Splitting-type variational problems with asymmetrical growth conditions

Abstract

Splitting-type variational problems \[ ∫ Σi=1n fi(∂i w) dx \] with superlinear growth conditions are studied by assuming \[ hi(t) ≤ f''i(t) ≤ Hi(t) \] with suitable functions hi, Hi: R R+, i=1, … , n, measuring the growth and ellipticity of the energy density. Here, as the main feature, a symmetric behaviour like hi(t)≈ hi(-t) and Hi(t) ≈ Hi(-t) for large |t| is not supposed. Assuming quite weak hypotheses as above, we establish higher integrability of |∇ u| for local minimizers u∈ L∞() by using a Caccioppoli-type inequality with some power weights of negative exponent.