# Time complexity of the program using recurrence equation

I want to find out the time complexity of the program using recurrence equations. That is ..

``````int f(int x)
{
if(x<1) return 1;
else  return f(x-1)+g(x);
}
int g(int x)
{
if(x<2) return 1;
else return f(x-1)+g(x/2);
}
``````

I write its recurrence equation and tried to solve it but it keep on getting complex

``````T(n) =T(n-1)+g(n)+c
=T(n-2)+g(n-1)+g(n)+c+c
=T(n-3)+g(n-2)+g(n-1)+g(n)+c+c+c
=T(n-4)+g(n-3)+g(n-2)+g(n-1)+g(n)+c+c+c+c
……………………….
……………………..
Kth time …..
=kc+g(n)+g(n-1)+g(n-3)+g(n-4).. .. . … +T(n-k)

Let at kth time input become 1
Then n-k=1
K=n-1
Now i end up with this..
T(n)= (n-1)c+g(n)+g(n-1)+g(n-2)+g(n-3)+….. .. g(1)
``````

I ‘m not able to solve it further. Any way if we count the number of function calls in this program , it can be easily seen that time complexity is exponential but I want proof it using recurrence . how can it be done ?

Explanation in Anwer 1, looks correct , similar work I did.

The most difficult task in this code is to write its recursion equation. I have drawn another diagram , I identified some patterns , I think we can get some help form this diagram what could be the possible recurrence equation.

``````And I came up with this equation , not sure if it is right ??? Please help.

T(n) = 2*T(n-1) + c * logn
``````
-
What is the exact question? Do you want to prove that T_f(x) = Theta(c^x) for some c > 1? Or do you want an exact formula? Same for g? –  Knoothe Mar 24 '13 at 7:04
this code is very confusing , we need to consider both function f(x) and g(x)... –  siddstuff Mar 24 '13 at 7:22
You need to solve `g(x) = 2g(x - 1) - g((x - 1) / 2) + g(x / 2)`, then plug it back in `f(x)` to solve for f(x). –  nhahtdh Mar 24 '13 at 7:57
@nhahtdh where did you get that equation from? –  Zadirion Mar 24 '13 at 7:59
@sidstuff: and the winner is....? Mr. Knoothe has given the tightest bound, and his answer deserves to be accepted, i.m.o, although I agree with Saeed that there is not much practical difference between 2^n and 3^n. And please do not tell us that your teacher (this was homework, wasn't it?) said that O(n) is the answer (although... then I win :-) BTW: I enjoyed the problem, and the discussion, gentlemen! –  Hans Lub Mar 26 '13 at 9:17
show 1 more comment

Let f(0)=0 and g(0)=0

From the function we have,

``````f(x) = f(x - 1) + g(x)
g(x) = f(x - 1) + g(x/2)
``````

Substituting g(x) in f(x) we get,

``````f(x) = f(x-1) + f(x -1) + g(x/2)
``````

∴f(x) = 2f(x-1) + g(x/2)

Expanding this we get,

``````f(x) = 2f(x-1)+f(x/2-1)+f(x/4-1)+ ... + f(1)
``````

Let s(x) be a function defined as follows,

``````s(x) = 2s(x-1)
``````

Now clearly f(x)=Ω(s(x)).

The complexity of s(x) is O(2x).

Therefore function f(x)=Ω(2x).

-
The lower bound is quite clear. The more interesting aspect is the upper bound. –  nhahtdh Mar 24 '13 at 8:41
-1: For not proving anything non-trivial, and the incorrect statements later. –  Knoothe Mar 24 '13 at 22:18
Sorry, I corrected them... –  Deepu Mar 25 '13 at 1:22
@Deepu: Thanks for listening, but (and not to be rude), I really don't think this answer is worth the upvotes it got. All you have shown is that f(x) = Omega(2^x), which is quite easy to show. The hard part is proving that f(x) = O(2^x). (nhahtdh also commented on the same lines). So, the downvote stands. Sorry about that. btw, just s(x) = 2s(x-1) is enough, isn't it? Why add the c? –  Knoothe Mar 25 '13 at 4:15

Using memoisation, both functions can easily be computed in O(n) time. But the program takes at least O(2^n) time, and thus is a very inefficient way of computing `f(n)` and `g(n)`

To prove that the program takes at most O(2+epsilon)^n time for any epsilon > 0:

Let F(n) and G(n) be the number of function calls that are made in evaluating f(n) and g(n), respectively. Clearly (counting the addition as 1 function call):

F(0) = 1; F(n) = F(n-1) + G(n) + 1
G(1) = 1; G(n) = F(n-1) + G(n/2) + 1

Then one can prove:

• F and G are monotonic
• F > G
• Define H(1) = 2; H(n) = 2 * H(n-1) + H(n/2) + 1
• clearly, H > F
• for all n, H(n) > 2 * H(n-1)
• hence H(n/2) / H(n-1) -> 0 for sufficiently large n
• hence H(n) < (2 + epsilon) * H(n-1) for all epsilon > 0 and sufficiently large n
• hence H in O((2 + epsilon)^n) for any epsilon > 0
• (Edit: originally I concluded here that the upper bound is O(2^n). That is incorrect,as nhahtdh pointed out, but see below)
• so this is the best I can prove.... Because G < F < H they are also in O((2 + epsilon)^n) for any epsilon > 0

Postscript (after seeing Mr Knoothes solution): Because i.m.h.o a good mathematical proof gives insight, rather than lots of formulas, and SO exists for all those future generations (hi gals!):

For many algorithms, calculating f(n+1) involves twice (thrice,..) the amount of work for f(n), plus something more. If this something more becomes relatively less with increasing n (which is often the case) using a fixed epsilon like above is not optimal. Replacing the epsilon above by some decreasing function ε(n) of n will in many cases (if ε decreases fast enough, say ε(n)=1/n) yield an upper bound O((2 + ε(n))^n ) = O(2^n)

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2^n is the lower bound, so you should say it is Omega(2^n). –  nhahtdh Mar 24 '13 at 10:07
The steps of the proof looks is so hand waving that it sends chill down my spine... –  nhahtdh Mar 24 '13 at 13:19
but that is not how you sink a proof. which step fails, and why? –  Hans Lub Mar 24 '13 at 13:21
`hence H in O((2 + epsilon)^n) for any epsilon > 0 hence H in O(2^n)` This step looks a bit fishy. Since 2 + epsilon > 2, won't lim (2 + epsilon)^n / 2^n --> Inf when n --> Inf? Then H is not in O(2^n). –  nhahtdh Mar 24 '13 at 13:24
Even better with a counterexample: (2^n) * log(n) is in O((2 + epsilon)^n) for any epsilon > 0 but not in O(2^n). So my proof is incorrect. –  Hans Lub Mar 24 '13 at 15:08

I think is clear to see that f(n) > 2n, because f(n) > h(n) = 2h(n-1) = 2n.

Now I claim that for every n, there is an ε such that: f(n) < (2+ε)n, to see this, let do it by induction, but to make it more sensible at first I'll use ε = 1, to show f(n) <= 3n, then I'll extend it.

We will use strong induction, suppose for every m < n, f(m) < 3m then we have:

``````f(n) = 2[f(n-1) + f(n/2 -1) + f(n/4 -1)+ ... +f(1-1)]
``````

but for this part:

``````A = f(n/2 -1) + f(n/4 -1)+ ... +f(1-1)
``````

we have:

``````f(n/2) = 2[f(n/2 -1) + f(n/4 -1)+ ... +f(1-1]) ==>

A <= f(n/2)   [1]
``````

So we can rewrite f(n):

``````f(n) = 2f(n-1) + A < 2f(n-1) +f(n/2),
``````

Now let back to our claim:

``````f(n) < 2*3^(n-1) + 2*3^(n/2)==>
f(n) < 2*3^(n-1) + 3^(n-1) ==>
f(n) < 3^n.  [2]
``````

By [2], proof of f(n)∈O(3n) is completed.

But If you want to extend this to the format of (2+ε)n, just use 1 to replace the inequality, then we will have

for ε > 1/(2+ε)n/2-1 → f(n) < (2+ε)n.[3]

Also by [3] you can say that for every n there is an ε such that f(n) < (2+ε)n actually there is constant ε such that for n > n0, f(n)∈O((2+ε)n). [4]

Now we can use wolfarmalpha like @Knoothe, by setting ε=1/n, then we will have:

f(n) < (2+1/n)n which results on f(n) < e*2n, and by our simple lower bound at start we have: f(n)∈ Θ(2^n).[5]

P.S: I didn't calculate epsilon exactly, but you can do it with pen and paper simply, I think this epsilon is not correct, but is easy to find it, and if is hard tell me is hard, and I'll write it.

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Yes, your last conclusion doesn't only hold for some epsilon, but for every epsilon > 0 –  Hans Lub Mar 24 '13 at 15:58
@HansLub, in `O` notation when we say for every n > n0, means n0 is constant, and if you look at the relation between epsilon and n0, epsilon is dependent to n0, so I cannot say for every epsilon, because n0 is fixed, so I should focus on n0 not an epsilon, instead of saying for any epsilon there exists n0, I should say for every fixed n0 there exists epsilon such that ...., and the main point is this, we should find epsilon for n0. –  Saeed Amiri Mar 24 '13 at 16:17
When you say that f is in O(g) you do not need to mention n0; you already state that there are c and n0 such that f(n) < c*g(n) for n > n0. And not only, as you say, for any n0 there exits an epsilon, but also for any epsilon there exists an n0 such that .... Hence for any epsilon, f is in O((2+epsilon)^n) –  Hans Lub Mar 24 '13 at 16:28
@HansLub, actually I'm not agree with for all epsilon there exists n0 such that ..., because when epsilon is infinitely small then n0 will be infinitely large then n0 is not fixed constant. –  Saeed Amiri Mar 24 '13 at 16:41
@HansLub: I can now say confidently, that something is wrong with the answer here. `f(x) = w(2^x)` is not right. In fact, `f(x) = Theta(2^x)`! See my answer with a proof. (Of course, the bug might be in my proof, but I am not handwaving anywhere, and each step is easily verifiable) –  Knoothe Mar 24 '13 at 22:19
show 1 more comment

Ok, I think I have been able to prove that `f(x) = Theta(2^x)` (note that the time complexity is the same). This also proves that `g(x) = Theta(2^x)` as `f(x) > g(x) > f(x-1)`.

First as everyone noted, it is easy to prove that `f(x) = Omega(2^x)`.

Now we have the relation that `f(x) <= 2 f(x-1) + f(x/2)` (since `f(x) > g(x)`)

We will show that, for sufficiently large `x`, there is some constant `K > 0` such that

`f(x) <= K*H(x), where H(x) = (2 + 1/x)^x`

This implies that `f(x) = Theta(2^x)`, as `H(x) = Theta(2^x)`, which itself follows from the fact that `H(x)/2^x -> sqrt(e) as x-> infinity` (wolfram alpha link of the limit).

Now (warning: heavier math, perhap cs.stackexchange or math.stackexchange is better suited)

according to wolfram alpha (click the link and see series expansion near x = infinity),

`H(x) = exp(x ln(2) + 1/2 + O(1/x))`

And again, according to wolfram alpha (click the link (different from above) and see the series expansion for x = infinity), we have that

`H(x) - 2H(x-1) = [1/2x + O(1/x^2)]exp(x ln(2) + 1/2 + O(1/x))`

and so

`[H(x) - 2H(x-1)]/H(x/2) -> infinity as x -> infinity`

Thus, for sufficiently large `x` (say `x > L`) we have the inequality

`H(x) >= 2H(x-1) + H(x/2)`

Now there is some `K` (dependent only on `L` (for instance K = f(2L))) such that

`f(x) <= K*H(x) for all x <= 2L`

Now we proceed by (strong) induction (you can revert to natural numbers if you want to)

`f(x+1) <= 2f(x) + f((x+1)/2)`

By induction, the right side is

`<= 2*K*H(x) + K*H((x+1)/2)`

And we proved earlier that

`2*H(x) + H((x+1)/2) <= H(x+1)`

Thus `f(x+1) <= K * H(x+1)`

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@Saeed Come on! All our proofs use the same recurrence H(n) = 2H(n-1) + H(n/2) (I even counted the additions, as an ever cost-conscious Dutchman...) You and I fall just short of proving O(2^n). Knoothes clever idea is to use the series (2+1/n)^n which is clearly (after polishing my spectacles :-) in O(2^n) –  Hans Lub Mar 25 '13 at 9:16
(2+ε)^n uses a fixed epsilon which will not get you O(2^n). (2+1/n)^n uses a decreasing epsilon, and gets the result. –  Hans Lub Mar 25 '13 at 9:51
@SaeedAmiri: btw, the core of this proof is that `H(x) >= 2H(x-1) + H(x/2)` (and that is the most difficult part). I just saw an edit to your answer, and that is still handwaving. You just cannot replace epsilon with 1/n like that! You are skipping over the hardest part of the proof. If you don't agree, would you consider posting on math.stackexchange to get expert comments? –  Knoothe Mar 25 '13 at 16:02
You are essentially handwaving there. –  Knoothe Mar 25 '13 at 16:26
@SaeedAmiri: The first mistake is irrelevant, as you seem to only use if to `f(n) <= 2f(n-1) + f(n/2)`, which is easy to see (see my answer for instance). It is obvious that the whole point was finding an upper bound (as a lower bound is trivial). It is easy to prove an upper bound of c^x, for c > 2 (i.e. essentially (2+epsilon)^n). The hard part is coming up with an upper bound, which is itself O(2^x). This is completely lacking from your answer, and your current approach does not work (that is what HansLub was mean when he said the answers fall short). –  Knoothe Mar 25 '13 at 16:43