Bounded affine permutations II. Avoidance of decreasing patterns

Abstract

We continue our study of a new boundedness condition for affine permutations, motivated by the fruitful concept of periodic boundary conditions in statistical physics. We focus on bounded affine permutations of size N that avoid the monotone decreasing pattern of fixed size m. We prove that the number of such permutations is asymptotically equal to (m-1)2N N(m-2)/2 times an explicit constant as N∞. For instance, the number of bounded affine permutations of size N that avoid 321 is asymptotically equal to 4N (N/4π)1/2. We also prove a permuton-like result for the scaling limit of random permutations from this class, showing that the plot of a typical bounded affine permutation avoiding m·s1 looks like m-1 random lines of slope 1 whose y intercepts sum to 0.