Universitat de Barcelona
In this paper, we study the natural capacity γα related to the Riesz kernels x/∣x∣1 + α in ℝn, where 0 < α < n. For noninteger α, an unexpected behaviour arises: for 0 < α < 1, compact sets in ℝn with finite α-Hausdorff measure have zero γα capacity. In the Ahlfors-David regular case, for any noninteger index α, 0 < α < n, we prove that compact sets of finite α-Hausdorff measure have zero γα capacity.
Article
Published version
English
Teoria del potencial (Matemàtica); Geometria algebraica; Potentials and capacities; Hausdorff and packing measures
Duke University Press
Reproducció del document publicat a http://dx.doi.org/10.1155/S107379280413033X
International Mathematics Research Notices, 2004, vol. 2004, núm. 19, p. 937-981.
http://dx.doi.org/10.1155/S107379280413033X
(c) Duke University Press, 2004
