📝 SummarXiv

Abstract

In this work, we study the super-Liouville equation on the sphere with positive coefficient functions. We begin by deriving estimates for the spinor component of the equation, thereby finding that the energy of the spinor part of solutions is uniformly bounded. We then analyze the compactness of the solution space in two aspects: the compactness for solutions with small energy and the compactness with respect to the conformal transformation group of the sphere. Finally, by introducing a new natural constraint, the Nehari manifold, and employing variational methods, we obtain the existence of the least energy solutions when the coefficient functions are even.