λ-fold near-factorizations of groups

Abstract

We initiate the study of λ-fold near-factorizations of groups with λ > 1. While λ-fold near-factorizations of groups with λ = 1 have been studied in numerous papers, this is the first detailed treatment for λ > 1. We establish fundamental properties of λ-fold near-factorizations and introduce the notion of equivalence. We prove various necessary conditions of λ-fold near-factorizations, including upper bounds on λ. We present three constructions of infinite families of λ-fold near-factorizations, highlighting the characterization of two subfamilies of λ-fold near-factorizations. We discuss a computational approach to λ-fold near-factorizations and tabulate computational results for abelian groups of small order.

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