Critical points on growth curves in autoregressive and mixed models

Autores

  • Sheila Zambello de Pinho São Paulo State University; IBB; Dept. of Biostatistics
  • Lídia Raquel de Carvalho São Paulo State University; IBB; Dept. of Biostatistics
  • Martha Maria Mischan São Paulo State University; IBB; Dept. of Biostatistics
  • José Raimundo de Souza Passos São Paulo State University; IBB; Dept. of Biostatistics

DOI:

https://doi.org/10.1590/S0103-90162014000100004

Resumo

Adjusting autoregressive and mixed models to growth data fits discontinuous functions, which makes it difficult to determine critical points. In this study we propose a new approach to determine the critical stability point of cattle growth using a first-order autoregressive model and a mixed model with random asymptote, using the deterministic portion of the models. Three functions were compared: logistic, Gompertz, and Richards. The Richards autoregressive model yielded the best fit, but the critical growth values were adjusted very early, and for this purpose the Gompertz model was more appropriate.

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Publicado

2014-02-01

Edição

v. 71 n. 1 (2014)

Seção

Modelagem de Biometria e Estatística

Licença

Todo o conteúdo do periódico, exceto onde está identificado, está licenciado sob uma Licença Creative Commons do tipo atribuição BY-NC.

Como Citar

Critical points on growth curves in autoregressive and mixed models . (2014). Scientia Agricola, 71(1), 30-37. https://doi.org/10.1590/S0103-90162014000100004