A mathematical framework for time-variant multi-state kinship modelling
A mathematical framework for time-variant multi-state kinship modelling
Recent research on kinship modelling in demography has extended age-structured models (i) to include additional characteristics, or “stages” (multi-state kinship), and (ii) to time-variant situations. A wide variety of population structures can affect kinship networks. However, only one prior model has comprehensively considered such effects, and under specific assumptions relating to the nature of individuals’ stages. As such, the leading multi-state framework for kin is theoretically limited in scope, and moreover, has yet to be implemented under time-variant demographic rates. Generalising kinship models to encompass arbitrary population characteristics and extending them to time-dependent processes remain open challenges in demography. This research proposes a methodology to extend multi-state kinship. We present a model which theoretically accounts for any stage, both in time-variant and time-invariant environments. Drawing from Markov processes, a concise mathematical alternative to existing theory is developed. The benefits of our model are illustrated by an application where we define stages as spatial locations, exemplified by clusters of local authority districts (LADs) in England and Wales. Our results elucidate how spatial distribution – a demographic characteristic ubiquitous across (and between) societies – can affect an individual's network of relatives.
Age×stage-structured populations, Kinship, Markov process, Mathematical demography, Matrix projections
1-12
Butterick, Joe W.B.
7d72bff7-0349-4cdc-8acb-fa1fb5592140
Smith, Peter W.F.
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Bijak, Jakub
e33bf9d3-fca6-405f-844c-4b2decf93c66
Hilton, Jason
da31e515-1e34-4e9f-846d-633176bb3931
11 March 2025
Butterick, Joe W.B.
7d72bff7-0349-4cdc-8acb-fa1fb5592140
Smith, Peter W.F.
961a01a3-bf4c-43ca-9599-5be4fd5d3940
Bijak, Jakub
e33bf9d3-fca6-405f-844c-4b2decf93c66
Hilton, Jason
da31e515-1e34-4e9f-846d-633176bb3931
Butterick, Joe W.B., Smith, Peter W.F., Bijak, Jakub and Hilton, Jason
(2025)
A mathematical framework for time-variant multi-state kinship modelling.
Theoretical Population Biology, 163, .
(doi:10.1016/j.tpb.2025.02.002).
Abstract
Recent research on kinship modelling in demography has extended age-structured models (i) to include additional characteristics, or “stages” (multi-state kinship), and (ii) to time-variant situations. A wide variety of population structures can affect kinship networks. However, only one prior model has comprehensively considered such effects, and under specific assumptions relating to the nature of individuals’ stages. As such, the leading multi-state framework for kin is theoretically limited in scope, and moreover, has yet to be implemented under time-variant demographic rates. Generalising kinship models to encompass arbitrary population characteristics and extending them to time-dependent processes remain open challenges in demography. This research proposes a methodology to extend multi-state kinship. We present a model which theoretically accounts for any stage, both in time-variant and time-invariant environments. Drawing from Markov processes, a concise mathematical alternative to existing theory is developed. The benefits of our model are illustrated by an application where we define stages as spatial locations, exemplified by clusters of local authority districts (LADs) in England and Wales. Our results elucidate how spatial distribution – a demographic characteristic ubiquitous across (and between) societies – can affect an individual's network of relatives.
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Accepted/In Press date: 19 February 2025
e-pub ahead of print date: 5 March 2025
Published date: 11 March 2025
Keywords:
Age×stage-structured populations, Kinship, Markov process, Mathematical demography, Matrix projections
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Local EPrints ID: 499728
URI: http://eprints.soton.ac.uk/id/eprint/499728
PURE UUID: a42ac300-8ed7-4e82-a439-94a101b29196
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Date deposited: 01 Apr 2025 16:45
Last modified: 22 Aug 2025 02:40
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Author:
Joe W.B. Butterick
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