We map spin ladders with nl legs and couplings J′ across all rungs and J(1±γ) along the legs, staggered in both directions, to a sigma model. Setting its θ=(2m+1)π (where it is known to be gapless), we locate the critical curves in the γ versus JJ′ plane at each nl, and spin S. The phase diagram is rich and has some surprises: when two gapped chains are suitably coupled, the combination becomes gapless. With nl,γ and J′/J to control, the prospects for experimentally observing any one of these equivalent transitions seem bright. We discuss the order parameters and the behavior of holes in the RVB description.
@article{arxiv.cond-mat/9605035,
title = {Snakes and Ladders},
author = {M. A. Martin-Delgado and R. Shankar and G. Sierra},
journal= {arXiv preprint arXiv:cond-mat/9605035},
year = {2019}
}
Comments
RevTex file, 4 pages, 3 PS figures uuencoded, gzipped and .tar at the end of the latex file. Important extension to ferromagnetic ladders included (of potential experimental relevance). Typos corrected in formulas and figures