dodgr
is an R package for efficient calculation of many-to-many
pairwise distances on dual-weighted directed graphs, for aggregation of
flows throughout networks, and for highly realistic routing through
street networks (time-based routing considering incline, turn-angles,
surface quality, everything).
Note that most dodgr
algorithms implement parallel computation with
the RcppParallel
library,
and by default use the maximal number of available cores or threads. If
you do not wish dodgr
to use all available threads, please reduce the
number manually by first specifying a value via
RcppParallel::setThreadOptions (numThreads = 1L) # or desired number
Four aspects. First, while other packages exist for calculating
distances on directed graphs, notably igraph
,
even that otherwise fabulous package does not (readily) permit analysis
of dual-weighted graphs. Dual-weighted graphs have two sets of weights
for each edge, so routing can be evaluated with one set of weights,
while distances can be calculated with the other. A canonical example is
a street network, where weighted distances are assigned depending on
mode of transport (for example, weighted distances for pedestrians on
multi-lane vehicular roads are longer than equivalent distances along
isolated walking paths), yet the desired output remains direct,
unweighted distances. Accurate calculation of distances on street
networks requires a dual-weighted representation. In R, dodgr
is
currently the only package that offers this functionality (without
excessive data wrangling).
Second, while igraph
and almost all other
routing packages are primarily designed for one-to-one routing, dodgr
is specifically designed for many-to-many routing, and will generally
outperform equivalent packages in large routing tasks.
Third, dodgr
goes beyond the functionality of comparable packages
through including routines to aggregate flows throughout a network,
through specifying origins, destinations, and flow densities between
each pair of points. Alternatively, flows can be aggregated according to
a network dispersal model from a set of origin points and associated
densities, and a user-specified dispersal model.
Fourth and finally, dodgr
implements highly realistic and
fully-customisable profiles for routing through street networks with
various modes of transport, and using either distance- or time-based
routing. Routing can include such factors as waiting times at traffic
lights, delays for turning across oncoming traffic, access restrictions,
and the effects of elevation on both cyclists and pedestrians. See the
dedicated vignette on street networks and time-based
routing for
more detail.
You can install latest stable version of dodgr
from CRAN with:
install.packages ("dodgr") # current CRAN version
Alternatively, current development versions can be installed using any of the following options:
# install.packages("remotes")
remotes::install_git ("https://git.sr.ht/~mpadge/dodgr")
remotes::install_git ("https://codeberg.org/UrbanAnalyst/dodgr")
remotes::install_bitbucket ("UrbanAnalyst/dodgr")
remotes::install_gitlab ("UrbanAnalyst/dodgr")
remotes::install_github ("UrbanAnalyst/dodgr")
Then load with
library (dodgr)
packageVersion ("dodgr")
#> [1] '0.2.21'
While dodgr
works with any arbitrary networks, it also includes
numerous functions explicitly intended to be applied to geodesic
coordinates, which are identified whenever input data have columns
labelled “longitude” and “latitude”, or similar. Coordinates for such
data must be in the EPSG:4326 (WGS84) coordinate system. dodgr
treats
coordinates as numbers only, and it is up to the user to ensure
appropriate transformation to WGS84 coordinates prior to submitting data
to dodgr
functions.
dodgr
networksTo illustrate functionality, the package includes an example data set
containing the Open Street Map network for Hampi,
India (a
primarily pedestrian village in the middle of a large World Heritage
zone). These data are in Simple Features
(sf
) format, as a collection
of LINESTRING
objects. dodgr
represents networks as a simple
rectangular graph, with each row representing an edge segment between
two points or vertices. sf
-format objects can be converted to
equivalent dodgr
representations with the weight_streetnet()
function:
class (hampi)
#> [1] "sf" "data.frame"
dim (hampi)
#> [1] 236 15
graph <- weight_streetnet (hampi, wt_profile = "foot")
class (graph)
#> [1] "data.frame" "dodgr_streetnet"
dim (graph)
#> [1] 6813 15
The sf
-format network contained 236 LINESTRING
objects, with the
weight_streetnet()
function decomposing these into 6,813 distinct
edges, indicating that the sf
representation had around 29 edges or
segments in each LINESTRING
object. The dodgr
network then looks
like this:
head (graph)
geom_num | edge_id | from_id | from_lon | from_lat | to_id | to_lon | to_lat | d | d_weighted | highway | way_id | component | time | time_weighted |
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
1 | 1 | 339318500 | 76.47491 | 15.34167 | 339318502 | 76.47612 | 15.34173 | 130.000241 | 130.000241 | path | 28565950 | 1 | 93.600174 | 93.600174 |
1 | 2 | 339318502 | 76.47612 | 15.34173 | 339318500 | 76.47491 | 15.34167 | 130.000241 | 130.000241 | path | 28565950 | 1 | 93.600174 | 93.600174 |
1 | 3 | 339318502 | 76.47612 | 15.34173 | 2398958028 | 76.47621 | 15.34174 | 8.890622 | 8.890622 | path | 28565950 | 1 | 6.401248 | 6.401248 |
1 | 4 | 2398958028 | 76.47621 | 15.34174 | 339318502 | 76.47612 | 15.34173 | 8.890622 | 8.890622 | path | 28565950 | 1 | 6.401248 | 6.401248 |
1 | 5 | 2398958028 | 76.47621 | 15.34174 | 1427116077 | 76.47628 | 15.34179 | 9.307736 | 9.307736 | path | 28565950 | 1 | 6.701570 | 6.701570 |
1 | 6 | 1427116077 | 76.47628 | 15.34179 | 2398958028 | 76.47621 | 15.34174 | 9.307736 | 9.307736 | path | 28565950 | 1 | 6.701570 | 6.701570 |
The geom_num
column maps directly onto the sequence of LINESTRING
objects within the sf
-formatted data. The highway
column is taken
directly from Open Street Map, and denotes the kind of “highway”
represented by each edge. The component
column is an integer value
describing which of the connected components of the network each edge
belongs to (with 1
always being the largest component; 2
the second
largest; and so on).
Note that the d_weighted
values are often greater than the geometric
distances, d
. In the example shown, service
highways are not ideal
for pedestrians, and so weighted distances are slightly greater than
actual distances. Compare this with:
head (graph [graph$highway == "path", ])
geom_num | edge_id | from_id | from_lon | from_lat | to_id | to_lon | to_lat | d | d_weighted | highway | way_id | component | time | time_weighted |
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
1 | 1 | 339318500 | 76.47491 | 15.34167 | 339318502 | 76.47612 | 15.34173 | 130.000241 | 130.000241 | path | 28565950 | 1 | 93.600174 | 93.600174 |
1 | 2 | 339318502 | 76.47612 | 15.34173 | 339318500 | 76.47491 | 15.34167 | 130.000241 | 130.000241 | path | 28565950 | 1 | 93.600174 | 93.600174 |
1 | 3 | 339318502 | 76.47612 | 15.34173 | 2398958028 | 76.47621 | 15.34174 | 8.890622 | 8.890622 | path | 28565950 | 1 | 6.401248 | 6.401248 |
1 | 4 | 2398958028 | 76.47621 | 15.34174 | 339318502 | 76.47612 | 15.34173 | 8.890622 | 8.890622 | path | 28565950 | 1 | 6.401248 | 6.401248 |
1 | 5 | 2398958028 | 76.47621 | 15.34174 | 1427116077 | 76.47628 | 15.34179 | 9.307736 | 9.307736 | path | 28565950 | 1 | 6.701570 | 6.701570 |
1 | 6 | 1427116077 | 76.47628 | 15.34179 | 2398958028 | 76.47621 | 15.34174 | 9.307736 | 9.307736 | path | 28565950 | 1 | 6.701570 | 6.701570 |
A "path"
offers ideal walking conditions, and so weighted distances
are equal to actual distances.
The many-to-many nature of dodgr
means that the function to calculate
distances,
dodgr_distances()
or, for street networks, times,
dodgr_times()
,
accepts two vectors or matrices of routing points as inputs (describing
origins and destinations), and returns a corresponding matrix of
pairwise distances. If an input graph has columns for both distances and
weighted distances, and/or times and weighted times, the weighted
versions are used to determine the effectively shortest or fastest
routes through a network, while actual distances or times are summed
along the routes to calculate final values. It is of course also
possible to calculate distances along fastest routes, times along
shortest routes, or any combination thereof, as detailed in the package
vignette on street networks and time-based
routing.
Routing points can, for example, be randomly selected from the vertices
of a graph. The vertices can in turn be extracted with the
dodgr_vertices()
function:
v <- dodgr_vertices (graph)
head (v)
id | x | y | component | n | |
---|---|---|---|---|---|
1 | 339318500 | 76.47491 | 15.34167 | 1 | 0 |
2 | 339318502 | 76.47612 | 15.34173 | 1 | 1 |
4 | 2398958028 | 76.47621 | 15.34174 | 1 | 2 |
6 | 1427116077 | 76.47628 | 15.34179 | 1 | 3 |
8 | 7799710916 | 76.47634 | 15.34184 | 1 | 4 |
10 | 339318503 | 76.47641 | 15.34190 | 1 | 5 |
For OSM data extracted with the osmdata
package (or, equivalently, via
the dodgr::dodgr_streetnet()
function), each object (vertices, ways,
and high-level relations between these objects) is assigned a unique
identifying number. These are retained both in osmdata
and dodgr
, as
the way_id
column in the above graph
, and as the id
column in the
vertices. Random vertices may be generated in this case through
selecting id
values:
from <- sample (v$id, size = 20)
to <- sample (v$id, size = 50)
d <- dodgr_dists (graph = graph, from = from, to = to)
dim (d)
#> [1] 20 50
Alternatively, the points may be specified as matrices of geographic coordinates:
from_x <- min (graph$from_lon) + runif (20) * diff (range (graph$from_lon))
from_y <- min (graph$from_lat) + runif (20) * diff (range (graph$from_lat))
to_x <- min (graph$from_lon) + runif (50) * diff (range (graph$from_lon))
to_y <- min (graph$from_lat) + runif (50) * diff (range (graph$from_lat))
d <- dodgr_dists (graph = graph, from = cbind (from_x, from_y), to = cbind (to_x, to_y))
In this case, the random points will be mapped on to the nearest points on the street network. This may, of course, map some points onto minor, disconnected components of the graph. This can be controlled either by reducing the graph to it’s largest connected component only:
graph <- graph [graph$component == 1, ]
nrow (graph)
or by explicitly using the match_points_to_verts()
function with the
option connected = TRUE
:
from <- match_points_to_verts (v, cbind (from_x, from_y), connected = TRUE)
to <- match_points_to_verts (v, cbind (to_x, to_y), connected = TRUE)
This function returns an index into the result of dodgr_vertices
, and
so points to use for routing must then be extracted as follows:
from <- v$id [from] # or from <- v [from, c ("x", "y")]
to <- v$id [to]
d <- dodgr_dists (graph = graph, from = from, to = to)
Flow aggregation refers to the procedure of routing along multiple ways
according to specified densities of flow between defined origin and
destination points, and aggregating flows along each edge of the
network. The procedure is functionally similar to the above procedure
for distances, with the addition of a matrix specifying pairwise flow
densities between the input set of origin (from
) and destination
(to
) points. The following example illustrates use with a random “flow
matrix”:
flows <- array (runif (length (from) * length (to)), dim = c (length (from), length (to)))
length (from)
#> [1] 20
length (to)
#> [1] 50
dim (flows)
#> [1] 20 50
f <- dodgr_flows_aggregate (graph = graph, from = from, to = to, flows = flows)
The result is simply the input graph
with an additional column
quantifying the aggregate flows along each edge:
head (f)
geom_num | edge_id | from_id | from_lon | from_lat | to_id | to_lon | to_lat | d | d_weighted | highway | way_id | component | time | time_weighted | flow |
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
1 | 1 | 339318500 | 76.47491 | 15.34167 | 339318502 | 76.47612 | 15.34173 | 130.000241 | 130.000241 | path | 28565950 | 1 | 93.600174 | 93.600174 | 0.5815996 |
1 | 2 | 339318502 | 76.47612 | 15.34173 | 339318500 | 76.47491 | 15.34167 | 130.000241 | 130.000241 | path | 28565950 | 1 | 93.600174 | 93.600174 | 2.3630118 |
1 | 3 | 339318502 | 76.47612 | 15.34173 | 2398958028 | 76.47621 | 15.34174 | 8.890622 | 8.890622 | path | 28565950 | 1 | 6.401248 | 6.401248 | 0.5815996 |
1 | 4 | 2398958028 | 76.47621 | 15.34174 | 339318502 | 76.47612 | 15.34173 | 8.890622 | 8.890622 | path | 28565950 | 1 | 6.401248 | 6.401248 | 2.3630118 |
1 | 5 | 2398958028 | 76.47621 | 15.34174 | 1427116077 | 76.47628 | 15.34179 | 9.307736 | 9.307736 | path | 28565950 | 1 | 6.701570 | 6.701570 | 0.5815996 |
1 | 6 | 1427116077 | 76.47628 | 15.34179 | 2398958028 | 76.47621 | 15.34174 | 9.307736 | 9.307736 | path | 28565950 | 1 | 6.701570 | 6.701570 | 2.3630118 |
An additional flow aggregation function can be applied in cases where only densities at origin points are known, and movement throughout a graph is dispersive:
f <- dodgr_flows_disperse (graph = graph, from = from, dens = runif (length (from)))
For more detail, see the main package vignette, and the second vignette on street networks and time-based routing
All contributions to this project are gratefully acknowledged using the allcontributors
package following the all-contributors specification. Contributions of any kind are welcome!
mpadge |
karpfen |
Robinlovelace |
agila5 |
JimShady |
DavisVaughan |
layik |
olivroy |
virgesmith |
richardellison |
coatless |
znmeb |
yihui |
MartinLHazelton |