Abstract.
Let A be a Feller generator on a compact space and L be the corresponding Fleming–Viot (FV) operator with no selection and no recombination. In this paper we give conditions on A implying that the semigroup (T t ) generated by L (i) converges towards equilibrium with exponential rate (moreover, we determine explicit bounds on the rate of convergence in terms of A), (ii) is hypercontractive, (iii) is strong Feller, and (iv) is compact. We give applications of the last result to the existence of invariant measures for FV-operators with interactive selection.
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Received: 26 July 2000 / Revised version: 1 March 2001 / Published online: 19 December 2001
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Stannat, W. Long-time behaviour and regularity properties of transition semigroups of Fleming–Viot processes. Probab Theory Relat Fields 122, 431–469 (2002). https://doi.org/10.1007/s004400100166
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DOI: https://doi.org/10.1007/s004400100166
Keywords
- Recombination
- Invariant Measure
- Compact Space
- Regularity Property
- Exponential Rate