On some properties of the Bray-Curtis dissimilarity and their ecological meaning
In this paper, we examine some basic properties of the Bray-Curtis dissimilarity as compared with other
distance and dissimilarity functions applied to ecological abundance data. We argue that the ability of
every coefficient to measure species-level contributions is a fundamental requirement. By suggesting an
additive decomposition formula for the Bray-Curtis coefficient we derive a general formula of
dissimilarity, which includes the Canberra distance and the Bray-Curtis dissimilarity as special cases. A
similar general formula is also proposed for the Marczewski-Steinhaus coefficient. Finally, using a
modified version of Dalton’s principle of transfers, we show that the Bray-Curtis coefficient and the cityblock
distance exhibit a linear response to the transfer of species abundances from an abundant plot to a
less abundant plot. At the other extreme, the chord and the Hellinger distances show an irregular and
non-monotonic behavior.