Geometric analysis in the Euclidean space

at Departament de Matemàtiques, UAB

Tag: Albert Mas

A. Mas and X. Tolsa. “Lp-estimates for the variation for singular integrals on uniformly rectifiable sets”. Preprint (2015). To appear in Trans. Amer. Math. Soc. pdf

N. Arrizabalaga, A. Mas and L. Vega.   Shell interactions for Dirac operators,   submitted (2013). pdf

A. Mas.   Variational inequalities for singular integral operators,   Journees equations aux
derivees partielles (2012), Exp. No. 7, 14 pages, http://www.cedram.org. pdf

A. Mas.   Variation for singular integrals on Lipschitz graphs: Lp and endpoint estimates,   to appear in Trans. Amer. Math. Soc. (2013), 21 pages. pdf

A. Mas and X. Tolsa.   Variation for the Riesz transform and uniform recti ability,   J. Eur. Math. Soc. 16(11) (2014), 2267–2321. pdf

A. Mas.   Failure of rational approximation on some Cantor type sets,   Proc. Amer. Math. Soc., 137(2) (2009), 635-640. pdf

A. Mas and X. Tolsa.   Variation and oscillation for singular integrals with odd kernel on Lipschitz graphs,   Proc. London Math. Soc. 105(1) (2012), 49-86. pdf

A. Mas, M. Melnikov, and X. Tolsa.   A dual characterization of the C1 harmonic capacity and applications,   Duke Math. J., 153(1) (2010), 1-22. pdf
See also   Erratum to: “A dual characterization of the C1 harmonic capacity and applications”, Duke Math. J. 153(1) (2010), 1-22,   Duke Math. J., 157(2) (2011), 421-423. pdf

© 2024 Geometric analysis in the Euclidean space

Theme by Anders NorenUp ↑