Uniform Poincar\'e inequality in o-minimal structures
Abstract
We first define the trace on a domain which is definable in an o-minimal structure. We then show that every function u∈ W1,p() vanishing on the boundary in the trace sense satisfies Poincar\'e inequality. We finally show, given a definable family of domains (t)t∈ Rk, that the constant of this inequality remains bounded, if so does the volume of t.
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