![]() Shanmugalingam, Fat sets and pointwise boundary estimates for p-harmonic functions in metric spaces, J. Björn, Necessity of a Wiener type condition for boundary regularity of quasiminimizers and nonlinear elliptic equations, Calc. Björn, Fine continuity on metric spaces, Manuscripta Math. 103–115, Mathematical Society of Japan, Tokyo, 2006. Björn, Wiener criterion for Cheeger p-harmonic functions on metric spaces, in Potential Theory in Matsue, Advanced Studies in Pure Mathematics 44, pp. Björn, Boundary continuity for quasiminimizers on metric spaces, Illinois J. ![]() Marola, Moser iteration for (quasi)minimizers on metric spaces, Manuscripta Math. 10.4171/RMI/1025 Search in Google Scholar Sjödin, The Dirichlet problem for p-harmonic functions with respect to arbitrary compactifications, Rev. Shanmugalingam, The Dirichlet problem for p-harmonic functions with respect to the Mazurkiewicz boundary, and new capacities, J. Shanmugalingam, Quasicontinuity of Newton–Sobolev functions and density of Lipschitz functions on metric spaces, Houston J. Shanmugalingam, The Perron method for p-harmonic functions in metric spaces, J. Shanmugalingam, The Dirichlet problem for p-harmonic functions on metric spaces, J. Parviainen, Nonlinear balayage on metric spaces, Nonlinear Anal. Li, Sphericalization and p-harmonic functions on unbounded domains in Ahlfors regular metric spaces, J. Latvala, The Cartan, Choquet and Kellogg properties for the fine topology on metric spaces, J. Björn, Obstacle and Dirichlet problems on arbitrary nonopen sets in metric spaces, and fine topology, Rev. ![]() Björn, Nonlinear Potential Theory on Metric Spaces, EMS Tracts in Mathematics 17, European Math. Björn, Approximations by regular sets and Wiener solutions in metric spaces, Comment. ![]() ![]() Björn, Boundary regularity for p-harmonic functions and solutions of the obstacle problem on metric spaces, J. Björn, The Kellogg property and boundary regularity for p-harmonic functions with respect to the Mazurkiewicz boundary and other compactifications, Complex Var. Björn, The Dirichlet problem for p-harmonic functions on the topologist’s comb, Math. Björn, Cluster sets for Sobolev functions and quasiminimizers, J. Björn, p-harmonic functions with boundary data having jump discontinuities and Baernstein’s problem, J. Björn, A regularity classification of boundary points for p-harmonic functions and quasiminimizers, J. Björn, Characterizations of p-superharmonic functions on metric spaces, Studia Math. Shanmugalingam, The prime end capacity of inaccessible prime ends, resolutivity, and the Kellogg property, to appear in Math. )-superharmonic functions, the Kellogg property and semiregular boundary points, Ann. ![]()
0 Comments
Leave a Reply. |
Details
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |