# Tagged Questions

In mathematics, a recurrence relation is an equation that recursively defines a sequence, once one or more initial terms are given: each further term of the sequence is defined as a function of the preceding terms.

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### partition recurrence relation understanding

Determine if there is a subset of S that sums to floor(N/2) floor. Given S = {3,1,1,2,2,1}, a valid solution to the partition problem is the two sets S1 = {1,1,1,2} and S2 = {2,3}. Let: p(i, j) be ...
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### Solving a complex recurrence relation for the Traveling Salesman

I need to solve the exact time complexity for the brute force version of the Traveling Salesman using a recurrence relation. I've worked out the recurrence relation to be as follows: ...
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### coin change recurrence solution

Given a value N, if we want to make change for N cents, and we have infinite supply of each of S = { S1, S2, .. , Sm} valued coins, how many ways can we make the change? The order of coins doesn’t ...
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### Master Theorem Case 3 Example Algorithms

While learning the Master theorem I'm having trouble coming up with a real-world algorithm as an example, whose recurrence strategy would fall into Case 3. Can you suggest any links where I can read ...
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### Resolution easy recurrence equation

I have to find the recurrence equation of following function. public static boolean f(int[] a) { return fr(a, 0); } private static boolean fr(int[] a, int i) { int n = a.length; if(i ...
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### Finding the recurrence equations of a function

I have to find the recurrence equations of the following function: static int f(int[] a, int inf, int sup) { if(sup == inf) return a[inf]; if(sup == inf+1) return a[inf] + ...
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### Analyzing time complexity using recurrence relations

Complexity analysis noob here. I'm trying to figure out the time complexity of a recursive algorithm using the given recurrence relation below - T(n) = n + 4T(n/2) There are three methods for ...
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### time complexity of relation T(n) = T(n-1) + T(n/2) + n

for the relation T(n) = T(n-1) + T(n/2) + n can I first solve the term (T(n-1) + n) which gives O(n^2), then solve the term T(n/2) + O(n^2) ? according to the master theorem which also gives ...
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### Master Theorem confusion with the three cases

I know that we can apply the Master Theorem to find the running time of a divide and conquer algorithm, when the recurrence relation has the form of: T(n) = a*T(n/b) + f(n) We know the following : ...
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### How to forward substitution with induction using recurrence relations

I am trying to learn how to do forward substitution with induction Question T(n) = 3T(N/7) for n>1,n a power of 7, T(1)=1 What i have so far t(7) = 3T (7/7) = 3T(1) = 3(to power of 1) = ...
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### Running Time of GCD Function Recursively (Euclid Algorithm)

I have only been able to find posts about how to implement the gcd function both recursively and iteratively, however I could not find this one. I am sure it's on Stackoverflow however I could not ...
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### Solving recurrence T(n) = T(n/5) + T(7n/10) + Θ(n)

I want to solve this recurrence with an accuracy of Θ: T(n) = T(n/5) + T(7n/10) + Θ(n) I can solving typical recurrence but I don't know what to do with this one as it doesn't match to any case of ...
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### Computing for the closed form of a recurrence relation: Fractions

With the given: T(1) = 1 How would you compute for the closed form of T(n) = T(n/4) + 1? The way I would answer this is: T(n) = T(n/4) + 1 T(n) = T(n/8) + 1 + 1 T(n) = T(n/16) + 1 + 1 + 1 and so ...
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### Is my recurrence relation correct for mixture formation?

Harry Potter has n mixtures in front of him, arranged in a row.Each mixture has one of 100 different colors (colors have numbers from 0 to 99). He wants to mix all these mixtures together. At each ...
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### Find the i-th greatest element

I want to use a Divide-and-Conquer procedure for the computation of the i-th greatest element at a row of integers and analyze the asymptotic time complexity of the algorithm. Algorithm ...
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### Find the recurrence relation for the following Graph Theory function

Can anyone please give me the recurrence relation for the following function? Let the graph contain n nodes. This function is called n times from the main function as a for(i=1 to n) ...
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### Figuring out The Big O Notation/Recurrence Relation From My Old Algorithm

**Hi all, I have a question about recurrence relation/ Big O notation. I was given a homework assignment that asked me to give the Big O notation of some of my old code/ Algorithms that I came up ...
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### algorithm for the 0-1 Knapsack with 2 sacks?

formally, say, we have 2 sacks with capacities c1 and c2. There are N items with profits pi and weights wi. As in 0-1 Knapsack problem, we need to fill in c1 and c2 with these items in such a way the ...
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### Recurrence relation on Factorial

I was studying recurrence by a slide found at (slide 7 and 8): http://www.cs.ucf.edu/courses/cop3502h/spring2012/Lectures/Lec8_RecurrenceRelations.pdf I just can't accept (probably I`m not seeing ...
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### finding the rth term of a sequence

the question is to give a possible formula for the rth term. i'm able to solve two questions but rest i can't seems to be of a different way or like weird.as i'm studying alevels i think there's a ...
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### Recurrence relation for this recursive algorithm

I have been asked to find the recurrence function and then determine the asymptotic complexity. I will use the substitution method. A is array[1..n] `>MIN(left, right) is: if left==right ...
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### Maximum number of distinct inversions in an array

Given an array A of n integers, we say that a pair of indices i<j∈[n] is an inversion in A if A[i]>A[j]. What is the maximum number of distinct inversions that A can have? Is it a) n - 1 b) n ...
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### Is my recurrence relation right for subset sum?

Is this recurrence relation correct for the subset sum problem? Statement: Print Yes or No depending on whether there is a subset of the given array a[ ] which sums up to a given number n. dp[i][j] ...
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### Solving recurrence equation without the Master's Theorem

So, on a previous exam, I was asked to solve the following recurrence equation without using the Master Theorem: T(n)= 9T(n/3) + n^2 Unfortunately, I couldn't figure it out on the exam, so I used ...
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### Writing a Recurrence Relation

I've been reading a lot about recurrence relations and I am trying to come up with recurrence relations to these two algorithms: A sort algorithm that chops the list in fourths and repeatedly sorts ...
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### How to find the recurrence formula of an algorithm?

I'm currently talking an algorithms class and really struggling to understand how to even come up with recurrence formulas. say i have a a double nested for loop algorithm for finding the sum of ...
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### Solving T(n) = 4T(n/2)+n² [closed]

I am trying to solve a recurrence by using substitution method. The recurrence relation is: T(n) = 4T(n/2)+n2 My guess is T(n) is Θ(nlogn) (and i am sure about it because of master theorem), and ...
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### complexity calculation for recurrence relation

Solve the recurrence relation without using the masters theorem T(n)=2T(n/2)+log2^n ( the base for the log is n). I have tried solving it but couldnot end up with a proper time complexity
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### What is the Difference between T(n) (reccurence relations), Big O and Big Theta

I am wondering about this for my Algorithm class. It seems to be unclear what the difference is between BigO, Big Theta, and Recurrence relations (T(n)) For example: T(n) = 4T(n/3) + O(1)
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### Median of median algorithm recurrence relation

I know that the linear select (median of medians algorithm) recurrence equation is as follows: T(n) <= an + T(n/5) + T(7n/10) But where do these terms come from? I've been trying to ...
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### Recurrence relation of an algorithm

void doSomething(int *a, int left, int right){ if (left == right){ for (int j = 0; i < right; ++j) cout << a[j]; cout << endl; return; } for (int i = ...
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### Proving a tricky Recurrence Relation for the k + 1 case

I am absolutely stumped on this one. T(n) = { 3, if n = 2 || T(n - 1) + (n/4), if n > 2 Prove by induction that T(n) = (n^2 + n + 18) / 8 [V n >= 2] I know how to execute a proof by ...
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### Solving recursive sequence

Lately I've been solving some challenges from Google Foobar for fun, and now I've been stuck in one of them for more than 4 days. It is about a recursive function defined as follows: R(0) = 1 R(1) = ...
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### Recurrence Relation: Find Big O

I've been working on these recurrence relations but I'm stumped on this one. T(n) = 2T(n/4) + T(n/2) + n^2 I've seen them with one recursive call but not with two.
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### Recurrence relation in Josephus problm

The josephus problem can be solved by the below recursion: josephus(n, k) = (josephus(n - 1, k) + k-1) % n + 1 josephus(1, k) = 1 How this recurrence relation has been derived?
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### Find the recurrence relation

I'm new to recurrence relations and I'm having trouble figuring out this problem: Find a recurrence relation for the number of ways to make a stack of green, yellow, and orange napkins so that no two ...
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I am working on a new implementation of the operators in http://www.thalesians.com/archive/public/academic/finance/papers/Zumbach_2000.pdf EDIT: clearer explanation here: ...
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### Recurrence relation - what sum is it?

I need to solve: T(n) = T(n-1) + O(1) when I find the general T(n) = T(n-k) + k O(1) what sum is it? I mean when I reach the base case: n-k=1; k=n-1 Is it "sum k, k=1 to n"? but the result of this ...
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### Mergesort recurrence formulas - reconciling reality with textbooks

I think this is more programming than math, so I posted here. All the java algorithms in my question come from here. We have an iterative and recursive merge sort. Both using the same merge ...
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### Simple recurrence in C++

Simple RecurrenceMax. Score 0 Our hero - Alex has been working on a research for a week. And he has recently gotten a recurrence relation for solving a part of that research. But he has no ...
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### Converting a recursive formula back to the original explicit formula?

There is a generic formula Z^N = A(Z)^N+1 + B(Z)^N+1 . This formula is used to convert a given recursive function back to its original explicit form : Recursive Formulas : 1) R(0) = 1, R(n) = (1/3) ...
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### Solving recurrence T(n) = 2T(n/2) + Θ(1) by substitution

So I am pretty sure it is O(n) (but it might not be?), but how do you solve it with substitution? If you assume T(n) <= c * n, what is the induction steps?
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### What should be the optimal way of solving Recurrence relation for really Huge number greater than Integer maximum value

I want to find the Nth number of the Recurrence Equation T(n)=T(n-1)+3T(n-2)+3T(n-3)+(n-4),T(1)=T(4)=1,T(2)=T(3)=3 so if suppose you entered 2,5,9 as input, output should be ...
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### How to define a general recurrence function in Clojure

I had an idea for a general function for recurrence relations in Clojure: (defn recurrence [f inits] (let [answer (lazy-seq (recurrence f inits)) windows (partition (count inits) 1 ...
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### How to solve this recurrence relations?

I am trying solve this recurrence relations. I read a similar question in this site but it wasn't my answer. T(n)=T(sqrt(n)) if n>4 T(n)=1 if n=4 thanks in advance.
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### Recurrence Relation based off Pseudo Code (Time complexity)

Consider the element uniqueness problem, in which we are given a range, i, i + 1, . . . , j, of indices for an array, A, and we want to determine if the elements of this range, A[i], A[i+1], . . . , ...
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### recurrence-relation: upper & lower bound

Given my recurrence relation, an = 2 * 3^(n−1) − 1/2 − (−1)^n/2 Without solving it, would a good guess for an upper bound be O(3^n)? Considering that is the largest term, this seemed reasonable. ...
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### Writing a recurrence relation for a sorting algorithm

I'm learning about recurrence relations at the moment. I can solve them and figure out the bounds on them, but what I'm not really sure of is how to come up with a recurrence relation for a particular ...