Net (of sets in a topological space)
network (of sets in a topological space)
A family 
of subsets of a topological space 
such that for each 
and each neighbourhood 
of 
there is an element 
of 
such that 
.
The family of all one-point subsets of a space and every base of a space are networks. The difference between a network and a base is that the elements of a network need not be open sets. Networks appear under continuous mappings: If 
is a continuous mapping of a topological space 
onto a topological space 
and 
is a base of 
, then the images of the elements of 
under 
form a network 
in 
. Further, if 
is covered by a family 
of subspaces, then, taking for each 
any base 
of 
and amalgamating these bases, a network 
in 
is obtained. Spaces with a countable network are characterized as images of separable metric spaces under continuous mappings.
The minimum cardinality of a network of a space 
is called the network weight, or net weight, of 
and is denoted by 
. The net weight of a space never exceeds its weight (cf. Weight of a topological space), but, as is shown by the example of a countable space without a countable base, the net weight can differ from the weight. For compact Hausdorff spaces the net weight coincides with the weight. This result extends to locally compact spaces, Čech-complete spaces and feathered spaces (cf. Feathered space). Hence, in particular, it follows that weight does not increase under surjective mappings of such spaces. Another corollary: If a feathered space 
(in particular, a Hausdorff compactum) is given as the union of a family of cardinality 
of subspaces, the weight of each of which does not exceed 
, supposed infinite, then the weight of 
does not exceed 
.
References
| [1] | A.V. Arkhangel'skii, V.I. Ponomarev, "Fundamentals of general topology: problems and exercises" , Reidel (1984) (Translated from Russian) |
| [2] | A.V. Arkhangel'skii, "An addition theorem for weights of sets lying in bicompacta" Dokl. Akad. Nauk SSSR , 126 : 2 (1959) pp. 239–241 (In Russian) |
Comments
Most English-language texts (cf. e.g. [a4]) use network for the concept called "net" above. This is because the term "net" also has a second, totally different, meaning in general topology.
A net in a set (topological space) 
is an indexed set 
of points of 
, where 
is a directed set. In Russian this is called a generalized sequence.
One can build a theory of convergence for nets: Moore–Smith convergence (cf. Moore space).
References
| [a1] | R. Engelking, "General topology" , PWN (1977) (Translated from Polish) (Revised and extended version of [3] above) |
| [a2] | J.L. Kelley, "Convergence in topology" Duke Math. J. , 17 (1950) pp. 277–283 |
| [a3] | E.H. Moore, H.L. Smith, "A general theory of limits" Amer. J. Math. , 44 (1922) pp. 102–121 |
| [a4] | J.-I. Nagata, "Modern general topology" , North-Holland (1985) |
Net (of sets in a topological space). Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Net_(of_sets_in_a_topological_space)&oldid=47957