makeisets

Makeisets are a class of mathematical objects defined as sets generated by an operation called the make operation applied to a starting seed set. The term combines make and sets, highlighting the constructive nature of these objects. In a typical formulation, a makeiset M arises from an initial seed S0 contained in a fixed universe U by repeatedly applying a rule function f: P(U) → P(U), producing a sequence Sn+1 = f(Sn). The collection of all sets generated in this way, together with possible unions or intersections under a fixed collection of set operations, forms the makeiset family.

Construction and variation: A common approach uses a monotone, inflationary make operation, which ensures the process

Examples: If U is the natural numbers and the seed is S0 = {0}, a rule f(S) = S

Applications: Makeisets serve as a conceptual tool for illustrating iterative closure processes in set theory, combinatorics,

See also: set, closure, lattice, generators, iterative processes.