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The qualitative boundary behavior of blow-up solutions of the super-Liouville equations
Jürgen Jost, Chunqin Zhou and Miaomiao Zhu
Continuing our work on the boundary value problem for super-Liouville equation, we study the qualitative behavior of boundary blow-ups. The boundary condition is derived from the chirality conditions in the physics literature, and is geometrically natural. In technical terms, we derive a new Pohozaev type identity and provide a new alternative, which also works at the boundary, to the classical method of Br\'ezis-Merle.