Please use this identifier to cite or link to this item: https://scholarbank.nus.edu.sg/handle/10635/104471
Title: Weighted Poincaré inequalities on convex domain
Authors: Chua, S.-K. 
Wheeden, R.L.
Keywords: Boman domains
Convex domains
Distance weights
Doubling measures
Eccentricity
John domains
Poincaré inequalities
Issue Date: Sep-2010
Citation: Chua, S.-K.,Wheeden, R.L. (2010-09). Weighted Poincaré inequalities on convex domain. Mathematical Research Letters 17 (5) : 993-1011. ScholarBank@NUS Repository.
Abstract: Let Ω be a bounded open convex set in Mn. Suppose that a ≥ 0, β ∈ ℝ, 1 ≤ p ≤ q < ∞, and (iquestion) Let ρ(x) = dist(x,Ωc) = min{|x - y|: y ∈ Ωc} denote the Euclidean distance to the complement of Ω. Define ρa(Ω) = fΩ ρ (x) αdx, and denote (iquestion) We derive the following weighted Poincaré inequality for locally Lipschitz continuous functions f on Ω: (iquestion) where η is the eccentricity of Ω and C is a constant depending only on p, q, α, β and the dimension n. The main point of the estimate is the way the constant depends on η for a general convex domain. We also consider the case 1 ≤ q < p 0. When q ≥ p, the case of convex domains which are symmetric with respect to a point was settled in [CD], and our estimate for q ≥ p extends that result to nonsymmetric domains. Moreover, the exponent of η is sharp and the conditions are necessary. © International Press 2010.
Source Title: Mathematical Research Letters
URI: http://scholarbank.nus.edu.sg/handle/10635/104471
ISSN: 10732780
Appears in Collections:Staff Publications

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