A Count Probability Cookbook: Spurious Effects and the Scaling Model
Abstract
We study the errors brought by finite volume effects and dilution effects on the practical determination of the count probability distribution function PN(n,L), which is the probability of having N objects in a cell of volume L3 for a set of average number density n. Dilution effects are particularly relevant to the so-called sparse sampling strategy. This work is mainly done in the framework of the scaling model (Balian \& Schaeffer 1989), which assumes that the Q-body correlation functions obey the scaling relation xiQ(K r1,..., K rQ) = K-(Q-1) gamma xiN(r1,..., rQ). We use three synthetic samples as references to perform our analysis: a fractal generated by a Rayleigh-L\'evy random walk with 3.104 objects, a sample dominated by a spherical power-law cluster with 3.104 objects and a cold dark matter (CDM) universe involving 3.105 matter particles.
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