Baire category theorem explained

The Baire category theorem (BCT) is an important result in general topology and functional analysis. The theorem has two forms, each of which gives sufficient conditions for a topological space to be a Baire space (a topological space such that the intersection of countably many dense open sets is still dense). It is used in the proof of results in many areas of analysis and geometry, including some of the fundamental theorems of functional analysis.

and in 1899 by Baire^[1] for Euclidean space

\Rⁿ

. The more general statement for completely metrizable spaces was first shown by Hausdorff in 1914.

Statement

A Baire space is a topological space

in which every countable intersection of open dense sets is dense in

See the corresponding article for a list of equivalent characterizations, as some are more useful than others depending on the application.

(BCT1) Every complete pseudometric space is a Baire space. In particular, every completely metrizable topological space is a Baire space.
(BCT2) Every locally compact regular space is a Baire space. In particular, every locally compact Hausdorff space is a Baire space.

Neither of these statements directly implies the other, since there are complete metric spaces that are not locally compact (the irrational numbers with the metric defined below; also, any Banach space of infinite dimension), and there are locally compact Hausdorff spaces that are not metrizable (for instance, any uncountable product of non-trivial compact Hausdorff spaces is such; also, several function spaces used in functional analysis; the uncountable Fort space).See Steen and Seebach in the references below.

Relation to the axiom of choice

The proof of BCT1 for arbitrary complete metric spaces requires some form of the axiom of choice; and in fact BCT1 is equivalent over ZF to the axiom of dependent choice, a weak form of the axiom of choice.^[2]

\omega^\omega,

the Cantor space

2^\omega,

and a separable Hilbert space such as the

L^p

-space

L^2(\Rⁿ⁾

Uses

BCT1 is used in functional analysis to prove the open mapping theorem, the closed graph theorem and the uniform boundedness principle.

BCT1 also shows that every nonempty complete metric space with no isolated point is uncountable. (If

is a nonempty countable metric space with no isolated point, then each singleton

\{x\}

is nowhere dense, and

is meagre in itself.) In particular, this proves that the set of all real numbers is uncountable.

BCT1 shows that each of the following is a Baire space:

The space

of real numbers

The irrational numbers, with the metric defined by

d(x,y)=\tfrac{1}{n+1},

where

is the first index for which the continued fraction expansions of

and

differ (this is a complete metric space)

The Cantor set

By BCT2, every finite-dimensional Hausdorff manifold is a Baire space, since it is locally compact and Hausdorff. This is so even for non-paracompact (hence nonmetrizable) manifolds such as the long line.

BCT is used to prove Hartogs's theorem, a fundamental result in the theory of several complex variables.

BCT1 is used to prove that a Banach space cannot have countably infinite dimension.

Proof

(BCT1) The following is a standard proof that a complete pseudometric space

is a Baire space.

Let

U_1,U_2,\ldots

be a countable collection of open dense subsets. It remains to show that the intersection

U₁\capU₂\cap\ldots

is dense.A subset is dense if and only if every nonempty open subset intersects it. Thus to show that the intersection is dense, it suffices to show that any nonempty open subset

has some point

in common with all of the

U_n

.Because

U₁

is dense,

intersects

U_1;

consequently, there exists a point

x₁

and a number

0<r₁<1

such that:

\overline\left(x_1, r_1\right) \subseteq W \cap U_1

where

B(x,r)

and

\overline{B}(x,r)

denote an open and closed ball, respectively, centered at

with radius

Since each

U_n

is dense, this construction can be continued recursively to find a pair of sequences

x_n

and

0<r_n<\tfrac{1}{n}

such that:

\overline\left(x_n, r_n\right) \subseteq B\left(x_, r_\right) \cap U_n.

(This step relies on the axiom of choice and the fact that a finite intersection of open sets is open and hence an open ball can be found inside it centered at

x_n

.)The sequence

\left(x_n\right)

is Cauchy because

x_n\inB\left(x_m,r_m\right)

whenever

n>m,

and hence

\left(x_n\right)

converges to some limit

by completeness.If

is a positive integer then

x\in\overline{B}\left(x_n,r_n\right)

(because this set is closed). Thus

x\inW

and

x\inU_n

for all

\blacksquare

There is an alternative proof using Choquet's game.^[3]

(BCT2) The proof that a locally compact regular space

is a Baire space is similar. It uses the facts that (1) in such a space every point has a local base of closed compact neighborhoods; and (2) in a compact space any collection of closed sets with the finite intersection property has nonempty intersection. The result for locally compact Hausdorff spaces is a special case, as such spaces are regular.

References

- Book: Engelking, Ryszard. Ryszard Engelking. General Topology. Heldermann Verlag, Berlin. 1989. 3-88538-006-4.
- Book: Levy, Azriel. Reprinted. 2002. Azriel Levy. Basic Set Theory. First published 1979. Dover. 0-486-42079-5.
  - Book: Steen. Lynn Arthur. Seebach. J. Arthur Jr. Lynn Steen. J. Arthur Seebach Jr.. Counterexamples in Topology. 1978. Springer-Verlag. New York. Reprinted by Dover Publications, New York, 1995. (Dover edition).

External links

Encyclopaedia of Mathematics article on Baire theorem
Web site: Tao. T.. Terence Tao. 245B, Notes 9: The Baire category theorem and its Banach space consequences. 1 February 2009.

Notes and References

Baire. R.. Sur les fonctions de variables réelles. Ann. Di Mat.. 1899. 3. 1–123.
Blair. Charles E.. The Baire category theorem implies the principle of dependent choices. Bull. Acad. Polon. Sci. Sér. Sci. Math. Astron. Phys.. 1977. 25. 10. 933–934.
Web site: Baker. Matt. Real Numbers and Infinite Games, Part II: The Choquet game and the Baire Category Theorem. July 7, 2014.