Compute the mean integrated squared error,
 or integrated squared bias, or integrated variance,
 of the simulated function estimates in an envelope object.

MISE.envelope

Functionality for exploratory data analysis and nonparametric analysis of
spatial data, mainly spatial point patterns,
in the 'spatstat' family of packages.
(Excludes analysis of spatial data on a linear network,
which is covered by the separate package 'spatstat.linnet'.)
Methods include quadrat counts, K-functions and their simulation envelopes, nearest neighbour distance and empty space statistics, Fry plots, pair correlation function, kernel smoothed intensity, relative risk estimation with cross-validated bandwidth selection, mark correlation functions, segregation indices, mark dependence diagnostics, and kernel estimates of covariate effects. Formal hypothesis tests of random pattern (chi-squared, Kolmogorov-Smirnov, Monte Carlo, Diggle-Cressie-Loosmore-Ford, Dao-Genton, two-stage Monte Carlo) and tests for covariate effects (Cox-Berman-Waller-Lawson, Kolmogorov-Smirnov, ANOVA) are also supported.

Adrian Baddeley

spatstat.explore

Exploratory Data Analysis for the 'spatstat' Family

Rolf Turner

Ege Rubak

Kasper Klitgaard Berthelsen

Warick Brown

Achmad Choiruddin

Ya-Mei Chang

Jean-Francois Coeurjolly

Lucia Cobo Sanchez

Ottmar Cronie

Tilman Davies

Julian Gilbey

Jonatan Gonzalez

Yongtao Guan

Ute Hahn

Martin Hazelton

Kassel Hingee

Abdollah Jalilian

Frederic Lavancier

Marie-Colette van Lieshout

Greg McSwiggan

Robin K Milne

Tuomas Rajala

Suman Rakshit

Dominic Schuhmacher

Rasmus Plenge Waagepetersen

Hangsheng Wang

Tingting Zhan

MISE.envelope function

Mean Integrated Squared Error on an Envelope Object — MISE.envelope

<dl>

 <dt>object</dt>
<dd>Object of class <code>"envelope"</code>
 generated by the function <code>envelope</code></dd>

 <dt>theo</dt>
<dd>Function in the R language that evaluates the
 true (theoretically expected) value of the
 spatial summary function.</dd>

 <dt>domain</dt>
<dd>Numeric vector of length 2 specifying the limits of the
 domain of integration for the integrated squared error.</dd>

 <dt>dimension</dt>
<dd>Integer (either 1 or 2) specifying whether to calculate the
 one-dimensional or two-dimensional integral of squared error.</dd>

</dl>

Arguments

Adrian Baddeley <a href='mailto:Adrian.Baddeley@curtin.edu.au'>Adrian.Baddeley@curtin.edu.au</a>, Martin Hazelton <a href='mailto:Martin.Hazelton@otago.ac.nz'>Martin.Hazelton@otago.ac.nz</a> and Tilman Davies <a href='mailto:Tilman.Davies@otago.ac.nz'>Tilman.Davies@otago.ac.nz</a>.

Author

Mean Integrated Squared Error on an Envelope Object

MISE.envelope: Mean Integrated Squared Error on an Envelope Object

Description

Usage

Arguments

Value

Details

See Also

Examples