MEAN-FIELD THEORY FOR THE SPIN-LADDER SYSTEM

In the present paper, we propose a mean-held approach for spin ladders based upon the Jordan-Wigner transformation along an elaborately orde red path. We show on the mean-held level that ladders with even-number ed legs open an energy gap in their low-energy excitation with a magni tude close to the corresponding experimental values, whereas the low-e nergy excitation of the odd-numbered-leg ladders are gapless. It suppo rts the validity of our approach. We then calculate the gap size and t he excitation spectra of a two-leg-ladder system. Our result is in goo d agreement with both the experimental data and the numerical results. [S0163-1829(98)09901-9].