Existence and uniqueness of minimizers of general least gradient problems

Abstract

Motivated by problems arising in conductivity imaging, we prove existence, uniqueness, and comparison theorems - under certain sharp conditions - for minimizers of the general least gradient problem \[∈fu∈ BVf() ∫(x,Du),\] where f:∂ is continuous, \[ BVf():=\v∈ BV(): \ \ ∀ x∈ ∂ , \ \ r 0 \ y∈ , |x-y|<r |f(x) - v(y)| = 0 \ \ %BVf()=\u∈ BV(): 0.1cm u|∂ =f 0.1cm and 0.1cm 0.1cm u 0.1cm is continuous at 0.1cm ∂ \. \] and (x,) is a function that, among other properties, is convex and homogeneous of degree 1 with respect to the variable. In particular we prove that if a∈ C1,1() is bounded away from zero, then minimizers of the weighted least gradient problem ∈fu ∈ BVf∫ a|Du| are unique in BVf(). We construct counterexamples to show that the regularity assumption a∈ C1,1 is sharp, in the sense that it can not be replaced by a∈ C1,α() with any α<1.