150px|thumb|048 equals itself when transposed by 4 or 8 or when inverted
In post-tonal music theory, identity is similar to identity in universal algebra. An identity function is a permutation or transformation which transforms a pitch or pitch class set into itself. Generally this requires symmetry. For instance, inverting an augmented triad or C4 interval cycle, 048, produces itself. Performing a retrograde operation upon the tone row 01210 produces 01210. Doubling the length of a rhythm while doubling the tempo produces a rhythm of the same durations as the original.
In addition to being a property of a specific set, identity is, by extension, the "family" of sets or set forms which satisfy a possible identity. These families are defined by symmetry, which means that an object is invariant to any of various transformations; including reflection and rotation.
George Perle provides the following example:
:"C-E, D-F, E-G, are different instances of the same interval [interval-4]...[an] other kind of identity...has to do with axes of symmetry . C-E belongs to a family [sum-4] of symmetrically related dyads as follows:"
{|
|
|
|D
|
|C
|
|C
|
|B
|
|A
|
|A
|
|G
|-
|
|
|D
|
|D
|
|E
|
|F
|
|F
|
|G
|
|G
|-
|
|
|2
|
|1
|
|0
|
|e
|
|9
|
|8
|
|7
|-
| +
|
|<u>2</u>
|
|<u>3</u>
|
|<u>4</u>
|
|<u>5</u>
|
|<u>6</u>
|
|<u>7</u>
|
|<u>8</u>
|-
|
|
|4
|
|4
|
|4
|
|4
|
|4
|
|4
|
|4
|}
C=0, so in mod12, the interval-4 family:
{|
|
|
|C
|
|C
|
|D
|
|D
|
|E
|
|F
|
|F
|
|G
|
|G
|
|A
|
|A
|
|B
|-
|
|
|G
|
|A
|
|A
|
|B
|
|C
|
|C
|
|D
|
|D
|
|E
|
|F
|
|F
|
|G
|-
|
|
|0
|
|1
|
|2
|
|3
|
|4
|
|5
|
|6
|
|7
|
|8
|
|9
|
|t
|
|e
|-
| −
|
|<u>8</u>
|
|<u>9</u>
|
|<u>10</u>
|
|<u>11</u>
|
|<u>0</u>
|
|<u>1</u>
|
|<u>2</u>
|
|<u>3</u>
|
|<u>4</u>
|
|<u>5</u>
|
|<u>6</u>
|
|<u>7</u>
|-
|
|
|4
|
|4
|
|4
|
|4
|
|4
|
|4
|
|4
|
|4
|
|4
|
|4
|
|4
|
|4
|}
Thus, in addition to being part of the sum-4 family, C-E is also a part of the interval-4 family (in contrast to sum families, interval families are based on difference).
See also
- Klumpenhouwer network
- Point reflection
- Derived row
- Twelve-tone technique#Invariance