Structure of parton quasi-distributions and their moments

Abstract

We discuss the structure of the parton quasi-distributions (quasi-PDFs) Q(y, P3) outside the "canonical" -1 ≤ y ≤ 1 support region of the usual parton distribution functions (PDFs). Writing the yn moments of Q(y, P3) in terms of the combined xn-2l k2l-moments of the transverse momentum distribution (TMD) F (x,k2), we establish a connection between the large-|y| behavior of Q(y,P3) and large-k2 behavior of F (x,k2). In particular, we show that the 1/k2 hard tail of TMDs in QCD results in a slowly decreasing 1/|y| behavior of quasi-PDFs for large |y| that produces infinite yn moments of Q(y,P3). We also relate the 1/|y| terms with the z32-singulariies of the Ioffe-time pseudo-distributions M (, z32). Converting the operator product expansion for M (, z32) into a matching relation between the quasi-PDF Q(y,P3) and the light-cone PDF f(x, μ2), we demonstrate that there is no contradiction between the infinite values of the yn moments of Q(y,P3) and finite values of the xn moments of f(x, μ2).