Asymptotic Goodness-of-Fit Tests for Point Processes Based on Scaled Empirical K-Functions
Abstract
We study sequences of scaled edge-corrected empirical (generalized) K-functions (modifying Ripley's K-function) each of them constructed from a single observation of a $d$-dimensional fourth-order stationary point process in a sampling window W_n which grows together with some scaling rate unboundedly as n --> infty. Under some natural assumptions it is shown that the normalized difference between scaled empirical and scaled theoretical K-function converges weakly to a mean zero Gaussian process with simple covariance function. This result suggests discrepancy measures between empirical and theoretical K-function with known limit distribution which allow to perform goodness-of-fit tests for checking a hypothesized point process based only on its intensity and (generalized) K-function. Similar test statistics are derived for testing the hypothesis that two independent point processes in W_n have the same distribution without explicit knowledge of their intensities and K-functions.
- Publication:
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arXiv e-prints
- Pub Date:
- June 2017
- DOI:
- arXiv:
- arXiv:1706.01074
- Bibcode:
- 2017arXiv170601074H
- Keywords:
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- Mathematics - Statistics Theory;
- Primary: 62 G 10;
- 60 G 55;
- Secondary: 60 F 05;
- 60 F 17
- E-Print:
- 33 pages, 36 references