On a bounded almost periodic solution of semilinear parabolic equation (Q2740348)

This paper deals with the equation of the form NEWLINE\[NEWLINELu:=u_t-{\mathcal L}(t,x)u=F(t,x,u,u_{x})\tag{1}NEWLINE\]NEWLINE where \((t,x)\in \mathbb R^{1+n}, {\mathcal L}(t,x)\) is a uniformly elliptic and positive operator. Its coefficients and the function \(F\) are almost periodic in \((t,x)\) and satisfy Hölder conditions with indices \(\nu /2\) in \(t\) and \(\nu \) in \(x\). The author establishes conditions under which there exists a unique almost periodic solution to (1). This solution is sought as the uniform limit of successive approximations \(\{u^k\}_{k=1,2,\ldots }\) constructed as solutions of the sequence of linear equations \(Lu^k=F(t,x,u^k,u^k_{x})\). The solvability of these equations in the class of Hölder almost periodic functions follows from the fact that the fundamental solution of \(L\) is Hölder almost periodic.