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I have many parabolas that are intersecting each other. I am generating a list S from the upper segments of these parabolas. Since the corresponding two edges of a parabola intersect each other at most at 2 points, the list S can contain at most 2n – 1 items.

I want to prove this by induction. What I can think of is this:

Assume I have f(x) ≤ 2n – 1.

Base case is n = 1, f(1) ≤ 2 · 1 – 1, so f(1) <= 1.

Then assume n = k holds, so f(k) ≤ 2k – 1.

We can show that for n = k+1 holds f(k+1) ≤ 2(k+1) – 1.

Am I supposed to continue like that, e.g. for n = k+2, n = k+3, …? If I continue like this, then does it mean I proved it by induction?

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No, once you prove the base case and that if it is true for k, it is also true for k+1 you are done. since you just proved it is true for k+1, for k'=k+1, it will also be true for k'+1=k+2 and so on.. – amit Sep 15 '11 at 6:08
why i am confused is, i didn't do anything to prove it. i only put an input to the function (e.g. k+1) and that's all. is this a proof? i feel like i should do something more. – Noopur Sep 15 '11 at 6:12
I see what you are asking now. You didn't really prove the claim for k+1. I'll add an answer describing a full prove. – amit Sep 15 '11 at 6:18
This is more math than algorithmic oriented. I'm not closing it, but you might find useful in the future. – Tim Post Sep 15 '11 at 7:49

1 Answer 1

up vote 1 down vote accepted

claim: f(n) <= 2n-1

base: for n=1, there are no intersections at all [a parabola cannot intersect with itself, so there is only one segment and: f(1)=1<=2-1=1, so the claim for n=1 is true.

We will show that if the claim is true for an arbitrary k, it is also true for k+1.

f(k+1)<=f(k)+2 because there are additional 2 segments, at most, and therefore :

(*)from the induction assumption

From the induction, the claim is true for each k>=1.

If i understood correctly what you are trying to prove, this proof should cover it.

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now i get it. many thanks. one thing: what (*) means in the 6th line? – Noopur Sep 15 '11 at 6:35
@Noopur: (*)from the induction assumption, I forgot to add it, added it now. :) – amit Sep 15 '11 at 6:37
many thanks! :) – Noopur Sep 15 '11 at 6:38

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