Numberiin
Numberiin is a conceptual construct in theoretical number theory used to study how integers can be generated from a fixed set of base elements under a defined binary operation. The term combines the idea of numerical bases with the notion of generation by combining elements, and it appears in discussions of additive and combinatorial structures.
A numberiin consists of a pair (G, ◦), where G is a subset of the nonnegative integers and
Common variants consider additional constraints, such as requiring ◦ to be commutative or associative, or restricting G
Applications and relation to other concepts
Numberiin serves as a teaching and research framework to explore base representations, generating sets, and the
Additive number theory, bases, semigroups, monoids, base representation.