Abstract
We show that for constant rank partial differential operators mathscr {A} whose wave cones are spanning, generalized Young measures generated by bounded sequences of mathscr {A}-free measures can be characterized by duality with mathscr {A}-quasiconvex integrands of linear growth. This includes a characterization of the concentration effects in such sequences that allows us to conclude that, in sharp contrast to the oscillation effects, the concentration always has mathscr {A}-free structure.
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