Asymptotic behaviors of governing equation of Gauged Sigma model for Heisenberg ferromagnet

Abstract

In this note, we study weak solutions of equation equationeq 00.1 u =4eu1+eu -4πΣNi=1δpi+4πΣMj=1δqj in\;\; R2, equation where \δpi\i=1N (resp. \δqj\j=1M ) are Dirac masses concentrated at the points pi, i=1,·s, N, (resp. qj, i=1,·s, M) %δpj is Dirac mass concentrated at the point pj and N-M>1. This equation presents a governing equation of Gauged Sigma model for Heisenberg ferromagnet and we prove that it has a sequence of solutions uβ having behaviors as -2πβ |x|+O(1) at infinity with a free parameter β∈(2,2(N-M)), and our concern in this paper is to study the asymptotic behavior's estimates in the extremal case that β near 2 and 2(N-M).