fisherfit: Fit Fisher's Logseries and Preston's Lognormal Model to Abundance Data

• The function prestonfit returns an object with fitted coefficients, and with observed (freq) and fitted (fitted) frequencies, and a string describing the fitting method. Function prestondistr omits the entry fitted. The function fisherfit returns the result of nlm, where item estimate is $\alpha$. The result object is amended with the following items:
• df.residualsResidual degrees of freedom.
• nuisanceParameter $x$.
• fisherObserved data from as.fisher.

Function fisherfit estimates the standard error of $\alpha$. However, the confidence limits cannot be directly estimated from the standard errors, but you should use function confint based on profile likelihood. Function confint uses function confint.glm of the MASS package, using profile.fisherfit for the profile likelihood. Function profile.fisherfit follows profile.glm and finds the $\tau$ parameter or signed square root of two times log-Likelihood profile. The profile can be inspected with a plot function which shows the $\tau$ and a dotted line corresponding to the Normal assumption: if standard errors can be directly used in Normal inference these two lines are similar.

Preston (1948) was not satisfied with Fisher's model which seemed to imply infinite species richness, and postulated that rare species is a diminishing class and most species are in the middle of frequency scale. This was achieved by collapsing higher frequency classes into wider and wider ``octaves'' of doubling class limits: 1, 2, 3--4, 5--8, 9--16 etc. occurrences. It seems that Preston regarded frequencies 1, 2, 4, etc.. as tied between octaves (Williamson & Gaston 2005). This means that only half of the species with frequency 1 are shown in the lowest octave, and the rest are transferred to the second octave. Half of the species from the second octave are transferred to the higher one as well, but this is usually not as large a number of species. This practise makes data look more lognormal by reducing the usually high lowest octaves. This can be achieved by setting argument tiesplit = TRUE. With tiesplit = FALSE the frequencies are not split, but all ones are in the lowest octave, all twos in the second, etc. Williamson & Gaston (2005) discuss alternative definitions in detail, and they should be consulted for a critical review of log-Normal model.

Any logseries data will look like lognormal when plotted in Preston's way. The expected frequency $f$ at abundance octave $o$ is defined by $f_o = S_0 \exp(-(\log_2(o) - \mu)^2/2/\sigma^2)$, where $\mu$ is the location of the mode and $\sigma$ the width, both in $\log_2$ scale, and $S_0$ is the expected number of species at mode. The lognormal model is usually truncated on the left so that some rare species are not observed. Function prestonfit fits the truncated lognormal model as a second degree log-polynomial to the octave pooled data using Poisson (when $tiesplit = FALSE$) or quasi-Poisson (when $tiesplit = TRUE$). error. Function prestondistr fits left-truncated Normal distribution to $\log_2$ transformed non-pooled observations with direct maximization of log-likelihood. Function prestondistr is modelled after function fitdistr which can be used for alternative distribution models.

The functions have common print, plot and lines methods. The lines function adds the fitted curve to the octave range with line segments showing the location of the mode and the width (sd) of the response. Function as.preston transforms abundance data to octaves. Argument tiesplit will not influence the fit in prestondistr, but it will influence the barplot of the octaves.

The total extrapolated richness from a fitted Preston model can be found with function veiledspec. The function accepts results both from prestonfit and from prestondistr. If veiledspec is called with a species count vector, it will internally use prestonfit. Function specpool provides alternative ways of estimating the number of unseen species. In fact, Preston's lognormal model seems to be truncated at both ends, and this may be the main reason why its result differ from lognormal models fitted in Rank--Abundance diagrams with functions rad.lognormal.