Point process models for spatio-temporal distance sampling data from a large-scale survey of blue whales
Distance sampling is a widely used method for estimating wildlife population abundance. The fact that conventional distance sampling methods are partly design-based constrains the spatial resolution at which animal density can be estimated using these methods. Estimates are usually obtained at surve...
| Published in: | The Annals of Applied Statistics |
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| Main Authors: | , , , , , , , |
| Format: | Text |
| Language: | English |
| Published: |
The Institute of Mathematical Statistics
2017
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| Subjects: | |
| Online Access: | https://projecteuclid.org/euclid.aoas/1514430286 https://doi.org/10.1214/17-AOAS1078 |
| _version_ | 1821873186443100160 |
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| author | Yuan, Yuan Bachl, Fabian E. Lindgren, Finn Borchers, David L. Illian, Janine B. Buckland, Stephen T. Rue, Håvard Gerrodette, Tim |
| author_facet | Yuan, Yuan Bachl, Fabian E. Lindgren, Finn Borchers, David L. Illian, Janine B. Buckland, Stephen T. Rue, Håvard Gerrodette, Tim |
| author_sort | Yuan, Yuan |
| collection | Project Euclid (Cornell University Library) |
| container_issue | 4 |
| container_title | The Annals of Applied Statistics |
| container_volume | 11 |
| description | Distance sampling is a widely used method for estimating wildlife population abundance. The fact that conventional distance sampling methods are partly design-based constrains the spatial resolution at which animal density can be estimated using these methods. Estimates are usually obtained at survey stratum level. For an endangered species such as the blue whale, it is desirable to estimate density and abundance at a finer spatial scale than stratum. Temporal variation in the spatial structure is also important. We formulate the process generating distance sampling data as a thinned spatial point process and propose model-based inference using a spatial log-Gaussian Cox process. The method adopts a flexible stochastic partial differential equation (SPDE) approach to model spatial structure in density that is not accounted for by explanatory variables, and integrated nested Laplace approximation (INLA) for Bayesian inference. It allows simultaneous fitting of detection and density models and permits prediction of density at an arbitrarily fine scale. We estimate blue whale density in the Eastern Tropical Pacific Ocean from thirteen shipboard surveys conducted over 22 years. We find that higher blue whale density is associated with colder sea surface temperatures in space, and although there is some positive association between density and mean annual temperature, our estimates are consistent with no trend in density across years. Our analysis also indicates that there is substantial spatially structured variation in density that is not explained by available covariates. |
| format | Text |
| genre | Blue whale |
| genre_facet | Blue whale |
| geographic | Laplace Pacific |
| geographic_facet | Laplace Pacific |
| id | ftculeuclid:oai:CULeuclid:euclid.aoas/1514430286 |
| institution | Open Polar |
| language | English |
| long_lat | ENVELOPE(141.467,141.467,-66.782,-66.782) |
| op_collection_id | ftculeuclid |
| op_doi | https://doi.org/10.1214/17-AOAS1078 |
| op_relation | 1932-6157 1941-7330 |
| op_rights | Copyright 2017 Institute of Mathematical Statistics |
| publishDate | 2017 |
| publisher | The Institute of Mathematical Statistics |
| record_format | openpolar |
| spelling | ftculeuclid:oai:CULeuclid:euclid.aoas/1514430286 2025-01-16T21:19:26+00:00 Point process models for spatio-temporal distance sampling data from a large-scale survey of blue whales Yuan, Yuan Bachl, Fabian E. Lindgren, Finn Borchers, David L. Illian, Janine B. Buckland, Stephen T. Rue, Håvard Gerrodette, Tim 2017-12 application/pdf https://projecteuclid.org/euclid.aoas/1514430286 https://doi.org/10.1214/17-AOAS1078 en eng The Institute of Mathematical Statistics 1932-6157 1941-7330 Copyright 2017 Institute of Mathematical Statistics Distance sampling spatio-temporal modeling stochastic partial differential equations INLA spatial point process Text 2017 ftculeuclid https://doi.org/10.1214/17-AOAS1078 2018-10-06T13:09:11Z Distance sampling is a widely used method for estimating wildlife population abundance. The fact that conventional distance sampling methods are partly design-based constrains the spatial resolution at which animal density can be estimated using these methods. Estimates are usually obtained at survey stratum level. For an endangered species such as the blue whale, it is desirable to estimate density and abundance at a finer spatial scale than stratum. Temporal variation in the spatial structure is also important. We formulate the process generating distance sampling data as a thinned spatial point process and propose model-based inference using a spatial log-Gaussian Cox process. The method adopts a flexible stochastic partial differential equation (SPDE) approach to model spatial structure in density that is not accounted for by explanatory variables, and integrated nested Laplace approximation (INLA) for Bayesian inference. It allows simultaneous fitting of detection and density models and permits prediction of density at an arbitrarily fine scale. We estimate blue whale density in the Eastern Tropical Pacific Ocean from thirteen shipboard surveys conducted over 22 years. We find that higher blue whale density is associated with colder sea surface temperatures in space, and although there is some positive association between density and mean annual temperature, our estimates are consistent with no trend in density across years. Our analysis also indicates that there is substantial spatially structured variation in density that is not explained by available covariates. Text Blue whale Project Euclid (Cornell University Library) Laplace ENVELOPE(141.467,141.467,-66.782,-66.782) Pacific The Annals of Applied Statistics 11 4 |
| spellingShingle | Distance sampling spatio-temporal modeling stochastic partial differential equations INLA spatial point process Yuan, Yuan Bachl, Fabian E. Lindgren, Finn Borchers, David L. Illian, Janine B. Buckland, Stephen T. Rue, Håvard Gerrodette, Tim Point process models for spatio-temporal distance sampling data from a large-scale survey of blue whales |
| title | Point process models for spatio-temporal distance sampling data from a large-scale survey of blue whales |
| title_full | Point process models for spatio-temporal distance sampling data from a large-scale survey of blue whales |
| title_fullStr | Point process models for spatio-temporal distance sampling data from a large-scale survey of blue whales |
| title_full_unstemmed | Point process models for spatio-temporal distance sampling data from a large-scale survey of blue whales |
| title_short | Point process models for spatio-temporal distance sampling data from a large-scale survey of blue whales |
| title_sort | point process models for spatio-temporal distance sampling data from a large-scale survey of blue whales |
| topic | Distance sampling spatio-temporal modeling stochastic partial differential equations INLA spatial point process |
| topic_facet | Distance sampling spatio-temporal modeling stochastic partial differential equations INLA spatial point process |
| url | https://projecteuclid.org/euclid.aoas/1514430286 https://doi.org/10.1214/17-AOAS1078 |