HIGHLIGHTS
- who: David Bate from the Zeeman Building, University of Warwick, Coventry , AL, UK have published the research work: Characterising rectifiable metric spaces using tangent spaces, in the Journal: (JOURNAL)
- what: The authors show that the limiting function, ι: S ⊂ n → C, is α-Hölder continuous. The authors show how the properties of B imply Theorem 3.4 item 3. One way to do this is to consider each Q ∈ Q(i) one at a time and apply Lemma 3.8 several times to extend ι to Q ∩ D(i + 1) (for the purposes of this discussion, ignore . . .
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