|r.walk(1grass)||GRASS GIS User's Manual||r.walk(1grass)|
r.walk - Creates a raster map showing the anisotropic cumulative cost of moving between different geographic locations on an input raster map whose cell category values represent cost.
raster, cost surface, cumulative costs, cost allocation
r.walk [-knrib] elevation=name friction=name output=name [solver=name] [nearest=name] [outdir=name] [start_points=name] [stop_points=name] [start_raster=name] [start_coordinates=east,north[,east,north,...]] [stop_coordinates=east,north[,east,north,...]] [max_cost=value] [null_cost=value] [memory=memory in MB] [walk_coeff=a,b,c,d] [lambda=float] [slope_factor=float] [--overwrite] [--help] [--verbose] [--quiet] [--ui]
Use the ’Knight’s move’; slower, but more accurate
Keep null values in output raster map
Start with values in raster map
Print info about disk space and memory requirements and exit
Create bitmask encoded directions
Allow output files to overwrite existing files
Print usage summary
Verbose module output
Quiet module output
Force launching GUI dialog
- elevation=name [required]
Name of input elevation raster map
- friction=name [required]
Name of input raster map containing friction costs
- output=name [required]
Name for output raster map to contain walking costs
Name of input raster map solving equal costs
Helper variable to pick a direction if two directions have equal cumulative costs (smaller is better)
Name for output raster map with nearest start point
Name for output raster map to contain movement directions
Name of starting vector points map
Or data source for direct OGR access
Name of stopping vector points map
Or data source for direct OGR access
Name of starting raster points map
Coordinates of starting point(s) (E,N)
Coordinates of stopping point(s) (E,N)
Maximum cumulative cost
Cost assigned to null cells. By default, null cells are excluded
- memory=memory in MB
Maximum memory to be used (in MB)
Cache size for raster rows
Coefficients for walking energy formula parameters a,b,c,d
Lambda coefficients for combining walking energy and friction cost
Slope factor determines travel energy cost per height step
r.walk computes anisotropic cumulative cost of moving between different geographic locations on an input elevation raster map whose cell category values represent elevation combined with an input raster map layer whose cell values represent friction cost.
r.walk outputs 1) a raster map showing the lowest cumulative cost (time) of moving between each cell and the user-specified starting points and 2) a second raster map showing the movement direction to the next cell on the path back to the start point (see Movement Direction). It uses an input elevation raster map whose cell category values represent elevation, combined with a second input raster map whose cell values represent friction costs.
This function is similar to r.cost, but in addition to a friction map, it considers an anisotropic travel time due to the different walking speed associated with downhill and uphill movements.
The formula from Aitken 1977/Langmuir 1984 (based on
Naismith’s rule for walking times) has been used to estimate the cost
parameters of specific slope intervals:
T = a*delta_S + b*delta_H_uphill + c*delta_H_moderate_downhill + d*delta_H_steep_downhill
- T is time of movement in seconds,
- delta S is the horizontal distance covered in meters,
- delta H is the altitude difference in meters.
The a, b, c, d walk_coeff parameters take in account movement speed in the different conditions and are linked to:
- a: time in seconds it takes to walk for 1 meter a flat surface (1/walking speed)
- b: additional walking time in seconds, per meter of elevation gain on uphill slopes
- c: additional walking time in seconds, per meter of elevation loss on moderate downhill slopes (use positive value for decreasing cost)
- d: additional walking time in seconds, per meter of elevation loss on steep downhill slopes (use negative value for increasing cost)
The friction cost parameter represents a time penalty in seconds of additional walking time to cross 1 meter distance.
The lambda parameter is a dimensionless scaling factor of
the friction cost:
total cost = movement time cost + lambda * friction costs * delta_S
For a more accurate result, the "knight’s move"
option can be used (although it is more time consuming). In the diagram
below, the center location (O) represents a grid cell from which cumulative
distances are calculated. Those neighbours marked with an x are always
considered for cumulative cost updates. With the "knight’s
move" option, the neighbours marked with a K are also considered.
K K K x x x K
x O x K x x x K
The minimum cumulative costs are computed using Dijkstra’s algorithm, that find an optimum solution (for more details see r.cost, that uses the same algorithm).
The movement direction surface is created to record the sequence
of movements that created the cost accumulation surface. This movement
direction surface can be used by r.path to recover a path from an end
point back to the start point. The direction of each cell points towards the
next cell. The directions are recorded as degrees CCW from East:
112.5 67.5 i.e. a cell with the value 135 157.5 135 90 45 22.5 means the next cell is to the north-west
180 x 360 202.5 225 270 315 337.5
Once r.walk computes the cumulative cost map as a linear combination of friction cost (from friction map) and the altitude and distance covered (from the digital elevation model), the associated movement direction map can be used by r.path to find the minimum cost path.
r.walk, like most all GRASS raster programs, is also made to be run on maps larger that can fit in available computer memory. As the algorithm works through the dynamic list of cells it can move almost randomly around the entire area. r.walk divides the entire area into a number of pieces and swaps these pieces in and out of memory (to and from disk) as needed. This provides a virtual memory approach optimally designed for 2-D raster maps. The amount of memory to be used by r.walk can be controlled with the memory option, default is 300 MB. For systems with less memory this value will have to be set to a lower value.
We compute a map showing how far a lost person could get from the
point where he or she was last seen while taking into account the topography
g.region swwake_30m -p # create friction map based on land cover r.recode landclass96 out=friction rules=- << EOF 1:3:0.1:0.1 4:5:10.:10. 6:6:1000.0:1000.0 7:7:0.3:0.3 EOF r.walk -k elevation=elev_ned_30m friction=friction output=walkcost \
start_coordinates=635576,216485 lambda=0.5 max=10000 # compute contours on the cost surface to better understand # how far the person can get in certain time (1000 is in seconds) r.contour walkcost output=walkcost step=1000
- Aitken, R. 1977. Wilderness areas in Scotland. Unpublished Ph.D. thesis. University of Aberdeen.
- Steno Fontanari, University of Trento, Italy, Ingegneria per l’Ambiente e il Territorio, 2000-2001. Svilluppo di metodologie GIS per la determinazione dell’accessibilità territoriale come supporto alle decisioni nella gestione ambientale.
- Langmuir, E. 1984. Mountaincraft and leadership. The Scottish Sports Council/MLTB. Cordee, Leicester.
r.cost, r.path, r.in.ascii, r.mapcalc, r.recode, r.out.ascii
Based on r.cost written by :
Antony Awaida, Intelligent Engineering, Systems Laboratory, M.I.T.
James Westervelt, U.S.Army Construction Engineering Research Laboratory
Updated for Grass 5 by Pierre de Mouveaux (firstname.lastname@example.org)
Initial version of r.walk:
Steno Fontanari, 2002
Current version of r.walk:
Franceschetti Simone, Sorrentino Diego, Mussi Fabiano and Pasolli Mattia
Correction by: Fontanari Steno, Napolitano Maurizio and Flor Roberto
In collaboration with: Franchi Matteo, Vaglia Beatrice, Bartucca Luisa, Fava Valentina and Tolotti Mathias, 2004
Updated for GRASS 6.1:
Roberto Flor and Markus Neteler
Updated for GRASS GIS 7:
Multiple path directions sponsored by mundialis
Available at: r.walk source code (history)
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