Macroscopic loops in the Bose gas, Spin O(N) and related models

Abstract: We consider a general system of interacting random loops which includes several models of interest, such as the Spin O(N) model, random lattice permutations, a version of the interacting Bose gas in discrete space and of the loop O(N) model. We consider the system in Z d , d ≥ 3, and prove the occurrence of macroscopic loops whose length is proportional to the volume of the system. More precisely, we approximate Z d by finite boxes and, given any two vertices whose distance is proportional to the diameter of t… Show more

“…Another extension of the method deals with "chessboard estimates", proposed by Fröhlich and Lieb [16] (they were partly motivated by [23]). Among many interesting works that use these ideas, let us mention the flux phase problem [30,35]; spin reflection positivity applied to Hubbard models [31,43,44]; itinerant electron models [32][33][34]; high spin systems whose classical limit has long-range order [6,7]; spin nematic phases [4,42]; Néel order in spin-1 model with biquadratic interactions [29]; hard-core bosons [1,26]; loop models associated with quantum spin systems [47] (motivated by [2,45]) and other loop models associated with classical spin systems [39]. Finally, let us mention an alternate extension of [17] to quantum systems by Albert, Ferrari, Fröhlich, and Schlein [3].…”

Reflection positivity and infrared bounds for quantum spin systems

“…Another extension of the method deals with "chessboard estimates", proposed by Fröhlich and Lieb [16] (they were partly motivated by [23]). Among many interesting works that use these ideas, let us mention the flux phase problem [30,35]; spin reflection positivity applied to Hubbard models [31,43,44]; itinerant electron models [32][33][34]; high spin systems whose classical limit has long-range order [6,7]; spin nematic phases [4,42]; Néel order in spin-1 model with biquadratic interactions [29]; hard-core bosons [1,26]; loop models associated with quantum spin systems [47] (motivated by [2,45]) and other loop models associated with classical spin systems [39]. Finally, let us mention an alternate extension of [17] to quantum systems by Albert, Ferrari, Fröhlich, and Schlein [3].…”

Reflection positivity and infrared bounds for quantum spin systems