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We give an estimate for the distance between a given approximate solution for a Lipschitz differential inclusion and a true solution, both depending continuously on initial data.
We prove
of
vector minimizers
() =
(||) to multiple integrals ∫
((), |()|) on a
⊂ ℝ, among the Sobolev functions (·) in +
(, ℝ), using a
: ℝ×ℝ → [0,∞] with
(·) and . Besides such basic hypotheses,
(·,·) is assumed to satisfy also a constraint,...
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