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

Abstract: We consider elliptic systems generated by variational integrals of linear growth satisfying the condition of \(\mu\)-ellipticity for some exponent \(\mu >1\) and prove that stationary points \(u\colon\mathbb{R}^2\to\mathbb{R}^N\) with the property \(\limsup_{|x|\to \infty} \frac{|u(x)|}{|x|} < \infty\) 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.

An extension of a theorem of Bers and Finn on the removability of isolated singularities to the Euler–Lagrange equations related to general linear growth problems

An extension of a theorem of Bers and Finn on the removability of isolated singularities to the Euler–Lagrange equations related to general linear growth problems

Small Weights in Caccioppoli’s Inequality and Applications to Liouville-Type Theorems for Nonstandard Problems

Variants of Bernstein’s theorem for variational integrals with linear and nearly linear growth