Dominance order
In discrete mathematics, dominance order is a partial order on the set of partitions of a positive integer n that plays an important role in algebraic combinatorics and representation theory, especially in the context of symmetric functions and representation theory of the symmetric group.
Definition
If p = and q = are partitions of n, with the parts arranged in the weakly decreasing order, then p precedes q in the dominance order if for any k ≥ 1, the sum of the k largest parts of p is less than or equal to the sum of the k largest parts of q:In this definition, partitions are extended by appending zero parts at the end as necessary.
Properties of the dominance ordering
- Among the partitions of n, is the smallest and is the largest.
- The dominance ordering implies lexicographical ordering, i.e. if p dominates q and p ≠ q, then for the smallest i such that pi ≠ qi one has pi > qi.
- The poset of partitions of n is linearly ordered if and only if n ≤ 5. It is graded if and only if n ≤ 6. See image at right for an example.
- A partition p covers a partition q if and only if pi = qi + 1, pk = qk − 1, pj = qj for all j ≠ i,''k and either k'' = i + 1 or qi = qk. Starting from the Young diagram of q, the Young diagram of p is obtained from it by first removing the last box of row k and then appending it either to the end of the immediately preceding row k − 1, or to the end of row i < k if the rows i through k of the Young diagram of q all have the same length.
- Every partition p has a conjugate partition p′, whose Young diagram is the transpose of the Young diagram of p. This operation reverses the dominance ordering:
- The dominance ordering determines the inclusions between the Zariski closures of the conjugacy classes of nilpotent matrices.
Lattice structure
The partition p can be recovered from its associated -tuple by applying the step 1 difference, Moreover, the -tuples associated to partitions of n are characterized among all integer sequences of length n + 1 by the following three properties:
- Nondecreasing,
- Concave,
- The initial term is 0 and the final term is n,
For the two partitions p and q in the preceding example, their conjugate partitions are and with meet , which is self-conjugate; therefore, the join of p and q is .
Thomas Brylawski has determined many invariants of the lattice Ln, such as the minimal height and the maximal covering number, and classified the intervals of small length. While Ln is not distributive for n ≥ 7, it shares some properties with distributive lattices: for example, its Möbius function takes on only values 0, 1, −1.
Generalizations
Partitions of n can be graphically represented by Young diagrams on n boxes.Standard Young tableaux are certain ways to fill Young diagrams with numbers, and a partial order on them can be defined in terms of the dominance order on the Young diagrams. For a Young tableau T to dominate another Young tableau S, the shape of T must dominate that of S as a partition, and moreover the same must hold whenever T and S are first truncated to their sub-tableaux containing entries up to a given value k, for each choice of k.
Similarly, there is a dominance order on the set of standard Young bitableaux, which plays a role in the theory of standard monomials.