Searching for linear structures in the failure of the Stone-Weierstrass theorem

Abstract

We investigate the failure of the Stone-Weierstrass theorem focusing on the existence of large dimensional vector spaces within the set C(L, K) A, where L is a compact Hausdorff space and A is a self-adjoint subalgebra of C(L, K) that vanishes nowhere on L but does not necessarily separate the points of L. We address the problem of finding the precise codimension of A in a broad setting, which allows us to describe the lineability of C(L, K) A in detail. Our analysis yields both affirmative and negative results regarding the lineability of this set. Furthermore, we also study the set (C(∂D, C) Pol(∂D)) \0\, where Pol(∂D) is the set of all complex polynomials in one variable restricted to the boundary of the unit disk. Recent lineability properties are also taken into account.

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