Inductive set explained

Bourbaki also defines an inductive set to be a partially ordered set that satisfies the hypothesis of Zorn's lemma when nonempty.

In descriptive set theory, an inductive set of real numbers (or more generally, an inductive subset of a Polish space) is one that can be defined as the least fixed point of a monotone operation definable by a positive Σ1n formula, for some natural number n, together with a real parameter.

The inductive sets form a boldface pointclass; that is, they are closed under continuous preimages. In the Wadge hierarchy, they lie above the projective sets and below the sets in L(R). Assuming sufficient determinacy, the class of inductive sets has the scale property and thus the prewellordering property.

The term can have a number of different meanings:[1]

\emptyset

among them, and the successor of every element

y

is the set

y\cup\{y\}

. In particular, every inductive set contains the sequence

\emptyset,\{\emptyset\},\{\emptyset,\{\emptyset\}\},\{\emptyset,\{\emptyset\},\{\emptyset,\{\emptyset\}\}\},...

.[3]

References

Notes and References

  1. Web site: Weisstein . Eric W. . Inductive Set . 2024-06-05 . mathworld.wolfram.com . en.
  2. Book: Russell, B. Introduction to Mathematical Philosophy, 11th ed. George Allen and Unwin. 1963. London. 21–22.
  3. Book: Roitman, J. Introduction to Modern Set Theory. Wiley. 1990. New York. 40.
  4. Book: Bourbaki, N. Ensembles Inductifs." Ch. 3, §2.4 in Théorie des Ensembles. Hermann. 1970. Paris, France. 20–21.