Mathematics – Complex Variables
Scientific paper
2009-07-19
Mathematics
Complex Variables
Scientific paper
We consider some second order quasilinear partial differential inequalities for real valued functions on the unit ball and find conditions under which there is a lower bound for the supremum of nonnegative solutions that do not vanish at the origin. As a consequence, for complex valued functions $f(z)$ satisfying $\partial f/\partial\bar z=|f|^\alpha$, $0<\alpha<1$, and $f(0)\ne0$, there is also a lower bound for $\sup|f|$ on the unit disk. For each $\alpha$, we construct a manifold with an $\alpha$-H\"older continuous almost complex structure where the Kobayashi-Royden pseudonorm is not upper semicontinuous.
Coffman Adam
Pan Yifei
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