The one-dimensional (1D) large bipolaron is investigated in the limit
of strong electron-phonon coupling. The nonlinear integro-differential
equation for the bipolaron wave function is solved numerically, from
which we obtained estimates for the main characteristics. An enlargeme
nt of the stability region for the bipolaron ground state is found in
1D as compared to the stability regions in 2D and 3D. The energy of th
e first relaxed excited state (RES) equals the energy of two single po
larons and the ground state in the potential generated by the first RE
S has a. slightly lower energy than this RES and is therefore stable.
The nonlinearity causes the feature that the combination of the ground
state and an excited state of one-particle wave functions could lead
to a higher bipolaron energy than the combination of two excited state
s.