Abstract
In this paper we define and study signed deficient topological measures and signed topological measures (which generalize signed measures) on locally compact spaces. We prove that a signed deficient topological measure is τ-smooth on open sets and τ-smooth on compact sets. We show that the family of signed measures that are differences of two Radon measures is properly contained in the family of signed topological measures, which in turn is properly contained in the family of signed deficient topological measures. Extending known results for compact spaces, we prove that a signed topological measure is the difference of its positive and negative variations if at least one variation is finite; we also show that the total variation is the sum of the positive and negative variations. If the space is locally compact, connected, locally connected, and has the Alexandrov one-point compactification of genus 0, a signed topological measure of finite norm can be represented as a difference of two topological measures.
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Acknowledgement
The author would like to thank the Department of Mathematics at the University of California Santa Barbara for its supportive environment.
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Butler, S.V. Signed Topological Measures on Locally Compact Spaces. Anal Math 45, 757–773 (2019). https://doi.org/10.1007/s10476-019-0005-2
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DOI: https://doi.org/10.1007/s10476-019-0005-2
Key words and phrases
- signed deficient topological measure
- signed topological measure
- positive
- negative
- total variation of a signed deficient topological measure