A note on lower bounds of martingale measure densities

Abstract

For a given element f∈ L1 and a convex cone C⊂ L∞, C L∞+=\0\ we give necessary and sufficient conditions for the existence of an element g f lying in the polar of C. This polar is taken in (L∞)* and in L1. In the context of mathematical finance the main result concerns the existence of martingale measures, whose densities are bounded from below by prescribed random variable.

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