0
votes
1answer
17 views

Recurrence relations and asymptotic complexity

I am trying to understand the recurrence relation of f(n) = n^cos n and g(n) = n. I am told that this relation has no asymptotic behavior related to Big O, little o, Big Omega, little omega, or Theta. ...
0
votes
2answers
83 views

Asymptotic run time complexity of an expression

Can I say that: log n + log (n-1) + log (n-2) + .... + log (n - k) = theta(k * log n)? Formal way to write the above: Sigma (i runs from 0 to k) log (n-i) = theta (k* log n)? If the above ...
1
vote
3answers
110 views

Runtime of a loop that decays exponentially?

Where n is the input to the function can be any integer. i = n, total = 0; while (i > 0) { for (j=0; j<i; j++) for (k=0; k<i; k++) total++; i = i/4; } What is ...
1
vote
1answer
894 views

Solving the recurrence T(n) = T(n/2) + T(n/4) + T(n/8)?

I'm trying to solve a recurrence T(n) = T(n/8) + T(n/2) + T(n/4). I thought it would be a good idea to first try a recurrence tree method, and then use that as my guess for substitution method. ...
-1
votes
1answer
47 views

Prove f(n) is always O(f(n-1)) [closed]

Assume that f(n) goes to infinity as n goes to infinity. This is a homework problem and I would appreciate an idea/guidance instead of the complete answer.
1
vote
1answer
71 views

Why is an + b = O(n^2)?

I need to prove that an + b = O(n2) using the formal definition of big-O notation. I have searched several textbooks I own on discrete mathematics as well as several online sources for any examples or ...
4
votes
2answers
246 views

Asymptotic analysis

I'm having trouble understanding how to make this into a formula. for (int i = 1; i <= N; i++) { for (int j = 1; j <= N; j += i) { I realize what happens, for every i++ you have 1 ...
0
votes
2answers
44 views

How many subproblems can this recurrence have while still being faster than an initial recurrence?

I'm having some trouble with an asymptotic analysis question : My Question is to calculate maximum value if 'a' as stated in my question: An Algorith A has running time T(n)= 7T(n/2) + n^2 and ...
2
votes
2answers
180 views

Determine the asymptotic complexity

If I'm given two functions and asked to find asymptotic complexity for both, what does that mean? Is it O() or Big Theta? For example f1(n)=a^n and f2(n)=n^3+n^2 Should I say that f1 is O(a^n) and ...
0
votes
1answer
195 views

Collatz conjecture: loose upper/lower bounds? [closed]

This is a problem from my textbook. The Collatz conjecture (or the "3n + 1" problem) works as follows (given some natural number n): while n > 1 do if n is even then n = n / 2 ...
0
votes
2answers
239 views

Studying for my final: Asymptotic notation [closed]

I am currently studying for my final in algorithms. This is not a homework problem and comes from an old final exam. Show that f(n) = 4logn + log log n is big theta of logn. It is obvious that ...
1
vote
1answer
98 views

Big Oh Notation prob

Is 3^n = O(2^n) how about (3/2)^n = O(2^n) ? Can you explain the answers? I got false for the first since, 3^n grows faster then 2^n no matter what constant C you multiply 2^n by. And same for the ...
-2
votes
2answers
186 views

solving recurrence examples of form T(n-i) + f(n) [closed]

I've been working on a problem set for a bit now and I seem to have gotten the master method down for recurrence examples. However, I find myself having difficulties with other methods (recurrence ...
0
votes
2answers
192 views

Regarding complexity of an algorithm with steps C(n+r-1, r-1)

If an algorithm requires C(n+r-1, r-1) steps to solve a problem, where n is the number of input, and r is a constant, does the steps of algorithm consider exponential growth?
7
votes
2answers
1k views

When do floors and ceilings matter while solving recurrences?

I came across places where floors and ceilings are neglected while solving recurrences. Example from CLRS (chapter 4, pg.83) where floor is neglected: Here (pg.2, exercise 4.1–1) is an example ...
1
vote
2answers
458 views

Asymptotic Notation

This is a problem on Asymptotic Notation from the assignment of MIT OpenCourse Introduction to Algorithm: For each of the following statements, decide whether it is always true, never true, or ...
-3
votes
3answers
667 views

What does 'log' represent in asymptotic notation?

I understand the principles of asymptotic notation, and I get what it means when something is O(1) or O(n2) for example. But what does O(log n) mean? or O(n log n) for example?
1
vote
1answer
324 views

dynamic programming - what's the asymptotic runtime?

I'm teaching myself dynamic programming. It's almost magical. But seriously. Anyway, the problem I worked out was : Given a stairs of N steps and a child who can either take 1, 2, or 3 steps at a ...
2
votes
3answers
397 views

Big Oh notation (how to write a sentence)

I had a test about asymptotic notations and there was a question: Consider the following: O(o(f(n)) = o(f(n)) Write in words the meaning of the statement, using conventions from asymptotic ...
1
vote
3answers
436 views

<= vs < when proving big-o notation

We just started learning big-o in class. I understand the general concept that f(x) is big-o of g(x) if there exists two constants c,k such that for all x>k |f(x)|<=c|g(x)|. I had a question ...
4
votes
1answer
3k views

Solving recurrences

Am trying to solve the given recursion, using recursion tree, T(n) = 3T(n/3) + n/lg n. In the first level (n/3)/(log(n/3)) + (n/3)/(log(n/3)) + (n/3)/(log(n/3)) = n/(log(n/3)). In the second level ...