Abstract
Graph products of monoids provide a common framework for direct and free products, and graph monoids (also known as free partially commutative monoids). If the monoids in question are groups then any graph product is a group. For monoids that are not groups, regularity is perhaps the first and most important algebraic property that one considers: however, graph products of regular monoids are not in general regular. We show that a graph product of regular monoids satisfies the related, but weaker, condition of being abundant. More generally, we show that the classes of left abundant and left Fountain monoids are closed under graph product. As a very special case we obtain the earlier result of Fountain and Kambites that the graph product of right cancellative monoids is right cancellative. To achieve our aims we show that elements in (arbitrary) graph products have a unique Foata normal form, and give some useful reduction results; these may equally well be applied to groups as to the broader case of monoids.
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