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| NUMBER | M21016 |
|---|---|
| AUTHOR | Shin, Jinwoo,Ho, Pak Tung,Shin, Jinwoo |
| TITLE | Equivariant Yamabe problem with boundary |
| ARCHIVE | |
| FILE | |
| JOURNAL | CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS, 2022 |
| ABSTRACT | As a generalization of the Yamabe problem, Hebey and Vaugon considered the equivariant Yamabe problem: for a subgroup G of the isometry group, find a G-invariant metric whose scalar curvature is constant in a given conformal class. In this paper, we study the equivariant Yamabe problem with boundary. |
