Infinite descent principle

There is no infinite sequence of strictly decreasing non-negative integerstheorem
Used to show that a statement cannot possibly hold for any number
- by showing that if the statement were to hold for a number
- then the same would be true for a smaller number
- leading to an infinite descent and ultimately a contradiction.
The method relies on Well ordering principle, so only a finite number of non-negative integers are smaller than any given one
A method of Proof by contradiction
Used to solve Fermat’s last theorem for n=3 and 4

Originally (to prove all $P_{n}$ is false)
- Let $m$ be a positive integer.
- Suppose that whenever $P (m)$ holds for some $m > k$ , there exists a positive integer $j$ such that $m > j > k$ and $P (j)$ holds.
  - $m$ must be the smallest by Well ordering principle
- Then $P (n)$ is false for all positive integers $n$ .
Equivalently (to prove all $P_{n}$ is true)
- Let $P$ be a predicate on nonnegative integers. Assume that
  - $P (0)$ is a true statement (the smallest ) and
  - for all $k \in N$ , if the statement $P (k)$ is false then there exists a natural number $m, m < k$ , for which the statement $P (m)$ is also false.
    - By induction, it would make $P (0)$ also false, therefore, $P (K)$ has to be true
- Then, the statement $P (n)$ is true for all natural numbers $n \in N$

StrixTheKiet Notes