Chernoff's product formula: Semigroup approximations with non-uniform time intervals

TL;DR

This paper extends Chernoff's product formula to handle non-uniform time intervals, providing a more flexible approximation method for system evolution with applications in quantum mechanics and the central limit theorem.

Contribution

It introduces alternative conditions to extend Chernoff's approximation to uneven time intervals, broadening its applicability.

Findings

Extended Chernoff's formula to uneven intervals

Applications demonstrated in quantum mechanics foundations

Connections made to the central limit theorem

Abstract

Often, when we consider the time evolution of a system, we resort to approximation: Instead of calculating the exact orbit, we divide the time interval in question into uniform segments. Chernoff's results in this direction provide us with a general approximation scheme. There are situations when we need to break the interval into uneven pieces. In this paper, we explore alternative conditions to the one found by Smolyanov et al. such that Chernoff's original result can be extended to unevenly distributed time intervals. Two applications concerning the foundations of quantum mechanics and the central limit theorem are presented.