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  1. Uniformly Bounded Arrays and Mutually Algebraic Structures.Michael C. Laskowski & Caroline A. Terry - 2020 - Notre Dame Journal of Formal Logic 61 (2):265-282.
    We define an easily verifiable notion of an atomic formula having uniformly bounded arrays in a structure M. We prove that if T is a complete L-theory, then T is mutually algebraic if and only if there is some model M of T for which every atomic formula has uniformly bounded arrays. Moreover, an incomplete theory T is mutually algebraic if and only if every atomic formula has uniformly bounded arrays in every model M of T.
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  • The elementary diagram of a trivial, weakly minimal structure is near model complete.Michael C. Laskowski - 2009 - Archive for Mathematical Logic 48 (1):15-24.
    We prove that if M is any model of a trivial, weakly minimal theory, then the elementary diagram T(M) eliminates quantifiers down to Boolean combinations of certain existential formulas.
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  • Mutually algebraic structures and expansions by predicates.Michael C. Laskowski - 2013 - Journal of Symbolic Logic 78 (1):185-194.
    We introduce the notions of a mutually algebraic structures and theories and prove many equivalents. A theory $T$ is mutually algebraic if and only if it is weakly minimal and trivial if and only if no model $M$ of $T$ has an expansion $(M,A)$ by a unary predicate with the finite cover property. We show that every structure has a maximal mutually algebraic reduct, and give a strong structure theorem for the class of elementary extensions of a fixed mutually algebraic (...)
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  • Characterizing Model Completeness Among Mutually Algebraic Structures.Michael C. Laskowski - 2015 - Notre Dame Journal of Formal Logic 56 (3):463-470.
    We characterize when the elementary diagram of a mutually algebraic structure has a model complete theory, and give an explicit description of a set of existential formulas to which every formula is equivalent. This characterization yields a new, more constructive proof that the elementary diagram of any model of a strongly minimal, trivial theory is model complete.
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  • Preface.Douglas Cenzer, Valentina Harizanov, David Marker & Carol Wood - 2009 - Archive for Mathematical Logic 48 (1):1-6.
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