Meagre set

Definition

Given a topological space X, a subset A of X is meagre if it can be expressed as the union of countably many nowhere dense subsets of X. Dually, a comeagre set is one whose complement is meagre, or equivalently, the intersection of countably many sets with dense interiors.

A subset B of X is nowhere dense if there is no neighbourhood on which B is dense: for any nonempty open set U in X, there is a nonempty open set V contained in U such that V and B are disjoint.

The complement of a nowhere dense set is a dense set. More precisely, the complement of a nowhere dense set is a set with dense interior. Not every dense set has a nowhere dense complement. The complement of a dense set can have nowhere dense, and dense regions.

Relation to Borel hierarchy

Just as a nowhere dense subset need not be closed, but is always contained in a closed nowhere dense subset (viz, its closure), a meagre set need not be an F_σ set (countable union of closed sets), but is always contained in an F_σ set made from nowhere dense sets (by taking the closure of each set).

Dually, just as the complement of a nowhere dense set need not be open, but has a dense interior (contains a dense open set), a comeagre set need not be a G_δ set (countable intersection of open sets), but contains a dense G_δ set formed from dense open sets.

Terminology

A meagre set is also called a set of first category; a nonmeagre set (that is, a set that is not meagre) is also called a set of second category. Second category does not mean comeagre – a set may be neither meagre nor comeagre (in this case it will be of second category).

Properties

Banach–Mazur game

Meagre sets have a useful alternative characterization in terms of the Banach–Mazur game. If Y is a topological space, W is a family of subsets of Y that have nonempty interiors such that every nonempty open set has a subset in W , and X is any subset of Y , then there is a Banach-Mazur game corresponding to X , Y , W . In the Banach-Mazur game, two players, P 1 and P 2 , alternate choosing successively smaller (in terms of the subset relation) elements of W to produce a descending sequence W 1 ⊃ W 2 ⊃ W 3 ⊃ ⋯ . If the intersection of this sequence contains a point in X , P 1 wins; otherwise, P 2 wins. If W is any family of sets meeting the above criteria, then P 2 has a winning strategy if and only if X is meagre.

Subsets of the reals

Function spaces