v.class.1grass

Langue: en

Autres versions - même langue

Version: 262521 (debian - 07/07/09)

Section: 1 (Commandes utilisateur)

NAME

v.class - Classifies attribute data, e.g. for thematic mapping

KEYWORDS

vector, statistics

SYNOPSIS

v.class
v.class help
v.class [-g] map=name [layer=integer] column=string [where=sql_query] algorithm=string nbclasses=integer [--verbose] [--quiet]

Flags:

-g

Print only class breaks (without min and max)
--verbose

Verbose module output
--quiet

Quiet module output

Parameters:

map=name

Name of input vector map
layer=integer

Layer number
A single vector map can be connected to multiple database tables. This number determines which table to use.
Default: 1
column=string

Column name or expression
where=sql_query

WHERE conditions of SQL statement without 'where' keyword
Example: income = 10000
algorithm=string

Algorithm to use for classification
Options: int,std,qua,equ,dis
int: simple intervals
std: standard deviations
qua: quantiles
equ: equiprobable (normal distribution)
nbclasses=integer

Number of classes to define

DESCRIPTION

v.class classifies vector attribute data into classes, for example for thematic mapping. Classification can be on a column or on an expression including several columns, all in the table linked to the vector map. The user indicates the number of classes desired and the algorithm to use for classification. Several algorithms are implemented for classification: equal interval, standard deviation, quantiles, equal probabilities, and a discontinuities algorithm developed by Jean-Pierre Grimmeau at the Free University of Brussels (ULB). It can be used to pipe class breaks into thematic mapping modules such as d.thematic.area (see example below);

NOTES

The equal interval algorithm simply divides the range max-min by the number of breaks to determine the interval between class breaks.

The quantiles algorithm creates classes which all contain approximately the same number of observations.

The standard deviations algorithm creates class breaks which are a combination of the mean +/- the standard deviation. It calculates a scale factor (<1) by which to multiply the standard deviation in order for all of the class breaks to fall into the range min-max of the data values.

The equiprobabilites algorithm creates classes that would be equiprobable if the distribution was normal. If some of the class breaks fall outside the range min-max of the data values, the algorithm prints a warning and reduces the number of breaks, but the probabilities used are those of the number of breaks asked for.

The discont algorithm systematically searches discontinuities in the slope of the cumulated frequencies curve, by approximating this curve through straight line segments whose vertices define the class breaks. The first approximation is a straight line which links the two end nodes of the curve. This line is then replaced by a two-segmented polyline whose central node is the point on the curve which is farthest from the preceding straight line. The point on the curve furthest from this new polyline is then chosen as a new node to create break up one of the two preceding segments, and so forth. The problem of the difference in terms of units between the two axes is solved by rescaling both amplitudes to an interval between 0 and 1. In the original algorithm, the process is stopped when the difference between the slopes of the two new segments is no longer significant (alpha = 0.05). As the slope is the ratio between the frequency and the amplitude of the corresponding interval, i.e. its density, this effectively tests whether the frequencies of the two newly proposed classes are different from those obtained by simply distributing the sum of their frequencies amongst them in proportion to the class amplitudes. In the GRASS implementation, the algorithm continues, but a warning is printed.

EXAMPLE

Classify column pop of map communes into 5 classes using quantiles:
v.class map=communes column=pop algo=qua nbclasses=5
This example uses population and area to calculate a population density and to determine the density classes:
v.class map=communes column=pop/area algo=std nbclasses=5
The following example uses the output of d.class and feeds it directly into d.area.thematic:
d.thematic.area -l map=communes2 data=pop/area breaks=`v.class -g map=communes2 column=pop/area algo=std nbcla=5` colors=0:0:255,50:100:255,255:100:50,255:0:0,156:0:0

SEE ALSO

v.univar d.area.thematic

AUTHOR

Moritz Lennert

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© 2003-2009 GRASS Development Team