Zero divisors and topological divisors of zero in certain Banach algebras

Abstract

In this paper we prove that an element f∈ A(D) is a topological divisor of zero(TDZ) if and only if there exists z0 ∈ T such that f(z0)=0. We also give a characterization of TDZ in the Banach algebra L∞(μ). Further, we prove that the multiplication operator Mh is a TDZ in B(Lp(μ))~(1≤ p≤∞) if and only if h is a TDZ in L∞(μ). Subsequently, we show that a composition operator Cφ is a TDZ in B(L2(μ)) if and only if dμ φ-1dμ is a TDZ in L∞(μ). Lastly, we determine composition operators on the Hardy spaces Hp(D) and p spaces which are zero-divisors.