Equivalence of mathematical induction and strong induction Mathematical induction and strong induct

istremage8o

istremage8o

Answered question

2022-05-23

Equivalence of mathematical induction and strong induction
Mathematical induction and strong induction are equivalent. That is, each can be shown to be a valid proof technique assuming that the other is valid.
I interpret this to mean that neither proof technique can be used where the other could not be used. That being the case, why bother about strong induction at all?

Answer & Explanation

Rubi Boyle

Rubi Boyle

Beginner2022-05-24Added 14 answers

Step 1
If you are trying to prove F(n) is true, then it is more convenient to work with the fact that for all 1 k < n, F(k) is true, rather than just k = n 1 because you may need to depend on a sub-problem other than F ( n 1 ).
Step 2
For example, if we wanted to prove the Fibonacci recurrence T ( n ) = T ( n 1 ) + T ( n 2 ) has some closed form g(n), then we could leverage strong induction for convenience.

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