Sample and population exponents of generalized Taylor's law

Abstract

Taylor's law (TL) states that the variance V of a non-negative random variable is a power function of its mean M, i.e. V=a Mb. The ubiquitous empirical verification of TL, typically displaying sample exponents b 2, suggests a context-independent mechanism. However, theoretical studies of population dynamics predict a broad range of values of b. Here, we explain this apparent contradiction by using large deviations theory to derive a generalized TL in terms of sample and populations exponents bjk for the scaling of the k-th vs the j-th cumulant (conventional TL is recovered for b=b12), with the sample exponent found to depend predictably on the number of observed samples. Thus, for finite numbers of observations one observes sample exponents bjk k/j (thus b2) independently of population exponents. Empirical analyses on two datasets support our theoretical results.