This module implements a data type
representing multidimensional cubes.
Table F.2 shows the valid external
representations for the
y, etc. denote
Table F.2. Cube External Representations
|A one-dimensional point (or, zero-length one-dimensional interval)|
|Same as above|
|A point in n-dimensional space, represented internally as a zero-volume cube|
|Same as above|
|A one-dimensional interval starting at |
|Same as above|
|An n-dimensional cube represented by a pair of its diagonally opposite corners|
|Same as above|
It does not matter which order the opposite corners of a cube are
entered in. The
automatically swap values if needed to create a uniform
“lower left — upper right” internal representation.
When the corners coincide,
cube stores only one corner
along with an “is point” flag to avoid wasting space.
White space is ignored on input, so
[( is the same as
[ ( .
x ), (
y ) ]
Values are stored internally as 64-bit floating point numbers. This means that numbers with more than about 16 significant digits will be truncated.
Table F.3 shows the operators provided for
Table F.3. Cube Operators
|The cubes a and b are identical.|
|The cubes a and b overlap.|
|The cube a contains the cube b.|
|The cube a is contained in the cube b.|
|The cube a is less than the cube b.|
|The cube a is less than or equal to the cube b.|
|The cube a is greater than the cube b.|
|The cube a is greater than or equal to the cube b.|
|The cube a is not equal to the cube b.|
|Euclidean distance between a and b.|
|Taxicab (L-1 metric) distance between a and b.|
|Chebyshev (L-inf metric) distance between a and b.|
(Before PostgreSQL 8.2, the containment operators
~. These names are still available, but are
deprecated and will eventually be retired. Notice that the old names
are reversed from the convention formerly followed by the core geometric
The scalar ordering operators (
do not make a lot of sense for any practical purpose but sorting. These
operators first compare the first coordinates, and if those are equal,
compare the second coordinates, etc. They exist mainly to support the
b-tree index operator class for
cube, which can be useful for
example if you would like a UNIQUE constraint on a
cube module also provides a GiST index operator class for
cube GiST index can be used to search for values using the
<@ operators in
In addition, a
cube GiST index can be used to find nearest
neighbors using the metric operators
ORDER BY clauses.
For example, the nearest neighbor of the 3-D point (0.5, 0.5, 0.5)
could be found efficiently with:
SELECT c FROM test ORDER BY c <-> cube(array[0.5,0.5,0.5]) LIMIT 1;
~> operator can also be used in this way to
efficiently retrieve the first few values sorted by a selected coordinate.
For example, to get the first few cubes ordered by the first coordinate
(lower left corner) ascending one could use the following query:
SELECT c FROM test ORDER BY c ~> 1 LIMIT 5;
And to get 2-D cubes ordered by the first coordinate of the upper right corner descending:
SELECT c FROM test ORDER BY c ~> 3 DESC LIMIT 5;
Table F.4 shows the available functions.
Table F.4. Cube Functions
|Makes a one dimensional cube with both coordinates the same.||
|Makes a one dimensional cube.||
|Makes a zero-volume cube using the coordinates defined by the array.||
|Makes a cube with upper right and lower left coordinates as defined by the two arrays, which must be of the same length.||
|Makes a new cube by adding a dimension on to an existing cube, with the same values for both endpoints of the new coordinate. This is useful for building cubes piece by piece from calculated values.||
|Makes a new cube by adding a dimension on to an existing cube. This is useful for building cubes piece by piece from calculated values.||
|Returns the number of dimensions of the cube.||
|Returns the ||
|Returns the ||
|Returns true if the cube is a point, that is, the two defining corners are the same.|
|Returns the distance between two cubes. If both cubes are points, this is the normal distance function.|
|Makes a new cube from an existing cube, using a list of dimension indexes from an array. Can be used to extract the endpoints of a single dimension, or to drop dimensions, or to reorder them as desired.||
|Produces the union of two cubes.|
|Produces the intersection of two cubes.|
|Increases the size of the cube by the specified
I believe this union:
select cube_union('(0,5,2),(2,3,1)', '0'); cube_union ------------------- (0, 0, 0),(2, 5, 2) (1 row)
does not contradict common sense, neither does the intersection
select cube_inter('(0,-1),(1,1)', '(-2),(2)'); cube_inter ------------- (0, 0),(1, 0) (1 row)
In all binary operations on differently-dimensioned cubes, I assume the lower-dimensional one to be a Cartesian projection, i. e., having zeroes in place of coordinates omitted in the string representation. The above examples are equivalent to:
The following containment predicate uses the point syntax, while in fact the second argument is internally represented by a box. This syntax makes it unnecessary to define a separate point type and functions for (box,point) predicates.
select cube_contains('(0,0),(1,1)', '0.5,0.5'); cube_contains -------------- t (1 row)
For examples of usage, see the regression test
To make it harder for people to break things, there
is a limit of 100 on the number of dimensions of cubes. This is set
cubedata.h if you need something bigger.
Original author: Gene Selkov, Jr.
Mathematics and Computer Science Division, Argonne National Laboratory.
My thanks are primarily to Prof. Joe Hellerstein (https://dsf.berkeley.edu/jmh/) for elucidating the gist of the GiST (http://gist.cs.berkeley.edu/), and to his former student Andy Dong for his example written for Illustra. I am also grateful to all Postgres developers, present and past, for enabling myself to create my own world and live undisturbed in it. And I would like to acknowledge my gratitude to Argonne Lab and to the U.S. Department of Energy for the years of faithful support of my database research.
Minor updates to this package were made by Bruno Wolff III
<email@example.com> in August/September of 2002. These include
changing the precision from single precision to double precision and adding
some new functions.
Additional updates were made by Joshua Reich
July 2006. These include
cube(float8, float8) and
cleaning up the code to use the V1 call protocol instead of the deprecated