Time-periodic solutions of contact Hamilton-Jacobi equations on the circle

Abstract

We are concerned with the existence and multiplicity of nontrivial time-periodic viscosity solutions to \[ ∂t w(x,t) + H( x,∂x w(x,t),w(x,t) )=0, (x,t)∈ S × [0,+∞). \] We find that there are infinitely many nontrivial time-periodic viscosity solutions with different periods when ∂ H∂ u(x,p,u)≤slant-δ<0 by analyzing the asymptotic behavior of the dynamical system (C(S ,R),\Tt\t≥slant 0), where \Tt\t≥slant 0 was introduced in WWY1. Moreover, in view of the convergence of Ttn, we get the existence of nontrivial periodic points of Tt, where are initial data satisfying certain properties. This is a long-time behavior result for the solution to the above equation with initial data . At last, as an application, we describe to readers a bifurcation phenomenon for \[ ∂t w(x,t) + H( x,∂x w(x,t),λ w(x,t) )=0, (x,t)∈ S × [0,+∞), \] when the sign of the parameter λ varies. The structure of the unit circle S plays an essential role here. The most important novelty is the discovery of the nontrivial recurrence of (C(S ,R),\Tt\t≥slant 0).

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