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Estimating the J function without edge correction

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  • A. J. Baddeley
  • M. Kerscher
  • K. Schladitz
  • B. T. Scott

Abstract

The interaction between points in a spatial point process can be measured by its empty space function F, its nearest‐neighbour distance distribution function G, and by combinations such as the J function J = (1 −G)/(1 −F). The estimation of these functions is hampered by edge effects: the uncorrected, empirical distributions of distances observed in a bounded sampling window W give severely biased estimates of F and G. However, in this paper we show that the corresponding uncorrected estimator of the function J = (1 −G)/(1 −F) is approximately unbiased for the Poisson case, and is useful as a summary statistic. Specifically, consider the estimate ?W of J computed from uncorrected estimates of F and G. The function JW(r), estimated by ?W, possesses similar properties to the J function, for example JW(r) is identically 1 for Poisson processes. This enables direct interpretation of uncorrected estimates of J, something not possible with uncorrected estimates of either F, G or K. We propose a Monte Carlo test for complete spatial randomness based on testing whether JW(r) ≡ 1. Computer simulations suggest this test is at least as powerful as tests based on edge corrected estimators of J.

Suggested Citation

  • A. J. Baddeley & M. Kerscher & K. Schladitz & B. T. Scott, 2000. "Estimating the J function without edge correction," Statistica Neerlandica, Netherlands Society for Statistics and Operations Research, vol. 54(3), pages 315-328, November.
  • Handle: RePEc:bla:stanee:v:54:y:2000:i:3:p:315-328
    DOI: 10.1111/1467-9574.00143
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    Cited by:

    1. M. Lieshout, 2006. "A J-Function for Marked Point Patterns," Annals of the Institute of Statistical Mathematics, Springer;The Institute of Statistical Mathematics, vol. 58(2), pages 235-259, June.

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