Weak - * topology

The weak - * - topology is an important topology on the dual space of a normalized (or more generally locally convex ) space. The meaning is based u. a. on the Banach-Alaoglu theorem , according to which the unit sphere in the dual space is compact with respect to this topology . The weak - * - topology plays an important role in many functional analytical constructions, for example in the Gelfand transformation or in the Mackey-Arens theorem , which describes those topologies on a locally convex space that lead to the same topological dual space as the initial topology.

definition

Each element of a normalized or locally convex general - vector space ( here or ) defined by the formula a linear functional on the topological dual space . The weak - * - topology is defined as the weakest topology in which all these pictures ever makes. ${\ displaystyle x}$ ${\ displaystyle \ mathbb {K}}$ ${\ displaystyle E}$ ${\ displaystyle \ mathbb {K}}$ ${\ displaystyle \ mathbb {R}}$ ${\ displaystyle \ mathbb {C}}$ ${\ displaystyle {\ hat {x}} (f): = f (x)}$ ${\ displaystyle E '\,}$ ${\ displaystyle E '\,}$ ${\ displaystyle {\ hat {x}}: E '\ rightarrow \ mathbb {K}}$

A more concrete definition can be obtained by specifying an environment base . For make up the quantities ${\ displaystyle f \ in E '}$

{\ displaystyle U_ {f} (x_ {1}, \ ldots, x_ {n}, \ epsilon): = \ {g \ in E '; | f (x_ {j}) - g (x_ {j}) | <\ epsilon, j = 1, \ ldots, n \}}

,

where , a neighborhood basis weak - * - open sets of f. The weak - * - topology is often referred to with w ^* , after the English term weak - * - topology, or with , to indicate the origin as the initial topology. ${\ displaystyle x_ {1}, \ ldots, x_ {n} \ in E, n \ in {\ mathbb {N}}, \ epsilon> 0}$ ${\ displaystyle \ sigma (E \, ', E)}$

convergence

A sequence in (or more generally a network ) converges in the weak - * topology to if and only if ${\ displaystyle (f_ {n}) _ {n \ in {\ mathbb {N}}}}$ ${\ displaystyle E ^ {\ prime}}$ ${\ displaystyle (f_ {i}) _ {i \ in I}}$ ${\ displaystyle f \ in E ^ {\ prime}}$

{\ displaystyle \ lim _ {n \ to \ infty} f_ {n} (x) = f (x) \ quad ({\ text {or}} \ \ lim _ {i \ in I} f_ {i} (x) = f (x))}

applies to all . That is why the weak - * - topology is also called the topology of point-wise convergence . ${\ displaystyle x \ in E}$

Semi-norms

The dual space with the weak - * - topology is a locally convex space. The weak - * topology can therefore also be defined by specifying a semi-norm system. With form the semi-norms ${\ displaystyle E '}$ ${\ displaystyle x_ {1}, \ ldots, x_ {n} \ in E, n \ in {\ mathbb {N}}}$

{\ displaystyle p_ {x_ {1}, \ ldots, x_ {n}} (f): = \ max \ {| f (x_ {1}) |, \ ldots, | f (x_ {n}) | \ }}

,

such a system.

Product topology

It holds because the Cartesian product on the right is nothing but the set of all functions . Since the weak - * - topology, the topology of pointwise convergence is as described above, it is this as a relative topology of the product topology to describe. ${\ displaystyle \ textstyle E '\ subset \ prod _ {x \ in E} \ mathbb {K} = \ mathbb {K} ^ {E}}$ ${\ displaystyle E \ rightarrow \ mathbb {K}}$ ${\ displaystyle \ textstyle \ prod _ {x \ in E} {\ mathbb {K}}}$

According to Tychonoff's theorem, there is a compact subset for every choice of positive real numbers in the product space . This fact is an essential step in the proof of the Banach-Alaoglu Theorem . ${\ displaystyle \ textstyle \ prod _ {x \ in E} \ {\ lambda \ in {\ mathbb {K}}; \, | \ lambda | \ leq r _ {\ lambda} \}}$ ${\ displaystyle r _ {\ lambda}}$

properties

The weak - * topology makes it a locally convex space . If one forms the strong dual space with regard to this topology , one obtains , or in short ${\ displaystyle \ sigma (E ', E)}$ ${\ displaystyle E '}$ ${\ displaystyle \ {{\ hat {x}}; x \ in E \} \ cong E}$

{\ displaystyle (E ', \ sigma (E', E)) '\ cong E}

.

Probably the most important property in the case of normalized spaces is treated in the Banach-Alaoglu theorem , that is the weak - * - compactness of the unit sphere in the dual space.

The canonical embedding of a Banach space in its bidual space can be viewed as a subspace of . The Hahn-Banach theorem shows that with respect to the weak - * - topology densely located. With the help of the separation theorem , one can show that this tightness relationship is also correct for standardized spaces for the standard spheres , that is, the one that goes back to Herman H. Goldstine applies ${\ displaystyle E}$ ${\ displaystyle E ''}$ ${\ displaystyle E}$ ${\ displaystyle E ''}$ ${\ displaystyle E}$ ${\ displaystyle \ sigma (E '', E ')}$

Goldstine's sentence : lies tightly in .

{\ displaystyle \ {x \ in E; \ | x \ | \ leq 1 \}}

{\ displaystyle \ sigma (E '', E ')}

{\ displaystyle \ {x '' \ in E ''; \ | x '' \ | \ leq 1 \}}

literature

Klaus Floret, Joseph Wloka: Introduction to the theory of locally convex spaces (= Lecture Notes in Mathematics. Vol. 56, ISSN 0075-8434 ). Springer, Berlin et al. 1968.