Lisa Madsen scite author profile

Using only spatially and temporally replicated point counts, Royle (2004b, Biometrics 60, 108-115) developed an N-mixture model to estimate the abundance of an animal population when individual animal detection probability is unknown. One assumption inherent in this model is that the animal populations at each sampled location are closed with respect to migration, births, and deaths throughout the study. In the past this has been verified solely by biological arguments related to the study design as no statistical verification was available. In this article, we propose a generalization of the N-mixture model that can be used to formally test the closure assumption. Additionally, when applied to an open metapopulation, the generalized model provides estimates of population dynamics parameters and yields abundance estimates that account for imperfect detection probability and do not require the closure assumption. A simulation study shows these abundance estimates are less biased than the abundance estimate obtained from the original N-mixture model. The proposed model is then applied to two data sets of avian point counts. The first example demonstrates the closure test on a single-season study of Mallards (Anas platyrhynchos), and the second uses the proposed model to estimate the population dynamics parameters and yearly abundance of American robins (Turdus migratorius) from a multi-year study.

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Response of western Oregon (USA) stream temperatures to contemporary forest management

Groom

Dent

Madsen

et al. 2011

Forest Ecology and Management

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Joint Regression Analysis for Discrete Longitudinal Data

Madsen

Yan

2010

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We introduce an approximation to the Gaussian copula likelihood of Song, Li, and Yuan (2009, Biometrics 65, 60-68) used to estimate regression parameters from correlated discrete or mixed bivariate or trivariate outcomes. Our approximation allows estimation of parameters from response vectors of length much larger than three, and is asymptotically equivalent to the Gaussian copula likelihood. We estimate regression parameters from the toenail infection data of De Backer et al. (1996, British Journal of Dermatology 134, 16-17), which consist of binary response vectors of length seven or less from 294 subjects. Although maximizing the Gaussian copula likelihood yields estimators that are asymptotically more efficient than generalized estimating equation (GEE) estimators, our simulation study illustrates that for finite samples, GEE estimators can actually be as much as 20% more efficient.

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GenEst statistical models—A generalized estimator of mortality

Dalthorp¹,

Madsen²,

Huso³

et al. 2018

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Maximum likelihood estimation of regression parameters with spatially dependent discrete data

Madsen

2009

JABES

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Lisa Madsen

Models for Estimating Abundance from Repeated Counts of an Open Metapopulation

Response of western Oregon (USA) stream temperatures to contemporary forest management

Joint Regression Analysis for Discrete Longitudinal Data

GenEst statistical models—A generalized estimator of mortality

Maximum likelihood estimation of regression parameters with spatially dependent discrete data

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