Category:Principle of Recursive Definition
Jump to navigation
Jump to search
This category contains pages concerning Principle of Recursive Definition:
Let $\N$ be the natural numbers.
Let $T$ be a class (which may be a set).
Let $a \in T$.
Let $g: T \to T$ be a mapping.
Then there exists exactly one mapping $f: \N \to T$ such that:
- $\forall x \in \N: \map f x = \begin{cases} a & : x = 0 \\ \map g {\map f n} & : x = n + 1 \end{cases}$
Pages in category "Principle of Recursive Definition"
The following 11 pages are in this category, out of 11 total.
P
- Principle of Recursive Definition
- Principle of Recursive Definition for Minimally Inductive Set
- Principle of Recursive Definition for Peano Structure
- Principle of Recursive Definition/Also presented as
- Principle of Recursive Definition/Fallacious Proof
- Principle of Recursive Definition/General Result
- Principle of Recursive Definition/Proof 1
- Principle of Recursive Definition/Proof 2
- Principle of Recursive Definition/Proof 3
- Principle of Recursive Definition/Proof 4
- Principle of Recursive Definition/Strong Version