Plurisubharmonic Functions in Calibrated Geometries

In this paper we introduce and study the notion of plurisubharmonic functions in calibrated geometry. These functions generalize the classical plurisubharmonic functions from complex geometry and enjoy many of their important properties. Moreover, they exist in abundance whereas the corresponding pluriharmonics are generally quite scarce. A number of the results established in complex analysis via plurisubharmonic functions are extended to calibrated manifolds. This paper investigates, in depth, questions of: pseudoconvexity and cores, positive φ-currents, Duval-Sibony Duality, and boundaries of φ-submanifolds, all in the context of a general calibrated manifold (X, φ). Analogues of totally real submanifolds are used to construct enormous families of strictly φ-convex spaces with every topological type allowed by Morse Theory. Specific calibrations are used as examples throughout. Analogues of the Hodge Conjecture in calibrated geometry are considered. Partially supported by the N.S.F.