PAN Xingchen, BAO Jiguang. A perfect form of inhomogeneous elliptic equations[J]. Journal of Beijing Normal University(Natural Science), 2020, 56(5): 629-636. DOI: 10.12202/j.0476-0301.2020037
Citation:
PAN Xingchen, BAO Jiguang. A perfect form of inhomogeneous elliptic equations[J]. Journal of Beijing Normal University(Natural Science), 2020, 56(5): 629-636. DOI: 10.12202/j.0476-0301.2020037
PAN Xingchen, BAO Jiguang. A perfect form of inhomogeneous elliptic equations[J]. Journal of Beijing Normal University(Natural Science), 2020, 56(5): 629-636. DOI: 10.12202/j.0476-0301.2020037
Citation:
PAN Xingchen, BAO Jiguang. A perfect form of inhomogeneous elliptic equations[J]. Journal of Beijing Normal University(Natural Science), 2020, 56(5): 629-636. DOI: 10.12202/j.0476-0301.2020037
A perfect form of inhomogeneous elliptic equations
Limit form of a class of non-homogeneous elliptic equation Dirichlet problems is obtained from conduction problem, to establish optimal global gradient estimate when distance between two perfect conductors is small enough. Blow-up rates of electric field strength are given in all dimensions.
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