MEnvelope: Estimation of the confidence envelope of the M function under its null hypothesis

Description

Simulates point patterns according to the null hypothesis and returns the envelope of M according to the confidence level.

Usage

MEnvelope(X, r, NumberOfSimulations = 100, Alpha = 0.05, ReferenceType, NeighborType, 
          CaseControl = FALSE, SimulationType = "RandomLocation", Global = FALSE)

Arguments

A point pattern (wmppp.object).

A vector of distances. No default value is available.

NumberOfSimulations

The number of simulations to run.

Alpha

The risk level.

ReferenceType

One of the point types.

NeighborType

One of the point types.

CaseControl

Logical; if TRUE, the case-control version of M is computed. ReferenceType points are cases, NeighborType points are controls.

SimulationType

A string describing the null hypothesis to simulate. The null hypothesis may be "RandomLocation": points are redistributed on the actual locations; "RandomLabeling": randomizes point types, keeping locations and weights unchang

Global

Logical; if TRUE, a global envelope sensu Duranton and Overman (2005) is calculated.

Value

An envelope object (envelope). There are methods for print and plot for this class. The fv contains the observed value of the function, its average simulated value and the confidence enveloppe.

Details

This envelope is local by default, that is to say it is computed separately at each distance. See Loosmore and Ford (2006) for a discussion. The global enveloppe is calculated by iteration: the simulations reaching one of the upper or lower values at any distance are eliminated at each step. The process is repeated until Alpha / Number of simulations simulations are dropped. The remaining upper and lower bounds at all distances constitute the global envelope. Interpolation is used if the exact ratio cannot be reached.

References

Duranton, G. and Overman, H. G. (2005). Testing for Localisation Using Micro-Geographic Data. Review of Economic Studies 72(4): 1077-1106. Kenkel, N. C. (1988). Pattern of Self-Thinning in Jack Pine: Testing the Random Mortality Hypothesis. Ecology 69(4): 1017-1024. Loosmore, N. B. and Ford, E. D. (2006). Statistical inference using the G or K point pattern spatial statistics. Ecology 87(8): 1925-1931. Marcon, E. and F. Puech (2012). A typology of distance-based measures of spatial concentration. HAL SHS. 00679993.

Examples

Run this code

data(paracou16)
# Keep only 50% of points to run this example
X <- as.wmppp(rthin(paracou16, 0.5))
plot(X)

# Calculate confidence envelope (should be 1000 simulations, reduced to 4 to save time)
r <- seq(0, 30, 2)
NumberOfSimulations <- 4
Alpha <- .10
plot(MEnvelope(X, r, NumberOfSimulations, Alpha, 
    "V. Americana", "Q. Rosea", FALSE, "RandomLabeling"))

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