On the fundamental solution of an elliptic equation in nondivergence form

Abstract

We consider the existence and asymptotics for the fundamental solution of an elliptic operator in nondivergence form, L(x,x)=aij(x)ii, for n≥ 3. We assume that the coefficients have modulus of continuity satisfying the square Dini condition. For fixed y, we construct a solution of LZy(x)=0 for 0<|x-y|< with explicit leading order term which is O(|x-y|2-neI(x,y)) as x y, where I(x,y) is given by an integral and plays an important role for the fundamental solution: if I(x,y) approaches a finite limit as x y, then we can solve L(x,x)F(x,y)=(x-y), and F(x,y) is asymptotic as x y to the fundamental solution for the constant coefficient operator L(y,x). On the other hand, if I(x,y) -∞ as x y then the solution Zy(x) violates the "extended maximum principle" of Gilbarg & Serrin GS and is a distributional solution of L(x,x)Zy(x)=0 for |x-y|< although Zy is not even bounded as x y.