Resistance Conditions and Applications
Juha Kinnunen ; Pilar Silvestre
Analysis and Geometry in Metric Spaces, Tome 1 (2013), p. 276-294 / Harvested from The Polish Digital Mathematics Library

This paper studies analytic aspects of so-called resistance conditions on metric measure spaces with a doubling measure. These conditions are weaker than the usually assumed Poincaré inequality, but however, they are sufficiently strong to imply several useful results in analysis on metric measure spaces. We show that under a perimeter resistance condition, the capacity of order one and the Hausdorff content of codimension one are comparable. Moreover, we have connections to the Sobolev inequality for compactly supported Lipschitz functions on balls as well as capacitary strong type estimates for the Hardy-Littlewood maximal function. We also consider extensions to Sobolev type inequalities with two different measures and Lorentz type estimates.

Publié le : 2013-01-01
EUDML-ID : urn:eudml:doc:266944
@article{bwmeta1.element.doi-10_2478_agms-2013-0007,
     author = {Juha Kinnunen and Pilar Silvestre},
     title = {Resistance Conditions and Applications},
     journal = {Analysis and Geometry in Metric Spaces},
     volume = {1},
     year = {2013},
     pages = {276-294},
     zbl = {1286.46037},
     language = {en},
     url = {http://dml.mathdoc.fr/item/bwmeta1.element.doi-10_2478_agms-2013-0007}
}
Juha Kinnunen; Pilar Silvestre. Resistance Conditions and Applications. Analysis and Geometry in Metric Spaces, Tome 1 (2013) pp. 276-294. http://gdmltest.u-ga.fr/item/bwmeta1.element.doi-10_2478_agms-2013-0007/

[1] M. T. Barlow, R. F. Bass and T. Kumagai, Stability of parabolic Harnack inequalities on metric measure spaces, J. Math. Soc. Japan 58 (2006), no. 2, 485–519. | Zbl 1102.60064

[2] C. Bennett and S. Sharpley, Interpolation of Operators, Pure and Applied Mathematics, 129. Academic Press, Inc., Boston, MA, 1988. | Zbl 0647.46057

[3] A. Björn and J. Björn, Nonlinear Potential Theory on Metric Spaces, Tracts in Mathematics 17, European Mathematical Society, 2011. | Zbl 1231.31001

[4] Yu. A. Brudnyi and N. Ya. Krugljak, Interpolation functors and interpolation spaces, Vol. I. North-Holland Mathematical Library, 47. North-Holland Publishing Co., Amsterdam, 1991.

[5] J. Cerdà, Lorentz capacity spaces, Interpolation theory and applications, Contemp. Math. 445, 45–59, Amer. Math. Soc., Providence, RI, 2007. | Zbl 1141.46313

[6] J. Cerdà, J. Martín and P. Silvestre, Capacitary function spaces, Collectanea Math. 62 (2011), no. 1, 95–118. | Zbl 1225.46021

[7] J. Cerdà, J. Martín and P. Silvestre, Conductor Sobolev type estimates and isocapacitary inequalities, to appear in Indiana Univ. Math. J. | Zbl 1281.46033

[8] S. Costea and V. G. Maz’ya, Conductor inequalities and criteria for Sobolev-Lorentz two-weight inequalities, Sobolev spaces in mathematics. II, 103–121, Int. Math. Ser. (N. Y.) 9 (2009), Springer, New York. | Zbl 1165.26009

[9] A. Grigor’yan and A. Telcs, Harnack inequalities and sub-Gaussian estimates for random walks, Math. Ann. 324 (2002), no. 3, 521–556. | Zbl 1011.60021

[10] H. Hakkarainen and J. Kinnunen, The BV-capacity in metric spaces, Manuscripta Math. 132 (2010), no. 1-2, 51–73. | Zbl 1194.28001

[11] H. Hakkarainen and N. Shanmugalingam, Comparisons of relative BV-capacities and Sobolev capacity in metric spaces, Nonlinear Anal. 74 (2011), no. 16, 5525–5543. | Zbl 1248.28002

[12] J. Kinnunen, R. Korte, N. Shanmugalingam and H. Tuominen, Lebesgue points and capacities via boxing inequality in metric spaces, Indiana Univ. Math. J. 57 (2008), no. 1, 401–430. [WoS] | Zbl 1146.46018

[13] J. Kinnunen, R. Korte, N. Shanmugalingam and H. Tuominen, The DeGiorgi measure and an obstacle problem related to minimal surfaces in metric spaces, J. Math. Pures Appl. (9) 93 (2010), no. 6, 599–622. [WoS] | Zbl 1211.49055

[14] V. G. Maz’ya, Conductor and capacitary inequalities for functions on topological spaces and their applications to Sobolev type imbeddings, J. Funct. Anal. 224 (2005), no. 2, 408–430.

[15] V. G. Maz’ya, Conductor inequalities and criteria for Sobolev type two-weight imbeddings. J. Comput. Appl. Math. 194 (2006), no. 11, 94–114. | Zbl 1104.46020

[16] M. Miranda, Functions of bounded variation on "good" metric spaces, J. Math. Pures Appl. (9) 82 (2003), no. 8, 975–1004. | Zbl 1109.46030

[17] J. Orobitg and J. Verdera, Choquet integrals, Hausdorff content and the Hardy-Littlewood maximal operator, Bull. London Math. Soc. 30 (1998), no. 2, 145–150. | Zbl 0921.42016

[18] P. Silvestre, Capacitary function spaces and applications, PhD-thesis (2012), TDR, B. 8121-2012. www.tesisenred.net/handle/10803/77717