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diffusion; Bessel operator; periodic solutions; existence; weak solution
In this paper, the existence of an $\omega$-periodic weak solution of a parabolic equation (1.1) with the boundary conditions (1.2) and (1.3) is proved. The real functions $f(t,r),h(t),a(t)$ are assumed to be $\omega$-periodic in $t,f\in L_2(S,H),a,h$ such that $a'\in L_\infty (R), h'\in L_\infty (R)$ and they fulfil (3). The solution $u$ belongs to the space $L_2(S,V)\cap L_\infty (S,H)$, has the derivative $u'\in L_2(S,H)$ and satisfies the equations (4.1) and (4.2). In the proof the Faedo-Galerkin method is employed.
[1] R. S. Minasjan: On one problem of the periodic heat flow in the infinite cylinder. Dokl. Akad. Nauk Arm. SSR 48 (1969). MR 0241828
[2] H. Triebel: Höhere Analysis. VEB Berlin 1972. Zbl 0257.47001
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