Kronecker theorem

Given , , and ; then for any there exist integers , , and , , such that

if and only if for any such that

the number

is also an integer. This theorem was first proved in 1884 by L. Kronecker (see [1]).

Kronecker's theorem is a special case of the following theorem [2], which describes the closure of the subgroup of the torus generated by the elements , : The closure is precisely the set of all classes such that, for any numbers with

one has also

(Cf. [2].) Under the assumptions of Kronecker's theorem, this closure is simply . This means that the subgroup of all elements of the form

where , is dense in , while the subgroup of vectors

where , is dense in . Kronecker's theorem can be derived from the duality theory for commutative topological groups (cf. Topological group), [3].

In the case , Kronecker's theorem becomes the following proposition: A class , where , generates as a topological group if and only if the numbers are linearly independent over the field of rational numbers. In particular, the torus as a topological group is monothetic, i.e. is generated by a single element.

References

Comments

The last statement above can be rephrased as: If are linearly independent over , then the set is dense in . Here denotes the fractional part of (cf. Fractional part of a number). In fact, the set is even uniformly distributed, cf. Uniform distribution.

References