Orbits of the Backward Shifts with limit points

Abstract

We show that the bilateral backward shift on p(Z,ω) that has a projective orbit with a non-zero limit point is supercyclic. This phenomenon holds also for -supercyclicity, which extends a result obtained for the first time by Chan and Seceleanu. Moreover, we show that if K is a compact subset of p(N,ω) such that its orbit under the unilateral backward shift B on p(N,ω) has a non-zero weak limit point, then B is hypercyclic.