F.34. seg
This module implements a data type
seg
for
representing line segments, or floating point intervals.
seg
can represent uncertainty in the interval endpoints,
making it especially useful for representing laboratory measurements.
This module is considered
"
trusted
"
, that is, it can be
installed by nonsuperusers who have
CREATE
privilege
on the current database.
F.34.1. Rationale
The geometry of measurements is usually more complex than that of a point in a numeric continuum. A measurement is usually a segment of that continuum with somewhat fuzzy limits. The measurements come out as intervals because of uncertainty and randomness, as well as because the value being measured may naturally be an interval indicating some condition, such as the temperature range of stability of a protein.
Using just common sense, it appears more convenient to store such data as intervals, rather than pairs of numbers. In practice, it even turns out more efficient in most applications.
Further along the line of common sense, the fuzziness of the limits suggests that the use of traditional numeric data types leads to a certain loss of information. Consider this: your instrument reads 6.50, and you input this reading into the database. What do you get when you fetch it? Watch:
test=> select 6.50 :: float8 as "pH"; pH  6.5 (1 row)
In the world of measurements, 6.50 is not the same as 6.5. It may sometimes be critically different. The experimenters usually write down (and publish) the digits they trust. 6.50 is actually a fuzzy interval contained within a bigger and even fuzzier interval, 6.5, with their center points being (probably) the only common feature they share. We definitely do not want such different data items to appear the same.
Conclusion? It is nice to have a special data type that can record the limits of an interval with arbitrarily variable precision. Variable in the sense that each data element records its own precision.
Check this out:
test=> select '6.25 .. 6.50'::seg as "pH"; pH  6.25 .. 6.50 (1 row)
F.34.2. Syntax
The external representation of an interval is formed using one or two
floatingpoint numbers joined by the range operator (
..
or
...
). Alternatively, it can be specified as a
center point plus or minus a deviation.
Optional certainty indicators (
<
,
>
or
~
) can be stored as well.
(Certainty indicators are ignored by all the builtin operators, however.)
Table F.26
gives an overview of allowed
representations;
Table F.27
shows some
examples.
In
Table F.26
,
x
,
y
, and
delta
denote
floatingpoint numbers.
x
and
y
, but
not
delta
, can be preceded by a certainty indicator.
Table F.26.
seg
External Representations

Single value (zerolength interval) 

Interval from
x
to
y


Interval from
x

delta
to
x
+
delta


Open interval with lower bound
x

..

Open interval with upper bound
x

Table F.27. Examples of Valid
seg
Input
5.0

Creates a zerolength segment (a point, if you will) 
~5.0

Creates a zerolength segment and records
~
in the data.
~
is ignored
by
seg
operations, but
is preserved as a comment.

<5.0

Creates a point at 5.0.
<
is ignored but
is preserved as a comment.

>5.0

Creates a point at 5.0.
>
is ignored but
is preserved as a comment.

5(+)0.3

Creates an interval
4.7 .. 5.3
.
Note that the
(+)
notation isn't preserved.

50 ..

Everything that is greater than or equal to 50 
.. 0

Everything that is less than or equal to 0 
1.5e2 .. 2E2

Creates an interval
0.015 .. 0.02

1 ... 2

The same as
1...2
, or
1 .. 2
,
or
1..2
(spaces around the range operator are ignored)

Because the
...
operator is widely used in data sources, it is allowed
as an alternative spelling of the
..
operator. Unfortunately, this
creates a parsing ambiguity: it is not clear whether the upper bound
in
0...23
is meant to be
23
or
0.23
.
This is resolved by requiring at least one digit before the decimal
point in all numbers in
seg
input.
As a sanity check,
seg
rejects intervals with the lower bound
greater than the upper, for example
5 .. 2
.
F.34.3. Precision
seg
values are stored internally as pairs of 32bit floating point
numbers. This means that numbers with more than 7 significant digits
will be truncated.
Numbers with 7 or fewer significant digits retain their original precision. That is, if your query returns 0.00, you will be sure that the trailing zeroes are not the artifacts of formatting: they reflect the precision of the original data. The number of leading zeroes does not affect precision: the value 0.0067 is considered to have just 2 significant digits.
F.34.4. Usage
The
seg
module includes a GiST index operator class for
seg
values.
The operators supported by the GiST operator class are shown in
Table F.28
.
Table F.28. Seg GiST Operators
Operator Description 

Is the first

Is the first

Does the first

Does the first

Are the two

Do the two

Does the first

Is the first

(Before PostgreSQL 8.2, the containment operators
@>
and
<@
were
respectively called
@
and
~
. 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
data types!)
In addition to the above operators, the usual comparison
operators shown in
Table 9.1
are
available for type
seg
. These operators
first compare (a) to (c),
and if these are equal, compare (b) to (d). That results in
reasonably good sorting in most cases, which is useful if
you want to use ORDER BY with this type.
F.34.5. Notes
For examples of usage, see the regression test
sql/seg.sql
.
The mechanism that converts
(+)
to regular ranges
isn't completely accurate in determining the number of significant digits
for the boundaries. For example, it adds an extra digit to the lower
boundary if the resulting interval includes a power of ten:
postgres=> select '10(+)1'::seg as seg; seg  9.0 .. 11  should be: 9 .. 11
The performance of an Rtree index can largely depend on the initial
order of input values. It may be very helpful to sort the input table
on the
seg
column; see the script
sortsegments.pl
for an example.
F.34.6. Credits
Original author: Gene Selkov, Jr.
<
selkovjr@mcs.anl.gov
>
,
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/ ). 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.