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Regularity for Fully Nonlinear Integro-differential Operators with Regularly Varying Kernels
- Authors
- Kim, Soojung; Kim, Yong-Cheol; Lee, Ki-Ahm
- Issue Date
- 5월-2016
- Publisher
- SPRINGER
- Keywords
- Uniform regularity estimates; Integro-differential operator; Regularly varying kernel
- Citation
- POTENTIAL ANALYSIS, v.44, no.4, pp.673 - 705
- Indexed
- SCIE
SCOPUS
- Journal Title
- POTENTIAL ANALYSIS
- Volume
- 44
- Number
- 4
- Start Page
- 673
- End Page
- 705
- ISSN
- 0926-2601
- Abstract
- In this paper, the regularity results for the integro-differential operators of the fractional Laplacian type by Caffarelli and Silvestre (Comm. Pure Appl. Math. 62, 597-638, 2009) are extended to those for the integro-differential operators associated with symmetric, regularly varying kernels at zero. In particular, we obtain the uniform Harnack inequality and Holder estimate of viscosity solutions to the nonlinear integro-differential equations associated with the kernels K-sigma,K-beta satisfying K-sigma,K-beta (y) asymptotic to 2 - sigma/|y|(n+sigma) (log 2/|y|(2))(beta(2-sigma)) with respect to sigma is an element of(0, 2) close to 2 (for a given beta is an element of R), where the regularity estimates do not blow up as the order sigma is an element of (0, 2) tends to 2.
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