1++ Nonet Singlet-Octet Mixing Angle, Strange Quark Mass, and Strange Quark Condensate

Abstract

Two strategies are taken into account to determine the f1(1420)-f1(1285) mixing angle θ. (i) First, using the Gell-Mann-Okubo mass formula together with the K1(1270)-K1(1400) mixing angle θK1=(-34 13) extracted from the data for B(B K1(1270) γ), B(B K1(1400) γ), B(τ K1(1270) τ), and B(τ K1(1420) τ), gave θ = (23+17-23). (ii) Second, from the study of the ratio for f1(1285) φγ and f1(1285) 0γ branching fractions, we have two-fold solution θ=(19.4+4.5-4.6) or (51.1+4.5-4.6). Combining these two analyses, we thus obtain θ=(19.4+4.5-4.6). We further compute the strange quark mass and strange quark condensate from the analysis of the f1(1420)-f1(1285) mass difference QCD sum rule, where the operator-product-expansion series is up to dimension six and to O(αs3, ms2 αs2) accuracy. Using the average of the recent lattice results and the θ value that we have obtained as inputs, we get <s s>/<u u> =0.41 0.09.