On the finite time blow-ups for solutions of nonlinear differential equations

Abstract

We study systems of nonlinear ordinary differential equations where the dominant term, with respect to large spatial variables, causes blow-ups and is positively homogeneous of a degree 1+α for some α>0. We prove that the asymptotic behavior of a solution y(t) near a finite blow-up time T* is (T*-t)-1/α* for some nonzero vector *. Specific error estimates for |(T*-t)1/αy(t)-*| are provided. In some typical cases, they can be a positive power of (T*-t) or 1/|(T*-t)|. This depends on whether the decaying rate of the lower order term, relative to the size of the dominant term, is of a power or logarithmic form. Similar results are obtained for a class of nonlinear differential inequalities with finite time blow-up solutions. Our results cover larger classes of nonlinear equations, differential inequalities and error estimates than those in the previous work.