Oscillations of Observables in 1-Dimensional Lattice Systems

Abstract

Using, and extending, striking inequalities by V.V. Ivanov on the down-crossings of monotone functions and ergodic sums, we give universal bounds on the probability of finding oscillations of observables in 1-dimensional lattice gases in infinite volume. In particular, we study the finite volume average of the occupation number as one runs through an increasing sequence of boxes of size 2n centered at the origin. We show that the probability to see k oscillations of this average between two values β and 0<α <β is bounded by C Rk, with R<1, where the constants C and R do not depend on any detail of the model, nor on the state one observes, but only on the ratio α/β .

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