On the Unique Solvability of a Nonlinear Functional Evolution Equation

Nonnegative solutions of a general reaction-diffusion model with convection are known to be unique if the reaction, convection, and diffusion terms are all Lipschitz continuous with respect to their dependence on the solution variable. However, it is also known that such a Lipschitz condition is not

In this paper, we will introduce a new multiplicative functional Eq. 1 and prove Ž . that the given equation is equivalent to the well known ''original'' one, f xy s Ž . Ž . Ž . f x f y . Moreover, we will investigate the stability problem of Eq. 1 in the sense of R. Ger.

j makes sense. If ⍀ is bounded then, with the understanding that Z 0 [ л, Ž . Ž . A3 is trivially satisfied with s ⍀, s л, and m s 0, and iii then imposes no restriction on the kernel k.

The present paper is concerned with the global solvability of the Cauchy problem for the quasilinear parabolic equations with two independent variables: Ž . Ž . u s a t, x, u, u u q f t, x, u, u . We investigate the case of the arbitrary order < < of growth of the function f t, x, u, p with respect

We consider in this paper the following functional equation which occurs in the theory of queues : + (1a)(l -F ( 4 ) 1 dG(t).