Sigma-Meson and Confinement Singularity

Abstract

We describe the meson-meson data for the (IJPC=00++) wave at 280≤ s≤ 1900 MeV in two approaches: (i) the K-matrix approach and (ii) the dispersion relation D-matrix method. With a good description of low energy data (at 280≤ s≤ 900 MeV) as well as the data of two-meson transition amplitudes and antiproton-proton annihilation into three pseudoscalar meson states (at 450≤ s≤ 1950 MeV) we have found the positions of the resonance poles: (i) for the σ meson pole: Mσ = (390 35)-i(235 50) MeV; (ii) two poles for the f0(980), on the second sheet (under the ππ cut): MI = (1011 5)-i(35 5) MeV, and on the third sheet (under the ππ and K K cuts), MII = (1035 50)-i(460 50) MeV; for the f0(1370) meson, M= (1285 30)-i(160 20) MeV; for the f0(1500) meson, M = (1488 4)-i(53 5) MeV; for the f0(1790) meson, M = (1775 25)-i(140 15) MeV and for the broad state f0(1200-1600) M=(1540 120)-i(550 70) MeV. Our estimation of the scalar-isoscalar scattering length obtained under different parameterizations and assumptions about the quality of low energy ππ scattering data is a00=(0.215 0.040)μ-1π. We also discuss the idea according to which the σ-meson could be a remnant of the confinement singularity, 1/s2, in a white channel.