FAVIER, SERGIO; R. LORENZO

Extension of the best constant approximation operator in Orlicz spaces

NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION; Lugar: Londres; Año: 2020 vol. 41 p. 635 - 658

ACINAS, SONIA; FAVIER, SERGIO; ZÓ, FELIPE

Inequalities for the extended best polynomial approximation operator in Orlicz spaces

ACTA MATHEMATICA SINICA-ENGLISH SERIES; Lugar: HEIDELBERG; Año: 2019 vol. 35 p. 185 - 203

ACINAS, S.; FAVIER, S.

Maximal Inequalities for the best polynomial approximation operators and Simonenko indices

Analysis in Theory and Applications; Lugar: Peking; Año: 2017 vol. 33 p. 253 - 266

BENAVENTE, ANA; FAVIER, SERGIO; LEVIS, F

Existence and Characterization of Best phi - Approximations by Linear Subspaces

Advances in Pure and Applied Mathematics; Lugar: Berlin; Año: 2017 vol. 8 p. 209 - 217

S. FAVIER; RIDOLFI, C.

Weighted Best Local Approximation

Analysis in Theory and Applications; Lugar: Nanjing; Año: 2016 vol. 32 p. 1 - 19

ACINAS, SONIA; FAVIER, SERGIO

Multivalued extended best \phi - polynomial approximation operator

NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION; Lugar: Londres; Año: 2016

ACINAS, S.; S. FAVIER; ZÓ, F.

Extended Best Polynomial Approximation Operator In Orlicz Spaces

NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION; Lugar: New York; Año: 2015 vol. 36 p. 817 - 829

ACINAS, SONIA; FAVIER, S.

Inequalities for one-sided operators in Orlicz spaces

Actas del XII Congreso Monteiro; Lugar: Bahia Blanca; Año: 2013 p. 149 - 161

H. CUENYA; S. FAVIER; F. ZÓ

Inequalities in L^{p-1} for the Extended L^p Best Approximation Operator

JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS; Lugar: Nueva York; Año: 2012 vol. 393 p. 80 - 88

S. ACINAS; S. FAVIER

Maximal Inequalities in Orlicz Spaces

International Journal of Mathematical Analysis; Lugar: Ruse; Año: 2012 vol. 6 p. 2179 - 2198

S. FAVIER, F. ZÓ

Maximal Inequalities for a Best Approximation Operator in Orlicz Spaces

COMMENTATIONES MATHEMATICAE; Año: 2011 vol. 51 p. 3 - 21

I. CARRIZO, S. FAVIER, F. Zó

A characterization of Extended Best Ö-Approximation Operator

NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION; Lugar: Estados Unidos; Año: 2011 vol. 32 p. 254 - 266

CUENYA, H. FAVIER S. LEVIS, F AND RIDOLFI, C.

Weighted best local || · ||−approximation in Orlicz Spaces

Jaen Jornal on Approximation; Lugar: Jaen; Año: 2010 p. 113 - 127

S. FAVIER, C. RIDOLFI

Weighted best local approximation in Orlicz spaces

Analysis in Theory and Applications; Lugar: Nanjing; Año: 2008 vol. 24 p. 225 - 236

I. CARRIZO, S. FAVIER, F. ZÓ

Extension of the best approximation operator in Orlicz spaces

Abstract and Applied Analysis; Lugar: New York; Año: 2008 vol. 2008 p. 1 - 15

S. FAVIER; F. ZÓ

A Lebesgue Type Differentiation Theorem for Best Approximations by Constant in Orlicz Spaces

REAL ANALYSIS EXCHANGE; Lugar: Michigan; Año: 2005 vol. 30 p. 29 - 42

CARRIZO, I.; FAVIER, S.

Perturbation of wavelet and Gabor frames

Analysis in Theory and Applications; Lugar: Nanjing; Año: 2003 vol. 19 p. 238 - 254

CHRISTENSEN, O.; FAVIER, S.; ZÓ, F.

Irregular wavelet frames and Gabor frames

APPROXIMATION THEORY AND ITS APPLICATIONS; Lugar: Dordrecht; Año: 2001 vol. 17 p. 90 - 101

FAVIER, S.; ZÓ, F.

Extension of the Best Approximation Operator in Orlicz Spaces and Weak-Type Inequalities

ABSTRACT AND APPLIED ANALYSIS; Lugar: New York; Año: 2001 vol. 6 p. 101 - 114

FAVIER, S.; ZALIK, R.

On the Stability of Frames and Riesz Bases

APPLIED AND COMPUTATIONAL HARMONIC ANALYSIS; Lugar: Orlando. USA; Año: 1995 vol. 2 p. 160 - 173

ZÓ, F.; FAVIER, S.

Convergence of F-Approximations to the Strict Approximation in Rn

NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION; Lugar: New York; Año: 1995 vol. 16 p. 825 - 834

ZÓ, F.; FERNANDEZ, C.; FAVIER, S.

The Natural F- Approximant in Orlicz Spaces

REVISTA DE LA UNIóN MATEMáTICA ARGENTINA; Lugar: Bahía Blanca. Argentina; Año: 1994 vol. 39 p. 27 - 44

FAVIER, S.

Convergence of Functions Average in Orlicz Spaces

NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION; Lugar: London; Año: 1994 vol. 15 p. 263 - 278

ZÓ, F.; FAVIER, S.

The Natural Best Approximation of Landers and Rooge in Orlicz Spaces

COMMENTATIONES MATHEMATICAE; Lugar: Poznan. Polonia; Año: 1992 vol. 32 p. 225 - 234

FAVIER, S.; FERNANDEZ, C.; ZÓ, F.

The Taylor Polynomial as Best Local Approximation in Rectangles

REVISTA DE LA UNIóN MATEMáTICA ARGENTINA; Lugar: Bahía Blanca; Año: 1986 vol. 32 p. 254 - 262