Local Times for Continuous Paths of Arbitrary Regularity
We study a pathwise local time of even integer order p >= 2, defined as an occupation density, for continuous functions with finite pth variation along a sequence of time partitions. With this notion of local time and a new definition of the Follmer integral, we establish Tanaka-type change-of-variable formulas in a pathwise manner. We also derive some identities involving this high-order pathwise local time, each of which generalizes a corresponding identity from the theory of semimartingale local time. We then use collision local times between multiple functions of arbitrary regularity to study the dynamics of ranked continuous functions.
- Publisher
- SPRINGER/PLENUM PUBLISHERS
- Issue Date
- 2022-12
- Language
- English
- Article Type
- Article
- Citation
JOURNAL OF THEORETICAL PROBABILITY, v.35, no.4, pp.2540 - 2568
- ISSN
- 0894-9840
- Appears in Collection
- MA-Journal Papers(저널논문)
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