Generalised Young Measures and characterisation of gradient Young Measures
Abstract
Given a function f∈ C(Rd) of linear growth, we give a new way of representing accumulation points of equation ∫ f(vi(z))dμ(z), equation where μ∈ M+(), and (vi)i∈ N⊂ L1(,μ) is norm bounded. We call such representations "generalised Young Measures". With the help of the new representations, we then characterise these limits when they are generated by gradients, i.e. when vi = Dui for ui∈ W1,1(,Rm), via a set of integral inequalities.
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