Homomorphisms between algebras of holomorphic functions on the infinite polydisk

Abstract

We study the vector-valued spectrum M∞(Bc0,Bc0), that is, the set of non null algebra homomorphisms from H∞(Bc0) to H∞(Bc0) which is naturally projected onto the closed unit ball of H∞(Bc0, ∞), likewise the scalar-valued spectrum M∞(Bc0) which is projected over B_∞. Our itinerary begins in the scalar-valued spectrum M∞(Bc0): by expanding a result by Cole, Gamelin and Johnson (1992) we prove that on each fiber there are 2c disjoint analytic Gleason isometric copies of B_∞. For the vector-valued case, building on the previous result we obtain 2c disjoint analytic Gleason isometric copies of BH∞(Bc0,∞) on each fiber. We also take a look at the relationship between fibers and Gleason parts for both vector-valued spectra Mu,∞(Bc0,Bc0) and M∞(Bc0,Bc0).