On powers of operators with spectrum in cantor sets and spectral synthesis

Abstract

For ∈ ( 0, 12 ), let E be the perfect symmetric set associated with , that is E = \ ( 2i π (1-) Σn = 1+∞ εn n-1 ) : \, εn = 0 or 1 (n ≥ 1) \ and b() = 1 - 221 - 2. Let q≥ 3 be an integer and s be a nonnegative real number. We show that any invertible operator T on a Banach space with spectrum contained in E1/q that satisfies eqnarray* & & \| Tn \| = O ( ns ), \,n → +∞ \\ & and & \| T-n \| = O ( enβ ), \, n → +∞ for some β < b(1/q),eqnarray* also satisfies the stronger property \| T-n \| = O ( ns ), \, n → +∞. We also show that this result is false for E when 1/ is not a Pisot number and that the constant b(1/q) is sharp. As a consequence we prove that, if ω is a submulticative weight such that ω(n)=(1+n)s, \, (n ≥ 0) and C-1 (1+|n|)s ≤ ω(-n) ≤ C enβ,\, (n≥ 0), for some constants C>0 and β < b( 1/q), then E1/q satisfies spectral synthesis in the Beurling algebra of all continuous functions f on the unit circle T such that Σn = -∞+∞ | f(n) | ω (n) < +∞.