** Authors:**
RAHMAT SOLTANI, BAHRAM KHANI ROBATI, KARIM HEDAYATIAN

** Abstract: **
An n-tuple of commuting operators, (T_1,T_2,...,T_n) on
a Hilbert space \cal H is said to be hypercyclic, if there exists a
vector x \in \cal H such that the set {T_1^{k_1} T_2^{k_2}...
T_n^{k_n}x : k_i \geq 0, i=1,2,...n} is dense in \cal H. In this
paper, we give sufficient conditions under which the adjoint of an
n-tuple of a weighted composition operator on a Hilbert space of
analytic functions is hypercyclic.

** Keywords: **
Hypercyclicity, tuples, weighted composition operators

** Full Text:** PDF