Liouville-type results in two dimensions for stationary points of functionals with linear growth

Abstract

We consider variational integrals of linear growth satisfying the condition of μ-ellipticity for some exponent μ >1 and prove that stationary points u: R2 RN with the property \[ |x| ∞ |u(x)||x| < ∞ \] must be affine functions. The latter condition can be dropped in the scalar case together with appropriate assumptions on the energy density providing an extension of Bernstein's theorem.

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