On the dynamics of a semigroup and its relation with the Riemann Hypothesis
Abstract
The semigroup of weighted composition operators (Wn)n∈ N, defined by Wnf(z)=(1+z+·s +zn)f(zn), acts on the classical Hardy-Hilbert space H2(D), and exhibits intriguing connections with both the Riemann Hypothesis (RH) and the Invariant Subspace Problem (ISP). In this paper, we prove that the adjoint operators Wn, for n≥ 2, are Devaney chaotic, frequently hypercyclic and mixing. In particular, these operators are hypercyclic and discuss connections with the RH and invariant subspaces.
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