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ON THE DECAY OF VISCOSITY SOLUTIONS TO HAMILTON–JACOBI EQUATIONS WITH ALMOST PERIODIC INITIAL DATA
The Cauchy problem is treated for a multidimensional Hamilton–Jacobi equation with a merely continuous nonstrictly convex Hamiltonian and a Bohr almost periodic initial function. Under the condition that the Hamiltonian is not degenerate in resonant directions (laying in the additive group generated by the spectrum of the initial function), the uniform decay of the viscosity solution to the constant equal to the infimum of the initial function is established. © 2021. All rights reserved.
Authors
Panov E.Y. 1, 2
Publisher
American Mathematical Society
Issue number
4
Language
English
Pages
767-779
State
Published
Link
Volume
32
Year
2021
Organizations
- 1 Novgorod State University, 41, B. St.-Petersburgskaya str, Veliky Novgorod, 173003, Russian Federation
- 2 Peoples’ Friendship University of Russia (, RUDN University, 6 Miklukho-Maklaya St, Moscow, 117198, Russian Federation
Keywords
almost periodic functions; decay property; Hamilton–Jacobi equations; spectrum; viscosity solutions
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