Abstract
We present several constructions of paths and processes with finite quadratic variation along a refining sequence of partitions, extending previous constructions to the non-uniform case. We study in particular the dependence of quadratic variation with respect to the sequence of partitions for these constructions. We identify a class of paths whose quadratic variation along a partition sequence is invariant under coarsening. This class is shown to include typical sample paths of Brownian motion, but also paths which are 12-Hölder continuous. Finally, we show how to extend these constructions to higher dimensions.
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