Orbits of coanalytic Toeplitz operators and weak hypercyclicity

Abstract

We prove a new criterion of weak hypercyclicity of a bounded linear operator on a Banach space. Applying this criterion, we solve few open questions. Namely, we show that if G is a region of bounded by a smooth Jordan curve such that G does not meet the unit ball but intersects the unit circle in a non-trivial arc, then M* is a weakly hypercyclic operator on H2(G), where M is the multiplication by the argument operator Mf(z)=zf(z). We also prove that if g is a non-constant function from the Hardy space H∞() on the unit disk such that g()= and the set \z∈:|z|=1,\ |g(z)|=1\ is a subset of the unit circle of positive Lebesgue measure, then the coanalytic Toeplitz operator T*g on the Hardy space H2() is weakly hypercyclic. On the contrary, if g()=, |g|>1 almost everywhere on and (|g|-1)∈ L1(), then T*g is not 1-weakly hypercyclic and hence is not weakly hypercyclic (a bounded linear operator T on a complex Banach space X is called n-weakly hypercyclic if there is x∈ X such that for every surjective continuous linear operator S:X n, the set \S(Tmx):m∈\ is dense in n). The last result is based upon lower estimates of the norms of the members of orbits of a coanalytic Toeplitz operator. Finally, we show that there is a 1-weakly hypercyclic operator on a Hilbert space, whose square is non-cyclic and prove that a Banach space operator is weakly hypercyclic if and only if it is n-weakly hypercyclic for every n∈.