Nonexistence of Minimizers for a Nonlocal Perimeter Functional with a Riesz and a Background Potential

Abstract

We consider the nonexistence of minimizers for the energy containing a nonlocal perimeter with a general kernel K, a Riesz potential, and a background potential in RN with N≥2 under the volume constraint. We show that the energy has no minimizer for a sufficiently large mass under suitable assumptions on K. The proof is based on the partition of a minimizer and the comparison of the sum of the energy for each part with the energy for the original configuration. This strategy is shown in [R.A. Frank, R. Killip, P.T. Nam, 2016] and [D.A. La Manna, 2018]