A statistical model for points expanding in higher dimensions while being tied to bijective involutions

Abstract

Let M be a set with M elements, let :M be a bijective involution, and let~X be the set of sequences (x1,…,xM)∈MM with the property that xM+1-j = (xj) for 1 j M. This framework can be used to infer the possible distribution of sequences, such as the modular ones, that pose challenges for conventional methods. We prove that when M is even, there exists a limit probability density function that weighs the parameter k that counts the appearances of the elements of M among the terms of sequences x∈X. It turns out that the number of fixed points of influences the probability density function, which decomposes into two pieces, each multiplied by complementary factors, and the smaller of the two pieces appears only when k is even. Applying the model, we find a threshold from which almost all sequences contain related terms with prescribed frequencies.