Nonwandering
A point 
in a Manifold 
is said to be nonwandering if, for every open Neighborhood 
of , it is truethat 
for a Map 
for some 
. In other words, every point close to hassome iterate under which is also close to . The set of all nonwandering points is denoted 
, which isknown as the nonwandering set of .
- Information Dimension
- Information Entropy
- Information Theory
- Initial Value Problem
- Injection
- Injective
- Injective Patch
- Inner Automorphism Group
- Inner Product
- Inner Product Space
- Inradius
- Inscribed
- Inscribed Angle
- Inside-Outside Theorem
- Insphere
- Instrument Function
- Insufficient Reason Principle
- Int
- Integer
- Integer Division
- Integer Factorization
- Integer-Matrix Form
- Integer Module
- Integer Part
- Integer Relation