Symmetric inverse semigroup

In abstract algebra, the set of all partial injective transformations on a set X forms an inverse semigroup, called the symmetric inverse semigroup (actually a monoid) on X. The conventional notation is ${\displaystyle {\mathcal {I}}_{X}}$^{[citation needed]} or ${\displaystyle {\mathcal {IS}}_{X}}$^[1] In general ${\displaystyle {\mathcal {I}}_{X}}$ is not commutative.

Details about the origin of the symmetric inverse semigroup are available in the discussion on the origins of the inverse semigroup.

When X is a finite set {1, ..., n}, the inverse semigroup of one-one partial transformations is denoted by C_n and its elements are called charts or partial symmetries.^[2] The notion of chart generalizes the notion of permutation. A (famous) example of (sets of) charts are the hypomorphic mapping sets from the reconstruction conjecture in graph theory.^[3]

The cycle notation of classical, group-based permutations generalizes to symmetric inverse semigroups by the addition of a notion called a path, which (unlike a cycle) ends when it reaches the "undefined" element; the notation thus extended is called path notation.^[4]

• Symmetric group

• S. Lipscomb, "Symmetric Inverse Semigroups", AMS Mathematical Surveys and Monographs (1997), ISBN 0-8218-0627-0.
• Olexandr Ganyushkin; Volodymyr Mazorchuk (2008). Classical Finite Transformation Semigroups: An Introduction. Springer Science & Business Media. ISBN 978-1-84800-281-4.

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