We prove that for any dynamical system (X,Σ, m, T), the maximal operator defined by N*f(x)=sup_n(1/n)#{1≦ i:(f(Tⁱx)/i)≧ (1/n)} is almost everywhere finite for f in the Orlicz class Lloglog L(X), extending a result of Assani. As an application, a weighted return times theorem is also proved.

The second author's research was partially supported by NSF Grant DMS-0200703