COLIN implies LIN for emergent algebras
Abstract
Emergent algebras, first time introduced in arXiv:0907.1520 , are families of quasigroup operations indexed by a commutative group, which satisfy some algebraic relations and also topological (convergence and continuity) relations. Besides sub-riemannian geometry arXiv:math/0608536, they appear as a semantics of a family of graph-rewrite systems related to interaction combinators arXiv:2007.10288, or lambda calculus arXiv:1305.5786 . In arXiv:1807.02058 there is a lambda calculus version of emergent algebras. In this article we prove that for emergent algebras the condition (COLIN), or right-distributivity for emergent algebras, implies (LIN), or left-distributivity for emergent algebras. It means that any emergent algebra which is right-distributive has to come from a commutative group endowed with a family of dilations. This is surprising, because there are many examples of emergent algebras which satisfy (LIN), but not (COLIN), namely those who are associated to non-commutative conical groups, in particular to non-commutative Carnot groups.
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