**For a better version of the stars vignettes see** https://r-spatial.github.io/stars/articles/

This vignette explains the data model of `stars`

objects,
illustrated using artificial and real datasets.

`stars`

objects consist of

- a (possibly empty) named list of arrays, each having named
dimensions (
`dim`

) attribute - an attribute called
`dimensions`

of class`dimensions`

that carries dimension metadata - a class name that includes
`stars`

A `dimensions`

object is a named list of
`dimension`

elements, each describing the semantics a
dimension of the data arrays (space, time, type etc). In addition to
that, a `dimensions`

object has an attribute called
`raster`

of class `stars_raster`

, which is a named
list with three elements:

`dimensions`

length 2 character; the dimension names that constitute a spatial raster (or NA)`affine`

length 2 numeric; the two affine parameters of the geotransform (or NA)`curvilinear`

a boolean indicating whether a raster is a curvilinear raster (or NA)

The `affine`

and `curvilinear`

values are only
relevant in case of raster data, indicated by `dimensions`

to
have non-NA values.

A `dimension`

object describes a *single*
dimension; it is a list with named elements

`from`

: (numeric length 1): the start index of the array`to`

: (numeric length 1): the end index of the array`offset`

: (numeric length 1): the start coordinate (or time) value of the first pixel (i.e., a pixel/cell boundary)`delta`

: (numeric length 1): the increment, or cell size`refsys`

: (character, or`crs`

): object describing the reference system; e.g. the PROJ string, or string`POSIXct`

or`PCICt`

(for 360 and 365 days/year calendars), or object of class`crs`

(containing both EPSG code and proj4string)`point`

: (logical length 1): boolean indicating whether cells/pixels refer to areas/periods, or to points/instances (may be NA)`values`

: one of`NULL`

(missing),- a vector with coordinate values (numeric,
`POSIXct`

,`PCICt`

, or`sfc`

), - an object of class
`intervals`

(a list with two vectors,`start`

and`end`

, with interval start- and end-values), or - a matrix with longitudes or latitudes for all cells (in case of curvilinear grids)

`from`

and `to`

will usually be 1 and the
dimension size, but `from`

may be larger than 1 in case a
sub-grid got was selected (or cropped).

`offset`

and `delta`

only apply to
*regularly* discretized dimensions, and are `NA`

if
this is not the case. If they are `NA`

, dimension values may
be held in the `values`

field. Rectilinear and curvilinear
grids need grid values in `values`

that can be either:

- for rectilinear grids: irregularly
*spaced*coordinate values, or coordinate*intervals*of irregular width (a rectilinear grid*can*have one dimension that is regular), - for curvilinear grids: or a matrix with grid cell centre values for
*all*row/col combinations (usually in longitude or latitude).

Alternatively, `values`

can contains a set of spatial
geometries encoded in an `sfc`

vector (“list-column”), in
which case we have a vector data
cube.

With a very simple file created from a \(4 \times 5\) matrix

```
suppressPackageStartupMessages(library(stars))
= matrix(1:20, nrow = 5, ncol = 4)
m dim(m) = c(x = 5, y = 4) # named dim
s = st_as_stars(m))
(## stars object with 2 dimensions and 1 attribute
## attribute(s):
## Min. 1st Qu. Median Mean 3rd Qu. Max.
## A1 1 5.75 10.5 10.5 15.25 20
## dimension(s):
## from to offset delta point x/y
## x 1 5 0 1 FALSE [x]
## y 1 4 0 1 FALSE [y]
```

we see that

- the rows (5) are mapped to the first dimension, the x-coordinate
- the columns (4) are mapped to the second dimension, the y-coordinate
- the
`from`

and`to`

fields of each dimension define a range that corresponds to the array dimension:

```
dim(s[[1]])
## x y
## 5 4
```

- offset and delta specify how increasing row and column index maps to x and y coordinate values respectively.

When we plot this object, using the `image`

method for
`stars`

objects,

`image(s, text_values = TRUE, axes = TRUE)`

we see that \((0,0)\) is the origin
of the grid (grid corner), and \(1\)
the coordinate value increase from one index (row, col) to the next. It
means that consecutive matrix columns represent grid lines, going from
south to north. Grids defined this way are **regular**:
grid cell size is constant everywhere.

Many actual grid datasets have y coordinates (grid rows) going from
North to South (top to bottom); this is realised with a negative value
for `delta`

. We see that the grid origing \((0,0)\) did not change:

```
attr(s, "dimensions")[[2]]$delta = -1
image(s, text_values = TRUE, axes = TRUE)
```

An example is the GeoTIFF carried in the package, which, as probably
all data sources read through GDAL, has a negative `delta`

for the `y`

-coordinate:

```
= system.file("tif/L7_ETMs.tif", package = "stars")
tif st_dimensions(read_stars(tif))["y"]
## from to offset delta refsys point
## y 1 352 9120761 -28.5 SIRGAS 2000 / UTM zone 25S FALSE
```

Dimension tables of `stars`

objects carry a
`raster`

attribute:

```
str(attr(st_dimensions(s), "raster"))
## List of 4
## $ affine : num [1:2] 0 0
## $ dimensions : chr [1:2] "x" "y"
## $ curvilinear: logi FALSE
## $ blocksizes : NULL
## - attr(*, "class")= chr "stars_raster"
```

which is a list that holds

`dimensions`

: character, the names of raster dimensions (if any), as opposed to e.g. spectral, temporal or other dimensions`affine`

: numeric, the affine parameters`curvilinear`

: a logical indicating whether the raster is curvilinear

These fields are needed at this level, because they describe
properties of the array at a higher level than individual dimensions do:
a pair of dimensions forms a raster, both `affine`

and
`curvilinear`

describe how x and y *as a pair* are
derived from grid indexes (see below) when this cannot be done on a
per-dimension basis.

With two affine parameters \(a_1\) and \(a_2\), \(x\) and \(y\) coordinates are derived from (1-based) grid indexes \(i\) and \(j\), grid offset values \(o_x\) and \(o_y\), and grid cell sizes \(d_x\) and \(d_y\) by

\[x = o_x + (i-1) d_x + (j-1) a_1\]

\[y = o_y + (i-1) a_2 + (j-1) d_y\] Clearly, when \(a_1=a_2=0\), \(x\) and \(y\) are entirely derived from their respective index, offset and cellsize.

Note that for integer indexes, the coordinates are that of the starting edge of a grid cell; to get the grid cell center of the top left grid cell (in case of a negative \(d_y\)), use \(i=1.5\) and \(j=1.5\).

We can rotate grids by setting \(a_1\) and \(a_2\) to a non-zero value:

```
attr(attr(s, "dimensions"), "raster")$affine = c(0.1, 0.1)
plot(st_as_sf(s, as_points = FALSE), axes = TRUE, nbreaks = 20)
```

The rotation angle, in degrees, is

```
atan2(0.1, 1) * 180 / pi
## [1] 5.710593
```

Sheared grids are obtained when the two rotation coefficients, \(a_1\) and \(a_2\), are unequal:

```
attr(attr(s, "dimensions"), "raster")$affine = c(0.1, 0.2)
plot(st_as_sf(s, as_points = FALSE), axes = TRUE, nbreaks = 20)
```

Now, the y-axis and x-axis have different rotation in degrees of respectively

```
atan2(c(0.1, 0.2), 1) * 180 / pi
## [1] 5.710593 11.309932
```

Rectilinear grids have orthogonal axes, but do not have congruent (equally sized and shaped) cells: each axis has its own irregular subdivision.

We can define a rectilinear grid by specifying the cell
*boundaries*, meaning for every dimension we specify *one
more* value than the dimension size:

```
= c(0, 0.5, 1, 2, 4, 5) # 6 numbers: boundaries!
x = c(0.3, 0.5, 1, 2, 2.2) # 5 numbers: boundaries!
y r = st_as_stars(list(m = m), dimensions = st_dimensions(x = x, y = y)))
(## stars object with 2 dimensions and 1 attribute
## attribute(s):
## Min. 1st Qu. Median Mean 3rd Qu. Max.
## m 1 5.75 10.5 10.5 15.25 20
## dimension(s):
## from to point values x/y
## x 1 5 FALSE [0,0.5),...,[4,5) [x]
## y 1 4 FALSE [0.3,0.5),...,[2,2.2) [y]
st_bbox(r)
## xmin ymin xmax ymax
## 0.0 0.3 5.0 2.2
image(r, axes = TRUE, col = grey((1:20)/20))
```

Would we leave out the last value, than `stars`

may come
up with a *different* cell boundary for the last cell, as this is
now derived from the width of the one-but-last cell:

```
= c(0, 0.5, 1, 2, 4) # 5 numbers: offsets only!
x = c(0.3, 0.5, 1, 2) # 4 numbers: offsets only!
y r = st_as_stars(list(m = m), dimensions = st_dimensions(x = x, y = y)))
(## stars object with 2 dimensions and 1 attribute
## attribute(s):
## Min. 1st Qu. Median Mean 3rd Qu. Max.
## m 1 5.75 10.5 10.5 15.25 20
## dimension(s):
## from to point values x/y
## x 1 5 FALSE [0,0.5),...,[4,6) [x]
## y 1 4 FALSE [0.3,0.5),...,[2,3) [y]
st_bbox(r)
## xmin ymin xmax ymax
## 0.0 0.3 6.0 3.0
```

This is not problematic if cells have a constant width, in which case
the boundaries are reduced to an `offset`

and
`delta`

value, irrespective whether an upper boundary is
given:

```
= c(0, 1, 2, 3, 4) # 5 numbers: offsets only!
x = c(0.5, 1, 1.5, 2) # 4 numbers: offsets only!
y r = st_as_stars(list(m = m), dimensions = st_dimensions(x = x, y = y)))
(## stars object with 2 dimensions and 1 attribute
## attribute(s):
## Min. 1st Qu. Median Mean 3rd Qu. Max.
## m 1 5.75 10.5 10.5 15.25 20
## dimension(s):
## from to offset delta point x/y
## x 1 5 0 1 FALSE [x]
## y 1 4 0.5 0.5 FALSE [y]
st_bbox(r)
## xmin ymin xmax ymax
## 0.0 0.5 5.0 2.5
```

Alternatively, one can also set the *cell midpoints* by
specifying arguments `cell_midpoints`

to the
`st_dimensions`

call:

```
= st_as_stars(matrix(1:9, 3, 3),
x st_dimensions(x = c(1, 2, 3), y = c(2, 3, 10), cell_midpoints = TRUE))
```

When the dimension is regular, this results in `offset`

being shifted back with half a `delta`

, or else in intervals
derived from the distances between cell centers. This should obviously
not be done when cell boundaries are specified.

Curvilinear grids are grids whose grid lines are not straight. Rather than describing the curvature parametrically, the typical (HDF5 or NetCDF) files in which they are found have two raster layers with the longitudes and latitudes for every corresponding pixel of remaining layers.

As an example, we will use a Sentinel 5P dataset available from
package `starsdata`

; this package can be installed with

`install.packages("starsdata", repos = "http://pebesma.staff.ifgi.de", type = "source") `

The dataset is found here:

```
s5p = system.file("sentinel5p/S5P_NRTI_L2__NO2____20180717T120113_20180717T120613_03932_01_010002_20180717T125231.nc", package = "starsdata"))
(## [1] "/home/edzer/R/x86_64-pc-linux-gnu-library/4.0/starsdata/sentinel5p/S5P_NRTI_L2__NO2____20180717T120113_20180717T120613_03932_01_010002_20180717T125231.nc"
```

We can construct the curvilinear `stars`

raster by calling
`read_stars`

on the right sub-array:

```
= gdal_subdatasets(s5p)
subs 6]]
subs[[## [1] "NETCDF:\"/home/edzer/R/x86_64-pc-linux-gnu-library/4.0/starsdata/sentinel5p/S5P_NRTI_L2__NO2____20180717T120113_20180717T120613_03932_01_010002_20180717T125231.nc\":/PRODUCT/nitrogendioxide_tropospheric_column"
```

For this array, we can see the GDAL metadata under item
`GEOLOCATION`

:

```
gdal_metadata(subs[[6]], "GEOLOCATION")
## $LINE_OFFSET
## [1] "0"
##
## $LINE_STEP
## [1] "1"
##
## $PIXEL_OFFSET
## [1] "0"
##
## $PIXEL_STEP
## [1] "1"
##
## $SRS
## [1] "GEOGCS[\"WGS 84\",DATUM[\"WGS_1984\",SPHEROID[\"WGS 84\",6378137,298.257223563,AUTHORITY[\"EPSG\",\"7030\"]],AUTHORITY[\"EPSG\",\"6326\"]],PRIMEM[\"Greenwich\",0,AUTHORITY[\"EPSG\",\"8901\"]],UNIT[\"degree\",0.0174532925199433,AUTHORITY[\"EPSG\",\"9122\"]],AXIS[\"Latitude\",NORTH],AXIS[\"Longitude\",EAST],AUTHORITY[\"EPSG\",\"4326\"]]"
##
## $X_BAND
## [1] "1"
##
## $X_DATASET
## [1] "NETCDF:\"/home/edzer/R/x86_64-pc-linux-gnu-library/4.0/starsdata/sentinel5p/S5P_NRTI_L2__NO2____20180717T120113_20180717T120613_03932_01_010002_20180717T125231.nc\":/PRODUCT/longitude"
##
## $Y_BAND
## [1] "1"
##
## $Y_DATASET
## [1] "NETCDF:\"/home/edzer/R/x86_64-pc-linux-gnu-library/4.0/starsdata/sentinel5p/S5P_NRTI_L2__NO2____20180717T120113_20180717T120613_03932_01_010002_20180717T125231.nc\":/PRODUCT/latitude"
##
## attr(,"class")
## [1] "gdal_metadata"
```

which reveals where, in this dataset, the longitude and latitude arrays are kept.

```
= read_stars(subs[[6]])
nit.c ## Warning in CPL_read_gdal(as.character(x), as.character(options),
## as.character(driver), : GDAL Message 1: The dataset has several variables
## that could be identified as vector fields, but not all share the same primary
## dimension. Consequently they will be ignored.
## Warning in CPL_read_gdal(as.character(x), as.character(options),
## as.character(driver), : GDAL Message 1: The dataset has several variables
## that could be identified as vector fields, but not all share the same primary
## dimension. Consequently they will be ignored.
## Warning in CPL_read_gdal(as.character(x), as.character(options),
## as.character(driver), : GDAL Message 1: The dataset has several variables
## that could be identified as vector fields, but not all share the same primary
## dimension. Consequently they will be ignored.
## Warning in CPL_read_gdal(as.character(x), as.character(options),
## as.character(driver), : GDAL Message 1: The dataset has several variables
## that could be identified as vector fields, but not all share the same primary
## dimension. Consequently they will be ignored.
## Warning in CPL_read_gdal(as.character(x), as.character(options),
## as.character(driver), : GDAL Message 1: The dataset has several variables
## that could be identified as vector fields, but not all share the same primary
## dimension. Consequently they will be ignored.
## Warning in CPL_read_gdal(as.character(x), as.character(options),
## as.character(driver), : GDAL Message 1: The dataset has several variables
## that could be identified as vector fields, but not all share the same primary
## dimension. Consequently they will be ignored.
= units::set_units(9e+36, mol/m^2)
threshold 1]][nit.c[[1]] > threshold] = NA
nit.c[[
nit.c## stars object with 3 dimensions and 1 attribute
## attribute(s):
## Min. 1st Qu.
## nitrogendioxide_tropospheric_c... [mol/m^2] -3.301083e-05 1.868205e-05
## Median Mean
## nitrogendioxide_tropospheric_c... [mol/m^2] 2.622178e-05 2.898976e-05
## 3rd Qu. Max. NA's
## nitrogendioxide_tropospheric_c... [mol/m^2] 3.629641e-05 0.0003924858 330
## dimension(s):
## from to offset refsys values x/y
## x 1 450 NA WGS 84 [450x278] -5.81066 [°],...,30.9468 [°] [x]
## y 1 278 NA WGS 84 [450x278] 28.3605 [°],...,51.4686 [°] [y]
## time 1 1 2018-07-17 UTC POSIXct NULL
## curvilinear grid
```

The curvilinear array has the actual arrays (raster layers, matrices) with longitude and latitude values read in its dimension table. We can plot this file:

```
plot(nit.c, breaks = "equal", reset = FALSE, axes = TRUE, as_points = TRUE,
pch = 16, logz = TRUE, key.length = 1)
## Warning in NextMethod(): NaNs produced
## Warning in plot.sf(x, pal = col, ...): NaNs produced
::map('world', add = TRUE, col = 'red') maps
```

```
plot(nit.c, breaks = "equal", reset = FALSE, axes = TRUE, as_points = FALSE,
border = NA, logz = TRUE, key.length = 1)
## Warning in NextMethod(): NaNs produced
## Warning in plot.sf(x, pal = col, ...): NaNs produced
::map('world', add = TRUE, col = 'red') maps
```

We can downsample the data by

```
nit.c_ds = stars:::st_downsample(nit.c, 8))
(## stars object with 3 dimensions and 1 attribute
## attribute(s):
## Min. 1st Qu.
## nitrogendioxide_tropospheric_c... [mol/m^2] -1.847503e-05 1.85778e-05
## Median Mean
## nitrogendioxide_tropospheric_c... [mol/m^2] 2.700901e-05 2.9113e-05
## 3rd Qu. Max. NA's
## nitrogendioxide_tropospheric_c... [mol/m^2] 3.642568e-05 0.0001363282 32
## dimension(s):
## from to offset refsys values x/y
## x 1 50 NA WGS 84 [50x31] -5.81066 [°],...,30.1405 [°] [x]
## y 1 31 NA WGS 84 [50x31] 28.7828 [°],...,51.4686 [°] [y]
## time 1 1 2018-07-17 UTC POSIXct NULL
## curvilinear grid
plot(nit.c_ds, breaks = "equal", reset = FALSE, axes = TRUE, as_points = TRUE,
pch = 16, logz = TRUE, key.length = 1)
## Warning in NextMethod(): NaNs produced
## Warning in plot.sf(x, pal = col, ...): NaNs produced
::map('world', add = TRUE, col = 'red') maps
```

which doesn’t look nice, but plotting the cells as polygons looks better:

```
plot(nit.c_ds, breaks = "equal", reset = FALSE, axes = TRUE, as_points = FALSE,
border = NA, logz = TRUE, key.length = 1)
## Warning in NextMethod(): NaNs produced
## Warning in plot.sf(x, pal = col, ...): NaNs produced
::map('world', add = TRUE, col = 'red') maps
```

Another approach would be to warp the curvilinear grid to a regular grid, e.g. by

```
= st_warp(nit.c, crs = 4326, cellsize = 0.25)
w ## Warning in transform_grid_grid(st_as_stars(src), st_dimensions(dest),
## threshold): using Euclidean distance measures on geodetic coordinates
plot(w)
```