Weak-2-local isometries on uniform algebras and Lipschitz algebras

Abstract

We establish spherical variants of the Gleason-Kahane-Zelazko and Kowalski-Sodkowski theorems, and we apply them to prove that every weak-2-local isometry between two uniform algebras is a linear map. Among the consequences, we solve a couple of problems posed by O. Hatori, T. Miura, H. Oka and H. Takagi in 2007. Another application is given in the setting of weak-2-local isometries between Lipschitz algebras by showing that given two metric spaces E and F such that the set Iso((Lip(E),\|.\|),(Lip(F),\|.\|)) is canonical, then everyevery weak-2-local Iso((Lip(E),\|.\|),(Lip(F),\|.\|))-map from Lip(E) to Lip(F) is a linear map, where \|.\| can indistinctly stand for \|f\|_L := \L(f), \|f\|∞ \ or \|f\|_s := L(f) + \|f\|∞.