Nonexistence of vanishing-viscosity limits for mechanical Hamiltonian ergodic problems
Abstract
For >0, let φ be the solution of the ergodic problem \[ 12 |Dφ|2+F(x)-φ=c() on Tn, \] normalized by φ(0)=0. We construct a one-dimensional example with F∈ C3 for which the vanishing-viscosity limit 0φ does not exist. This gives a negative answer to a problem proposed by Jauslin, Kreiss, and Moser [10].
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