Partial regularity for a nonlinear sigma model with gravitino in higher dimensions
TL;DR: In this paper, the authors studied the regularity problem of the nonlinear sigma model with gravitino fields in higher dimensions and derived the Euler-Lagrange equations and showed that any weak solution is actually smooth under some smallness assumption for certain Morrey norms.
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Abstract: We study the regularity problem of the nonlinear sigma model with gravitino fields in higher dimensions. After setting up the geometric model, we derive the Euler–Lagrange equations and consider the regularity of weak solutions defined in suitable Sobolev spaces. We show that any weak solution is actually smooth under some smallness assumption for certain Morrey norms. By assuming some higher integrability of the vector spinor, we can show a partial regularity result for stationary solutions, provided the gravitino is critical, which means that the corresponding supercurrent vanishes. Moreover, in dimension $$<6$$
, partial regularity holds for stationary solutions with respect to general gravitino fields.
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Partial regularity for stationary harmonic maps into spheres
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