Regularity and classification of the free boundary for a Monge-Amp\`ere obstacle problem

Abstract

We study convex solutions to the Monge-Amp\`ere obstacle problem \[ det D2 v=g vq\v>0\, v ≥ 0, \] where q ∈ [0,n) is a constant and g is a bounded positive function. This problem emerges from the Lp Minkowski problem. We establish C1, α regularity for the strictly convex part of the free boundary ∂\v=0\. Furthermore, when g ∈ Cα, we prove a Schauder-type estimate. As a consequence, when g 1, we obtain a Liouville theorem for entire solutions with unbounded coincidence sets \v=0\. Combined with existing results, this provides a complete classification of entire solutions for the case q=0.

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