A. B. Khasanov, Kh. N. Normurodov, U. O. Khudayorov
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Cauchy Problem for the Nonlinear Liouville Equation in the Class of Periodic Infinite-Gap Functions
Abstract
The inverse spectral problem method is used to integrate the nonlinear Liouville equation
in the class of periodic infinite-gap functions. The evolution of the spectral data of the periodic
Dirac operator whose coefficient is a solution of the nonlinear Liouville equation is introduced.
The solvability of the Cauchy problem for an infinite system of Dubrovin differential equations in
the class of three times continuously differentiable periodic infinite-gap functions is proved. It is
shown that the sum of a uniformly convergent function series constructed by solving the Dubrovin
system of equations and using the first trace formula satisfies the Liouville equation.
期刊介绍:
Differential Equations is a journal devoted to differential equations and the associated integral equations. The journal publishes original articles by authors from all countries and accepts manuscripts in English and Russian. The topics of the journal cover ordinary differential equations, partial differential equations, spectral theory of differential operators, integral and integral–differential equations, difference equations and their applications in control theory, mathematical modeling, shell theory, informatics, and oscillation theory. The journal is published in collaboration with the Department of Mathematics and the Division of Nanotechnologies and Information Technologies of the Russian Academy of Sciences and the Institute of Mathematics of the National Academy of Sciences of Belarus.
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