Pathologies of the large-N limit for RPN-1, CPN-1, QPN-1 and mixed isovector/isotensor sigma-models
Abstract
We compute the phase diagram in the N∞ limit for lattice RPN-1, CPN-1 and QPN-1 sigma-models with the quartic action, and more generally for mixed isovector/isotensor models. We show that the N=∞ limit exhibits phase transitions that are forbidden for any finite N. We clarify the origin of these pathologies by examining the exact solution of the one-dimensional model: we find that there are complex zeros of the partition function that tend to the real axis as N∞. We conjecture the correct phase diagram for finite N as a function of the spatial dimension d. Along the way, we prove some new correlation inequalities for a class of N-component sigma-models, and we obtain some new results concerning the complex zeros of confluent hypergeometric functions.
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