On Cardinality Of Non Isomorphic Intermediate Rings Of C(X)

Abstract

Let Σ (X) be the collection of subalgebras of C(X) containing C*(X), where X is a Tychonoff space. For any A(X)∈ Σ(X) there is associated a subset A(X) of β X which is an A-analogue of the Hewitt real compactification X of X. For any A(X)∈ Σ(X), let [A(X)] be the class of all B(X)∈ Σ(X) such that A(X)=B(X). We have shown that for first countable non compact real compact space X, [A(X)] contains at least 2c many different subalgebras no two of which are isomorphic.