2016
DOI: 10.4171/163-1/4
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Sobolev and bounded variation functions on metric measure spaces

Abstract: − ∇f, ∆∇f = Hessf 2 + Ric(∇f, ∇f). We will refer to this theory as "Eulerian theory", in the sense that it involves gradient, Laplacian etc., and all these concepts make sense also in the abstract setup provided by Dirichlet forms and the associated heat semigroup (whose fundamental generator is precisely the Laplacian). One of the main advantages of Bakry-Émery approach is that it is wellsuited to get useful functional inequalities even in sharp form (e.g., Li-Yau inequality). The other side of the theory is … Show more

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Cited by 25 publications
(44 citation statements)
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“…The latter inequality answers a question raised in [24] and later in [3]. (X) and even in Lip(X), since g is bounded.…”
Section: Theorem 46 Let ω ⊂ X Be An Open Set Let U ∈ Bv(ω) and Lementioning
confidence: 77%
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“…The latter inequality answers a question raised in [24] and later in [3]. (X) and even in Lip(X), since g is bounded.…”
Section: Theorem 46 Let ω ⊂ X Be An Open Set Let U ∈ Bv(ω) and Lementioning
confidence: 77%
“…Next we recall the de nition and basic properties of functions of bounded variation on metric spaces, see [1], [3] and [24]. For u ∈ L loc (X), we de ne the total variation of u as…”
Section: ])mentioning
confidence: 99%
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