Ergodic theorems in Banach ideals of compact operators

Abstract

Let H be an infinite-dimensional Hilbert space, and let B( H) ( K( H)) be the C*-algebra of bounded (respectively, compact) linear operators in H. Let (E,\|·\|E) be a fully symmetric sequence space. If \sn(x)\n=1∞ are the singular values of x∈ K( H), let CE=\x∈ K( H): \sn(x)\∈ E\ with \|x\| CE=\|\sn(x)\\|E, x∈ CE, be the Banach ideal of compact operators generated by E. We show that the averages An(T)(x)=1n+1Σk = 0n Tk(x) converge uniformly in CE for any positive Dunford-Schwartz operator T and x∈ CE. Besides, if x∈ B( H) K( H), there exists a Dunford-Schwartz operator T such that the sequence \An(T)(x)\ does not converge uniformly. We also show that the averages An(T) converge strongly in ( CE,\|·\| CE) if and only if E is separable and E≠ l1, as sets.