Journal
JOURNAL OF DYNAMICS AND DIFFERENTIAL EQUATIONS
Volume 34, Issue 1, Pages 271-310Publisher
SPRINGER
DOI: 10.1007/s10884-020-09916-6
Keywords
Reducibility; Linear KdV equation; Quasi-periodic coefficients
Categories
Funding
- NSFC [11601232, 11775116, 11971012]
- fundamental research funds for the Central Universities [KJQN201717, KYZ201537]
- Jiangsu provincial scholarship for overseas research
- NSERC [1257749, RGPIN-2020-04451]
- University of Alberta
- Jilin University
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In this paper, we study the one-dimensional, quasi-periodically forced, linear KdV equations and obtain results on the reducibility of the equations and the existence and stability of solutions.
In this paper, we consider the following one-dimensional, quasi-periodically forced, linear KdV equations u(t) + (1+a(1)(omega t))u(xxx) + a(2)(omega t, x)u(xx) + a(3)(omega t, x)u(x) + a(4)(omega t, x)u = 0 under the periodic boundary condition u(t, x + 2 pi) = u(t, x), where.'s are frequency vectors lying in a bounded closed region Pi(*) subset of R-b for some b > 1, a(1) : T-b -> R, a(i) : T-b x T -> R, i = 2, 3, 4, are real analytic, bounded from the above by a small parameter is an element of(*) > 0 under a suitable norm, and a(1), a(3) are even, a(2), a(4) are odd. Under the real analyticity assumption of the coefficients, we re-visit a result of Baldi et al. (Math Ann 359(1-2):471-536, 2014) by showing that there exists a Cantor set Pi(epsilon*) subset of Pi(epsilon*) with vertical bar Pi(epsilon*) \ Pi(epsilon*)vertical bar = O(epsilon(1/100)(*)) such that for each omega Pi(epsilon*), the corresponding equation is smoothly reducible to a constant-coefficient one. Our main result removes a condition originally assumed in Baldi et al. (2014) and thus can yield general existence and linear stability results for quasi-periodic solutions of a reversible, quasi-periodically forced, nonlinear KdV equation with much less restrictions on the nonlinearity. The proof of our reducibility result makes use of some special structures of the equations and is based on a refined Kuksin's estimate for solutions of homological equations with variable coefficients.
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