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  1. ‘Nobody could possibly misunderstand what a group is’: a study in early twentieth-century group axiomatics.Christopher D. Hollings - 2017 - Archive for History of Exact Sciences 71 (5):409-481.
    In the early years of the twentieth century, the so-called ‘postulate analysis’—the study of systems of axioms for mathematical objects for their own sake—was regarded by some as a vital part of the efforts to understand those objects. I consider the place of postulate analysis within early twentieth-century mathematics by focusing on the example of a group: I outline the axiomatic studies to which groups were subjected at this time and consider the changing attitudes towards such investigations.
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  • Embedding semigroups in groups: not as simple as it might seem.Christopher Hollings - 2014 - Archive for History of Exact Sciences 68 (5):641-692.
    We consider the investigation of the embedding of semigroups in groups, a problem which spans the early-twentieth-century development of abstract algebra. Although this is a simple problem to state, it has proved rather harder to solve, and its apparent simplicity caused some of its would-be solvers to go awry. We begin with the analogous problem for rings, as dealt with by Ernst Steinitz, B. L. van der Waerden and Øystein Ore. After disposing of A. K. Sushkevich’s erroneous contribution in this (...)
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  • Semigroups with apartness.Siniša Crvenković, Melanija Mitrović & Daniel Abraham Romano - 2013 - Mathematical Logic Quarterly 59 (6):407-414.
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  • A method for finding new sets of axioms for classes of semigroups.João Araújo & Janusz Konieczny - 2012 - Archive for Mathematical Logic 51 (5):461-474.
    We introduce a general technique for finding sets of axioms for a given class of semigroups. To illustrate the technique, we provide new sets of defining axioms for groups of exponent n, bands, and semilattices.
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