A Maximum Rank Theorem for Solutions to the Homogenous Complex Monge-Amp\`ere Equation in a C-Convex Ring
Abstract
Suppose 0,1 are two bounded strongly C-convex domains in Cn, with n≥ 2 and 1⊃0. Let R=10. We call R a C-convex ring. We will show that for a solution to the homogenous complex Monge-Amp\`ere equation in R, with =1 on ∂1 and =0 on ∂0, -1∂∂ has rank n-1 and the level sets of are strongly C-convex.
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