Representation theorems for dynamic convex risk measures

Abstract

In this paper, we prove that under the domination condition: equation* E-μ,-[-|Ft]≤t()≤Eμ,[-|Ft], ∀∈ LT\ (resp.\ L2(FT)),\ ∀ t∈[0,T], equation* where Eμ, is the g-expectation with generator μ|z|+|z|2, μ≥0, ≥0, the dynamic convex (resp. coherent) risk measure admits a representation as a g-expectation, whose generator g is convex (resp. sublinear) in the variable z and has a quadratic (resp. linear) growth. As an application, we show that such dynamic convex (resp. coherent) risk measure admits a dual representation, where the penalty term (resp. the set of probability measures) is characterized by the corresponding generator g.

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