Nonuniform Nonresonance of Semilinear Differential Equations

The existence of positive solutions of a second order differential equation of the form z"+ g(t) f (z)=0 (1.1) with suitable boundary conditions has proved to be important in theory and applications whether g is continuous in [0, 1] or g has singularities. These equations often arise in the study

A superdiffusion is a measure-valued branching process associated with a nonlinear operator Lu& (u) where L is a second order elliptic differential operator and is a function from R d \_R + to R + . In the case L1 0 (the so-called subcritical case), the expectation of the total mass does not increas

This is an attempt to establish a link between positive solutions of semilinear equations Lu=& (u) and Lv= (v) where L is a second order elliptic differential operator and is a positive function. The equations were investigated separately by a number of authors. We try to link them via positive solu

Under the assumption of uniformly continuity, we establish a composition theorem of pseudo almost-periodic functions in general Banach spaces. As an application, we give some existence theorems of pseudo almost-periodic solutions and mild pseudo almost-periodic solutions for some differential equati

## Abstract We consider local solvability of semilinear hyperbolic Cauchy problems for Gevrey functions. To obtain a general result, we define the notion of irregularities, and we give a criterion for the local solvability. (© 2005 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)