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The von Bertalanffy growth function (VBGF), or von Bertalanffy curve, is a type of growth curve model for a time series and is named after Ludwig von Bertalanffy. It is a special case of the generalised logistic function. The growth curve is used to model mean length from age in animals.[1] The function is commonly applied in ecology to model fish growth.[2]

The model can be written as the following:

\( {\displaystyle L(a)=L_{\infty }(1-\exp(-k(a-a_{0})))} \)

where a is age, k is the growth coefficient, \( a_{0} \) is a value used to calculate size when age is zero, and \( L_{\infty } \) is asymptotic size.[3] It is the solution of the following linear differential equation:

\( {\displaystyle {\frac {dL}{da}}=k(L_{\infty }-L)} \)

Seasonally-adjusted von Bertalanffy

The seasonally-adjusted von Bertalanffy is an extension of this function that accounts for organism growth that occurs seasonally. It was created by I. F. Somer in 1988.[4]
See also
Gompertz function

References

Daniel Pauly; G. R. Morgan (1987). Length-based Methods in Fisheries Research. WorldFish. p. 299. ISBN 978-971-10-2228-0.
Food and Agriculture Organization of the United Nations (2005). Management Techniques for Elasmobranch Fisheries. Food & Agriculture Org. p. 93. ISBN 978-92-5-105403-1.
John K. Carlson; Kenneth J. Goldman (5 April 2007). Special Issue: Age and Growth of Chondrichthyan Fishes: New Methods, Techniques and Analysis. Springer Science & Business Media. ISBN 978-1-4020-5570-6.
Somer, I. F. 1988. On a seasonally oscillating growth function. Fishbyte 6(1):8–11.

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