a1(1260)-meson longitudinal twist-2 distribution amplitude and the D a1(1260)+ decay processes

Abstract

In the paper, we investigate the moments 2;a1\|;n of the axial-vector a1(1260)-meson distribution amplitude by using the QCD sum rules approach under the background field theory. By considering the vacuum condensates up to dimension-six and the perturbative part up to next-to-leading order QCD corrections, its first five moments at an initial scale μ0=1~ GeV are 2;a1\|;2|μ0 = 0.223 0.029, 2;a1\|;4|μ0 = 0.098 0.008, 2;a1\|;6|μ0 = 0.056 0.006, 2;a1\|;8|μ0 = 0.039 0.004 and 2;a1\|;10|μ0 = 0.028 0.003, respectively. We then construct a light-cone harmonic oscillator model for a1(1260)-meson longitudinal twist-2 distribution amplitude φ2;a1\|(x,μ), whose model parameters are fitted by using the least squares method. As an application of φ2;a1\|(x,μ), we calculate the transition form factors (TFFs) of D a1(1260) in large and intermediate momentum transfers by using the QCD light-cone sum rules approach. At the largest recoil point (q2=0), we obtain A(0) = 0.130 - 0.013 + 0.015, V1(0) = 1.898-0.121+0.128, V2(0) = 0.228-0.021 + 0.020, and V0(0) = 0.217 - 0.025 + 0.023. By applying the extrapolated TFFs to the semi-leptonic decay D0(+) a1-(0)(1260)+, we obtain B(D0 a1-(1260) e+e) = (5.261-0.639+0.745) × 10-5, B(D+ a10(1260) e+e) = (6.673-0.811+0.947) × 10-5, B(D0 a1-(1260) μ+ μ)=(4.732-0.590+0.685) × 10-5, B(D+ a10(1260) μ+ μ)=(6.002-0.748+0.796) × 10-5.