Semilinear elliptic equations admitting similarity transformations

Abstract

In this paper we study the equation - u+-(α+2)h(αu)=0 in a smooth bounded domain where (x)=dist\,(x,∂ ), α>0 and h is a non-decreasing function which satisfies Keller-Osserman condition. We introduce a condition on h which implies that the equation is subcritical, i.e. the corresponding boundary value problem is well posed with respect to data given by finite measures. Under additional assumptions on h we show that this condition is necessary as well as sufficient. We also discuss b.v. problems with data given by positive unbounded measures. Our results extend results of MV1 treating equations of the form - u+β uq=0 with q>1, β>-2.