In the branch of

mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...

known as

order theory Order theory is a branch of mathematics that investigates the intuitive notion of order using binary relations. It provides a formal framework for describing statements such as "this is less than that" or "this precedes that". This article intr ...

, a semimodular lattice, is a

lattice Lattice may refer to: Arts and design * Latticework, an ornamental criss-crossed framework, an arrangement of crossing laths or other thin strips of material * Lattice (music), an organized grid model of pitch ratios * Lattice (pastry), an ornam ...

that satisfies the following condition: ;Semimodular law: ''a'' ∧ ''b'' <: ''a'' implies ''b'' <: ''a'' ∨ ''b''. The notation ''a'' <: ''b'' means that ''b'' covers ''a'', i.e. ''a'' < ''b'' and there is no element ''c'' such that ''a'' < ''c'' < ''b''. An atomistic (hence algebraic) semimodular

bounded lattice A lattice is an abstract structure studied in the mathematical subdisciplines of order theory and abstract algebra. It consists of a partially ordered set in which every pair of elements has a unique supremum (also called a least upper boun ...

is called a

matroid lattice In the mathematics of matroids and lattices, a geometric lattice is a finite atomistic semimodular lattice, and a matroid lattice is an atomistic semimodular lattice without the assumption of finiteness. Geometric lattices and matroid lattices, r ...

because such lattices are equivalent to (simple)

matroid In combinatorics, a branch of mathematics, a matroid is a structure that abstracts and generalizes the notion of linear independence in vector spaces. There are many equivalent ways to define a matroid axiomatically, the most significant being ...

s. An atomistic semimodular bounded lattice of finite length is called a

geometric lattice In the mathematics of matroids and lattices, a geometric lattice is a finite atomistic semimodular lattice, and a matroid lattice is an atomistic semimodular lattice without the assumption of finiteness. Geometric lattices and matroid lattices, r ...

and corresponds to a matroid of finite rank. Semimodular lattices are also known as upper semimodular lattices; the

dual Dual or Duals may refer to: Paired/two things * Dual (mathematics), a notion of paired concepts that mirror one another ** Dual (category theory), a formalization of mathematical duality *** see more cases in :Duality theories * Dual (grammatical ...

notion is that of a lower semimodular lattice. A finite lattice is

modular Broadly speaking, modularity is the degree to which a system's components may be separated and recombined, often with the benefit of flexibility and variety in use. The concept of modularity is used primarily to reduce complexity by breaking a sy ...

if and only if it is both upper and lower semimodular. A finite lattice, or more generally a lattice satisfying the

ascending chain condition In mathematics, the ascending chain condition (ACC) and descending chain condition (DCC) are finiteness properties satisfied by some algebraic structures, most importantly ideals in certain commutative rings.Jacobson (2009), p. 142 and 147 These con ...

or the descending chain condition, is semimodular if and only if it is M-symmetric. Some authors refer to M-symmetric lattices as semimodular lattices.For instance Fofanova (2001).

Birkhoff's condition

A lattice is sometimes called weakly semimodular if it satisfies the following condition due to

Garrett Birkhoff Garrett Birkhoff (January 19, 1911 – November 22, 1996) was an American mathematician. He is best known for his work in lattice theory. The mathematician George Birkhoff (1884–1944) was his father. Life The son of the mathematician Geo ...

: ;Birkhoff's condition: If ''a'' ∧ ''b'' <: ''a'' and ''a'' ∧ ''b'' <: ''b'', :then ''a'' <: ''a'' ∨ ''b'' and ''b'' <: ''a'' ∨ ''b''. Every semimodular lattice is weakly semimodular. The converse is true for lattices of finite length, and more generally for upper continuous (meets distribute over joins of chains) relatively atomic lattices.

Mac Lane's condition

The following two conditions are equivalent to each other for all lattices. They were found by

Saunders Mac Lane Saunders Mac Lane (4 August 1909 – 14 April 2005) was an American mathematician who co-founded category theory with Samuel Eilenberg. Early life and education Mac Lane was born in Norwich, Connecticut, near where his family lived in Taftvill ...

, who was looking for a condition that is equivalent to semimodularity for finite lattices, but does not involve the covering relation. ;Mac Lane's condition 1: For any ''a, b, c'' such that ''b'' ∧ ''c'' < ''a'' < ''c'' < ''b'' ∨ ''a'', :there is an element ''d'' such that ''b'' ∧ ''c'' < ''d'' ≤ ''b'' and ''a'' = (''a'' ∨ ''d'') ∧ ''c''. ;Mac Lane's condition 2: For any ''a, b, c'' such that ''b'' ∧ ''c'' < ''a'' < ''c'' < ''b'' ∨ ''c'', :there is an element ''d'' such that ''b'' ∧ ''c'' < ''d'' ≤ ''b'' and ''a'' = (''a'' ∨ ''d'') ∧ ''c''. Every lattice satisfying Mac Lane's condition is semimodular. The converse is true for lattices of finite length, and more generally for relatively atomic lattices. Moreover, every upper continuous lattice satisfying Mac Lane's condition is M-symmetric.

Birkhoff's condition

Mac Lane's condition

Notes

References

External links

See also