Existence of an absolute minimizer via Perron's method
Abstract
In this paper the existence of an absolute minimizer for a functional \[ F(u,) = x ∈ ess sup \, f (x, u(x), Du(x)) \] is proved by using Perron's method. The function is assumed to be quasiconvex and uniformly coercive. This completes the result by Champion, De Pascale and Prinari.
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