Additive uniform structure
of a topological skew-field 
The uniform structure of its additive group. A base of neighbourhoods for the uniform structure of the commutative topological group of 
is formed by the sets 
of all pairs 
such that 
, where 
is an arbitrary neighbourhood of zero. A covering of a topological skew-field 
is uniform for the additive uniform structure if a covering of the type 
refining it can be found, where 
is an arbitrary neighbourhood of zero and 
. In particular, a base of the additive uniform structure of the real line is formed by all coverings by intervals of given fixed length. The real line is the completion of the field of rational numbers with respect to its additive uniform structure.
The uniform structure of the group 
, which is known as its additive uniform structure, is the product of the uniform structures of its factors 
. A base is constituted by all coverings by (open) spheres of a given fixed radius.
Comments
A uniform structure is also called a uniform topology. A base for a uniform structure is also called a uniformity. See also Uniform space.
References
| [a1] | J.R. Isbell, "Uniform spaces" , Amer. Math. Soc. (1964) |
Additive uniform structure. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Additive_uniform_structure&oldid=41767