On the solubility of transcendental equations in commutative C*-algebras
Abstract
It is known that C(X) is algebraically closed if X is a locally connected, hereditarily unicoherent compact Hausdorff space. For such spaces, we prove that if F:C(X) C(X) is given by an everywhere convergent power series with coefficients in C(X) and satisfies certain restrictions, then it has a root in C(X). Our results generalizes the monic algebraic case.
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