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• Recursion-and-induction

R-and-i-induction-principle

Recursion and Induction: The Induction Principle

The Induction Principle allows one to derive an arbitrary formula, ψ, from

• Base Case : (implies (and (not q_1) … (not q_k)) ψ), and

• Induction Step(s) : For each 1≤i≤k,
  (implies (and q_i ψ/σ_{i,1} … ψ/σ_{i,h_i})
           ψ),

provided that for terms m, q_1,...q_k, and substitutions σ_{i,j}  (1≤i≤k, 1≤j≤h_i), the following are theorems:

• Ordinal Conjecture : (o-p m), and

• Measure Conjecture(s) : For each 1≤i≤k and 1≤j≤h_i,
  (implies q_i (o< m/σ_{i,j}  m)).

Next: Relations Between Recursion and Induction (or Table of Contents)