3
votes
0answers
109 views

How to solve this recurrence relation: f(n) = 3f(n/2) - 2f(n/4) | f(2) = 5, f(1) = 3 [closed]

f(n) = 3f(n/2) - 2f(n/4) | f(2) = 5, f(1) = 3 I have attempted to solve it by letting n = 2k f(2k) = 3f(2k-1) - 2f(2k-2) Then set S(k) = f(2k) S(k) = 3*S(k-1) - 2*S(k-2) ...
0
votes
1answer
19 views

Is it possible for n = poly(Ω(n))?

Just wondering, if it were possible to have n = poly(m) and then would m = Ω(n) be valid?
1
vote
1answer
77 views

Is this language in NP?

L={[G, K] | G is a simple undirected graph with no simple path longer than k} (Further, is it Co-NP)? I believe this is NP. I could provide a verifier that did the following: V(G,E, k) is a ...
-6
votes
2answers
73 views

what is the answer for : n! = Θ( )?

How do I find the answer? Even Big O is enough. All clues i found are complex math ideas. any help? What would be the correct approach to tackle this problem? recursion tree seems too much of a work ...
0
votes
2answers
58 views

Another time complexity issue [closed]

I've done these problems, so I am not looking for a straight answer. I am looking for guidance on whether or not I am doing this correctly and if not, possibly some explanation on why I am incorrect. ...
3
votes
1answer
80 views

Algorithmically track a large number of shuffled decks

Lets say an application needs to efficiently store a large number of shuffled decks. Does there exist a constant-space, constant-time, algorithm such that: index = ...
0
votes
1answer
88 views

Complexity of adding log n log n operations

I am trying to analyse an algorithm that in the worst case does log(1) + log(2) + log(4) + log(n_i) + ... + log(log(n)) amount of work. Where the n_i's are powers of 2. My attempt is to say that ...
1
vote
1answer
75 views

Big O Algorithm efficiency comparison

Maybe this is a stupid question, but I am trying to find the math rule to prove that: O(n^2.3) is less efficient than O(n^2logn)
1
vote
1answer
390 views

Time complexity of this primality testing algorithm?

I have the following code which determines whether a number is prime: public static boolean isPrime(int n){ boolean answer = (n>1)? true: false; for(int i = 2; i*i <= n; ++i) { ...
2
votes
1answer
470 views

The complexity of n choose 2 is in Theta (n^2)?

I'm reading Introduction to Algorithms 3rd Edition (Cormen and Rivest) and on page 69 in the "A brute-force solution" they state that n choose 2 = Theta (n^2). I would think it would be in Theta (n!) ...
1
vote
1answer
45 views

What is an NP-complete set? [closed]

I am having a little trouble understanding the basic terminology used in computational complexity texts. Basically I'm having a little trouble understanding what an NP-complete (or any class) set is. ...
2
votes
1answer
155 views

Complexity of a particular divide and conquer algorithm

An algorithm decomposes (divides) a problem of size n into b sub-problems each of size n/b where b is an integer. The cost of decomposition is n, and C(1)=1. Show, using repeated substitution, that ...
6
votes
2answers
273 views

Algorithm complexity, solving recursive equation

I'm taking Data Structures and Algorithm course and I'm stuck at this recursive equation: T(n) = logn*T(logn) + n obviously this can't be handled with the use of the Master Theorem, so I was ...
-1
votes
2answers
80 views

homework: Proving n <= 2^(n/4)? [closed]

So I have an assignment question where I have to prove: n^4 is in O(2^n) Just by looking at the graphs of the functions I know that with c=1 and n[0] = 16 this is true. While trying to prove it on ...
2
votes
2answers
176 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
441 views

How to calculate time complexity of two loops (number of actions)?

I am not sure how to calculate the time complexity of the two loops. i runs from 1 to n: 1,2,3,4,5,...,n j runs from 1 to i; 1,2,4,8,...,i when i = 1 j: 1 loop runs: 1 time when i = 2 j: 1,2 ...
1
vote
2answers
218 views

What is the difference between O(1) and Θ(1)?

I know the definitions of both of them, but what is the reason sometimes I see O(1) and other times Θ(1) written in textbooks? Thanks.
0
votes
1answer
46 views

Finding a mod m where a mod 2^i are known

I need to find the value of a mod m. But I dont have the value of a directly. I have the following modulus values of a. a mod 21 a mod 22 a mod 23 ... a mod 2n Now I need to find a mod m where m ...
7
votes
3answers
626 views

Analyzing an algorithm with recurrence T(n) = T(n - 1) + T(n - 2) + T(n -3)?

So, someone posted this question earlier, but essentially no effort was put into it, it was poorly tagged and then closed. Nonetheless, I think it could have been a good question. I'm posting ...
1
vote
1answer
223 views

Bit cost of bit shift

I updated a question I asked before with this but as the original question was answered I'm guessing I should ask it seperately in a new question. Take for example the simple multiplication ...
-1
votes
1answer
305 views

Which is larger, lg(n!) or (lg(n))!? [closed]

I am writing a homework question and have no idea how to prove it. Please give me some hint. The hint is using mathematic induction and the textbook has the (lgn)! = Θ((lgn)^(lgn) + 0.5e^(-lgn) ) ...
2
votes
1answer
126 views

Is my substitution solution to this recurrence correct?

I have a recurrence relation, it is like the following: T(en) = 2(T(en-1)) + en, where e is the natural logarithm. To solve this and find a Θ bound, i tried the following: I put k=en, and the ...
1
vote
2answers
204 views

dividing by 2 and ceiling until remains 1

having the following algorithm only for natural numbers: rounds(n)={1, if n=1; 1+rounds(ceil(n/2)), else} so writing in a programming language this will be int rounds(int n){ if(n==1) ...
-2
votes
2answers
183 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 ...
2
votes
1answer
207 views

What is the running time complexity of this algorithm

What is the time complexity of this algorithm: sum = 0 i = 1 while (i<n){ for j=1 to i do { sum = sum + 1 } i = i*2; } return sum I know that the while loop is O(logn), but what ...
1
vote
1answer
83 views

Calculating Total Number of Times of Loops

I'm trying to calculate the total number of times the innermost statement is executed. count = 0; for i = 1 to n for j = 1 to n - i count = count + 1 I figured that the most the loop ...
2
votes
1answer
161 views

Solving a non-standard recurrence relation involving min?

Given the following recurrence relation: T(n)= T(n-x) + T(x) + O(min({x,n-x})) T(1) = 1 where x can divide our problem in any proportion (it may vary from call to call - not a constant ...
1
vote
2answers
2k views

Discrete Mathematics Big-O notation Algorithm Complexity

I can probably figure out part b if you can help me do part a. I've been looking at this and similar problems all day, and I'm just having problems grasping what to do with nested loops. For the first ...
3
votes
2answers
966 views

What does Õ (omega tilde) mean in complexity Õ(n) vs O(n) [closed]

I've never seen this notation for complexity: Õ(n). It comes up in the context of learning in stochastic algorithms. Anyone know this notation? You can't exactly google this... EDIT: SOLVED I ...
0
votes
3answers
1k views

Run times for while loop (Mathematical)

So I need a mathematical expression for the following loop, but I can't seem to grasp it. I am assuming I am just missing something simple. while a <= b a = a + a end Using an analysis, ...
1
vote
2answers
212 views

Car parked on an infinite street: find car and compute the complexity [closed]

Here is the question asked at an Interview: You are placed on a street which is very long. This is the street that you parked your car at. You have to find your car on this street. What is the ...
0
votes
2answers
185 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?
4
votes
2answers
176 views

Computational complexity of a nested algorithm

Given an array a [1,2,3,4,5,6,7,8,9,10] let's say we have an algorithm that does the following: for i in 0..a.length for j in 0..a.length ... This would have a Big O runtime of O(n^2) because ...
3
votes
2answers
701 views

Growth functions of Algorithm?

Well i have two questions here:- If f(n) is function whose growth rate is to be found then, Is for all three notations will the g(n) be same, like for f(n)=O(g(n)) and similaraly for omega and theta ...
3
votes
6answers
772 views

Formula for division of each individual term in a summation

Example: When the division is applied as a whole, the result is, The summation formula is given by, The above can be easily calculated in O(1), using the rules of summation. But when it is ...
0
votes
4answers
351 views

Series Summation to calculate algorithm complexity

I have an algorithm, and I need to calculate its complexity. I'm close to the answer but I have a little math problem: what is the summation formula of the series ½(n4+n3) where the pattern of ...
1
vote
2answers
157 views

Efficient Multiplication of Varying-Length #s [Conceptual]

EDIT So it seems I "underestimated" what varying length numbers meant. I didn't even think about situations where the operands are 100 digits long. In that case, my proposed algorithm is definitely ...
0
votes
6answers
170 views

How can we compare the number was less than

Edit I want to get the divisor of natural numbers N. for (int i=1;i<n/2;i++) if(n%i==0) print(i); How can we compare the number was less than n/2 ? I wants to find all the factors in less ...
2
votes
2answers
188 views

I am looking for an algorithm that calculates the power of a number. (x^y), x and y are integers . It must be of complexity O(log[n]))

Currently, my best effort has resulted in complexity O(log[n]^2): int power(x,n) { int mult=1, temp=x, i=1, j=1; while (n>1) { mult=mult*x; x=temp; for (i=1;i<=log[n];i++) ...
15
votes
9answers
3k views

Finding the closest fibonacci numbers

I am trying to solve a bigger problem, and I think that an important part of the program is spent on inefficient computations. I need to compute for a given number N, the interval [P, Q], where P is ...
-5
votes
3answers
1k views

How to find nth prime with complexity o(1)

How to find nth prime number with complexity o(1)
4
votes
4answers
10k views

What is the big-O of the function (log n)^2 + logn

What is the big-O complexity of the function (log n)k for any k?
7
votes
1answer
2k views

What is the complexity of the log function?

What is the complexity of the log base 10 function?
3
votes
1answer
11k views

Solving the recurrence relation T(n) = √n T(√n) + n [closed]

Is it possible to solve the recurrence relation T(n) = √n T(√n) + n Using the Master Theorem? It is not of the form T(n) = a ⋅ T(n / b) + f(n) but this problem is given in the ...
10
votes
2answers
525 views

“K-transformed” permutations

I have been banging my head against this problem for days, and searched exhaustively online for any hints on how to solve it. If you enjoy mathematically oriented programming problems, please take a ...
1
vote
1answer
1k views

Computational complexity of the FFT in n dimensions

What is the computational complexity of the n-dimensional FFT with m points along each dimension?
2
votes
2answers
556 views

Minimize the remainder in the chinese remainder theorem

I have multiple sets containing multiple congruences. I am trying to find the smallest remainder when applying the Chinese remainder theorem on one item from each set. For example with 2 sets: Set ...
3
votes
7answers
3k views

Find the maximum interval sum in a list of real numbers

Here's an interview questions that a colleague asked for a programming position. I thought this was great for watching the interviewee think it through. I'd love to get responses for how the SO ...
10
votes
2answers
249 views

Why does list length reduce to sqrt(n) after each comparison in interpolation search?

According to the book I'm reading, interpolation search takes O(loglogn) in average case. The book assumes that each compare reduce the length of the list from n to sqrt(n). Well, it isn't difficult ...
1
vote
2answers
562 views

Complexity of subset product

I have a set of numbers produced using the following formula with integers 0 < x < a. f(x) = f(x-1)^2 % a For example starting at 2 with a = 649. {2, 4, 16, 256, 636, 169, 5, 25, 649, 576, ...