiteScore: 4,5 (2020)
- SJR: 1,053 (2015)
- SNIP: 1,333 (2015)
- Impacto JCR a 5 años: 1,294
- Categorías JCR: MATHEMATICS, APPLIED
- Categorías SJR: Computational Mathematics (Q1); Applied Mathematics (Q2)
- Scopus
- ORCID
- Web of Science
Sobolev orthogonal polynomials: Interpolation and approximation
- García-Caballero E.
- Pérez T.
- Piñar M.
Electronic Transactions on Numerical Analysis - 1/12/1999
- Cuartil SJR: Q2
- CiteScore: 1,5 (2020)
- SJR: 1,097 (1999)
- SNIP: 0,918 (1999)
- Categorías SJR: Analysis (Q2)
- Scopus
- ORCID
Sobolev orthogonal polynomials and spectral methods in boundary value problems
- Fernández L.
- Marcellán F.
- Pérez T.E.
- Piñar M.A.
Applied Numerical Mathematics - 1/6/2024
- CiteScore: 5,6 (2023)
- SJR: 1,006 (2023)
- SNIP: 1,385 (2023)
Sobolev orthogonality for the Gegenbauer polynomials {C<sup>(-N+1/2)</sup><inf>n</inf>}<inf>n≥0</inf>
- de Morales, MA
- Perez, TE
- Pinar, MA
Journal of Computational and Applied Mathematics - 30/11/1998
10.1016/s0377-0427(98)00124-1 Ver en origen
- CiteScore: 4,5 (2020)
- Scopus
- ORCID
- Web of Science
Simultaneous Approximation via Laplacians on the Unit Ball
- Marriaga M.E.
- Pérez T.E.
- Recarte M.J.
Mediterranean Journal of Mathematics - 1/12/2023
- CiteScore: 1,7 (2022)
- SJR: 0,531 (2022)
- SNIP: 1,148 (2022)
Semiclassical orthogonal polynomials in two variables
- de Morales, Maria Alvarez
- Fernandez, Lidia
- Perez, Teresa E.
- Pinar, Miguel A.
Journal of Computational and Applied Mathematics - 15/10/2007
10.1016/j.cam.2006.10.017 Ver en origen
- Cuartil SJR: Q2
- CiteScore: 4,5 (2020)
- SJR: 0,88 (2007)
- SNIP: 1,372 (2007)
- Categorías SJR: Applied Mathematics (Q2); Computational Mathematics (Q2)
- Scopus
- ORCID
- Web of Science
Second order partial differential equations for gradients of orthogonal polynomials in two variables
- Fernandez, Lidia
- Perez, Teresa E.
- Pinar, Miguel A.
Journal of Computational and Applied Mathematics - 1/02/2007
10.1016/j.cam.2005.09.029 Ver en origen
- Cuartil SJR: Q2
- CiteScore: 4,5 (2020)
- SJR: 0,88 (2007)
- SNIP: 1,372 (2007)
- Categorías SJR: Applied Mathematics (Q2); Computational Mathematics (Q2)
- Scopus
- ORCID
- Web of Science
Regular sobolev type orthogonal polynomials: The bessel case
- Marcellan, F
- Perez, TE
- Pinar, MA
Rocky Mountain Journal of Mathematics - 1/09/1995
10.1216/rmjm/1181072155 Ver en origen
- CiteScore: 0,8 (2020)
- Scopus
- ORCID
- Web of Science
Recent Trends on Two Variable Orthogonal Polynomials
- Fernandez, Lidia
- Marcellan, Francisco
- Perez, Teresa E.
- Pinar, Miguel A.
- AcostaHumanez, PB
- Marcellan, F
Differential Algebra, Complex Analysis and Orthogonal Polynomials - 2010
- Cuartil JCR: Q4 (2010)
- Impacto Normalizado por Categoría: 0,522 (2010)
- ORCID
- Web of Science
Quadratic Decomposition of Bivariate Orthogonal Polynomials
- Branquinho A.
- Foulquié-Moreno A.
- Pérez T.E.
Mediterranean Journal of Mathematics - 1/6/2023
- CiteScore: 1,7 (2022)
- SJR: 0,531 (2022)
- SNIP: 1,148 (2022)
Sobolev orthogonality and properties of the generalized Laguerre polynomials
- Perez, TE
- Pinar, MA
- Jones, WB
- Ranga, AS
Orthogonal Functions, Moment Theory, and Continued Fractions - 1998
- ORCID
- Web of Science
Orthogonal polynomials associated with a nondiagonal Sobolev inner product with polynomial coefficients
- De Morales, MA
- Perez, TE
- Pinar, MA
- Ronveaux, A
- Jones, WB
- Ranga, AS
Orthogonal Functions, Moment Theory, and Continued Fractions - 1998
- ORCID
- Web of Science
What is beyond coherent pairs of orthogonal polynomials?
- Marcellan, F
- Petronilho, JC
- Perez, TE
- Pinar, MA
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS - 29/12/1995
10.1016/0377-0427(95)00121-2 Ver en origen
- CiteScore: 4,5 (2020)
- Scopus
- ORCID
- Web of Science
GEGENBAUER-SOBOLEV ORTHOGONAL POLYNOMIALS
- MARCELLAN, F
- PEREZ, TE
- PINAR, MA
- Cuyt, A
NONLINEAR NUMERICAL METHODS AND RATIONAL APPROXIMATION II - 1994
Classical orthogonal polynomials in two variables: a matrix approach
- Fernandez, L
- Perez, TE
- Pinar, MA
NUMERICAL ALGORITHMS - 1/07/2005
10.1007/s11075-004-3625-x Ver en origen
- Cuartil SJR: Q2
- CiteScore: 4 (2020)
- SJR: 0,638 (2005)
- SNIP: 0,791 (2005)
- Categorías SJR: Applied Mathematics (Q2)
- Scopus
- ORCID
- Web of Science
Este autor no tiene patentes.
Índice h
Scopus: 12
Web of Science: 12
Índice i10
Scopus: 18
Web of Science: 16
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Proyectos de investigación en la UAL
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Acrónimo P11-FQM-07276Desde: 30 de abril de 2013Hasta: 30 de abril de 2017Financiado por: JUNTAImporte de financiación: 239.478,30 EURRol: Investigador