Packing measure as a gauge variation

G. A. Edgar
Department of Mathematics
The Ohio State University
Columbus, OH 43210   U.S.A.

edgar@math.ohio-state.edu

(Version of April, 1993)

Proc. Amer. Math. Soc. 122 (1994) 167-174

Abstract

Meinershagen noted that (in the line) the fractal packing measure of Tricot and Taylor can be considered to be a Henstock-Thomson gauge variation ("method III") for an appropriate choice of derivation basis and set function. We show that this point of view remains interesting in a general metric space.

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