Regularity of geodesics in the spaces of convex and plurisubharmonic functions
Abstract
In this note we investigate the regularity of geodesics in the space of convex and plurisubharmonic functions. In the real setting we prove (optimal) local C1,1 regularity. We construct examples which prove that the global C1,1 regularity fails both in the real and complex case in contrast to the K\"ahler manifold setting. Finally we show a necessary and sufficient conditions for existence of a smooth geodesic between two smooth strictly convex functions.
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