On the Construction and the Cardinality of Finite σ-Fields

Abstract

In this note, we first discuss some properties of generated σ-fields and a simple approach to the construction of finite σ-fields. It is shown that the σ-field generated by a finite class of σ-distinct sets which are also atoms, is the same as the one generated by the partition induced by them. The range of the cardinality of such a generated σ-field is explicitly obtained. Some typical examples and their complete forms are discussed. We discuss also a simple algorithm to find the exact cardinality of some particular finite σ-fields. Finally, an application of our results to statistics, with regard to independence of events, is pointed out.