On a differential inequality and its applications to geometry

We introduce new methods of complex analysis (inequalities of Bernstein type) to study projections of analytic sets. These techniques are applied to problems of bifurcations of periodic orbits of differential equations such as the local Hilbert's 16 th problem. 1997 Academic Press ## I. INTRODUCTI

In this paper we prove a generalised version of the Omori-Yau maximum principle and describe some applications to problems in geometry and differential equations. ' 1995 Academic Press. Inc.

In this paper, a new nonlinear integro-differential inequality is established. Using the properties of M-cone and a generalization of Barbalat's lemma, the boundedness and asymptotic behavior for the solution of the inequality are obtained. Applying this nonlinear integro-differential inequality, th

In this paper, the weight coefficient of the form y n r 2 n q 1 with Ž . . n ) 0 is introduced. Improvements on Hilbert's inequality and the Hardy᎐ Littlewood inequality are established, and these results are extended. ᮊ 1997