A remark on embedding of a cylinder on a real commutative Banach algebra

Abstract

Let A be a real commutative Banach algebra with unity. Let a0∈ A\0\. Let Z a0:=\na0\n∈ Z. Then, Z a0 is a discrete subgroup of A. For any n∈ Z, the Frechet derivative of the mapping x \, ∈ \, A \ \ \ \ \ \ x+na0 \, ∈ \, A is the identity map on A and, especially, an A-linear transformation on A. So, the quotient group A/( Z a0) is a 1-dimensional A-manifold and the covering projection x \, ∈ \, A \ \ \ \ \ \ x+ Z a0 \, ∈ \, A/( Z a0) is an A-map. We call A/( Z a0) the 1-dimensional A-cylinder by a0. Let T be a compact Hausdorff space. Suppose that there exist t1∈ T and t2∈ T such that t1=t2 holds. Then, the set C(T; R) of all real-valued continuous functions on T is a real commutative Banach algebra with unity and R \, ⊂neq \, C(T; R) holds. In this paper, we show that there exists a0 \, ∈ \, C(T; R) R such that for any k\, ∈ \, N, the 1-dimensional C(T; R)-cylinder (C(T; R))/( Z a0) by a0 cannot be embedded in the finite direct product space (C(T; R))k as a C(T; R)-submanifold.