H¹ and BMO for certain locally doubling metric measure spaces of finite measure

Andrea Carbonaro; Giancarlo Mauceri; Stefano Meda

Andrea Carbonaro ; Giancarlo Mauceri ; Stefano Meda

Colloquium Mathematicae, Tome 120 (2010), p. 13-41 / Harvested from The Polish Digital Mathematics Library

Résumé

In a previous paper the authors developed an H¹-BMO theory for unbounded metric measure spaces (M,ρ,μ) of infinite measure that are locally doubling and satisfy two geometric properties, called “approximate midpoint” property and “isoperimetric” property. In this paper we develop a similar theory for spaces of finite measure. We prove that all the results that hold in the infinite measure case have their counterparts in the finite measure case. Finally, we show that the theory applies to a class of unbounded, complete Riemannian manifolds of finite measure and to a class of metric measure spaces of the form $(ℝ^{d}, ρ_{φ}, μ_{φ})$ , where $d μ_{φ} = e^{- φ} d x$ and $ρ_{φ}$ is the Riemannian metric corresponding to the length element $d s ² = (1 + | \nabla φ |) ² (d x ₁ ² + \dots + d x ²_{d})$ . This generalizes previous work of the last two authors for the Gauss space.

Publié le : 2010-01-01

Zbl 1193.42076

EUDML-ID : urn:eudml:doc:284037

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     author = {Andrea Carbonaro and Giancarlo Mauceri and Stefano Meda},
     title = {H$^1$ and BMO for certain locally doubling metric measure spaces of finite measure},
     journal = {Colloquium Mathematicae},
     volume = {120},
     year = {2010},
     pages = {13-41},
     zbl = {1193.42076},
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Andrea Carbonaro; Giancarlo Mauceri; Stefano Meda. H¹ and BMO for certain locally doubling metric measure spaces of finite measure. Colloquium Mathematicae, Tome 120 (2010) pp. 13-41. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-doi-10_4064-cm118-1-2/