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Lusin-type theorems for Cheeger derivatives on metric measure spaces

Published 2015-02-03Version 1

A theorem of Lusin states that every Borel function on $R$ is equal almost everywhere to the derivative of a continuous function. This result was later generalized to $R^n$ in works of Alberti and Moonens-Pfeffer. In this note, we prove direct analogs of these results on a large class of metric measure spaces, those with doubling measures and Poincar\'e inequalities, which admit a form of differentiation by a famous theorem of Cheeger.

Comments: 16 pages. Comments welcome

Categories: math.CA, math.MG

Subjects: 26B05, 30L99

Keywords: metric measure spaces, cheeger derivatives, lusin-type theorems, borel function, lusin states

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arXiv:1502.00694 [math.CA]Abstract References Reviews Resources

Lusin-type theorems for Cheeger derivatives on metric measure spaces

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Lusin-type theorems for Cheeger derivatives on metric measure spaces

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arXiv:1502.00694 [math.CA]Abstract References Reviews Resources