JOURNAL ARTICLE
Lawvere Theories and Definable Operations
Year: 2022 Journal: uO Research (University of Ottawa) Publisher: University of Ottawa
Abstract
We introduce the inner theory or, more verbosely, isotropy Lawvere theory functor, which generalizes the isotropy group/monoid by assigning a Lawvere theory of coherently extendable arrows to each object of a category with finite powers. Then, we characterize the inner theory for categories of models of an algebraic (or, more generally, quasi-equational) theory, and note its relationship with a notion of definability for morphisms. Finally, we explore a variety of examples.
Keywords:
Nucleofection Gestational period TSG101 Liquation Emperipolesis Diafiltration Dysgeusia Triacetin Demotion
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