A note on the uniformity of the constant in the Poincar\'e inequality
Abstract
The classical Poincar\'e inequality establishes that for any bounded regular domain ⊂ N there exists a constant C=C()>0 such that ∫ |u|2\, dx ≤ C ∫ |∇ u|2\, dx \ \ ∀ u ∈ H1(),\ ∫ u(x) \, dx=0. In this note we show that C can be taken independently of when is in a certain class of domains. Our result generalizes previous results in this direction.
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