Questions tagged [landau-notation]
Questions about asymptotic notations such as Big-O, Omega, etc.
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Is $n^{1.03} = \Omega(n \log \log n)$?
We had this problem on our Algorithms final. It threw me off because if $\log$ is $\log_2$ then graphing the function shows this is not true, but if $\log$ is $\log_{10}$ then it looks like it is. How ...
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Upper bounding this expression
I need to prove that the following expression is $\mathcal O(n \log n)$ with the substitution method: $$ T(n) \leq 3\log n + n + \frac{6}{n}\sum^{n - \frac{\log n}{3}}_{i=\frac{\log n}{3}} T(i)$$
This ...
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Proving an asymptotic bound with induction
Suppose we want to prove by induction that $f(n) \in \Theta(g(n))$. How should the induction proof be set up? I'm tempted to say that the base case should prove that $f(1) \in \Theta(g(1))$ and the ...
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Is $n=\Theta(n^{1+o(1)})$?
Is $n=\Theta(n^{1+o(1)})$?
To me it appears to be true as $n$ tends to infinity $n^{o(1)} =0$.
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Finding the constants in Landau notation
I am trying to find the constants $n_0$ and $c$ to show that some given functions belong to the $O(\cdot)$ equivalence class. But, while it seems easy, I am not sure whether I am allowed to do what I ...
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Trying to understand the basic about recurrence trees
I have little background on recurrence trees, and I am working on the following exercise:
Exercise. Take $T(n) = 2T(n/2) + 3\log(n)$. Draw the recurrence trees for $n=2$ and $n=4$. What can we ...
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Linearity property of summation applied to Big Theta notation (CLRS math background appendix)
Section A.1 of the Mathematical Appendix of the CLRS, the third edition, page 1146, contains the following formula stating linearity property of summation applied to $\Theta$ notation:
$$
\sum_{k=1}^{...
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Shifted Big Os. How to say O((n+c)!) = O(n!)?
Suppose an algorithm is $O(n!)$, but we need to run it $n$ times, so the total complexity is
$nO(n!) = O(n \cdot n!) = O((n+1)! - n!) = O((n+1)!)$
Strictly, there is no constant factor that would make ...
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Prove that $ln(n)^r \in o(n^p)$ for $p>0$ and $r\in \mathbb{R}$
I am trying to proof $f\in o(g)$
Let be $r,p\in \mathbb{R}$ with $p>0$
We have $f(n)=ln^r (n)$ and $g(n)=n^p$
I have already proofed that $ln(n)\in o(n)$ via l'Hospital
$\lim\limits_{n\to \infty}\...
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Equivalene of big O definitions (Limit Definition $\Longleftrightarrow$ Quantifier Definition)
I need to proof, that both definitions of the Big 0 notation are equiavlent, but I am not sure if my proof works both ways of the equivalence.
Definitions:
Let f,g be functions.
$f(n)\in \mathcal{O}(...
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Does a function $f$ exists such that: $f(n-k) \ne \Theta(f(n))$ for some constant $k\geq1$?
I have encountered the following question in my homework assignment in Data Structures course:
"Does a function $f$ exists such that: $f(n-k) \ne \Theta(f(n))$ for some constant $k\geq1$ ?"
...
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Why is $\sum_{i=0}^n\sqrt{i}\log_2^2i \geq \Omega(n\sqrt{n}\log_2n)$?
Where $\Omega(f)$ denotes the set of functions with f as lower bound, why is $\sum_{i=0}^n\sqrt{i}\log_2^2i \geq \Omega(n\sqrt{n}\log_2n)$?
How can the function on the left be compared to a whole set?...
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Show that $O(\text{max}\{f(n),g(n)\})=O(f(n)+g(n))$
Show that $O(\text{max}\{f(n),g(n)\})=O(f(n)+g(n))$
Can I keep the same constant $c$ in each of the cases?
Consider two cases:
$$1)f(n)>g(n);O(\text{max}\{f(n),g(n)\})⇒O(f(n))\Rightarrow d(n) ≤c⋅...
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How do I prove that $3x^3 +2x + 1 $ is $\omega(x \cdot \log x) $
I am trying to answer this question:
$3x^3 +2x + 1$ is $ \omega(x \cdot \log x)$
My question is how to solve this question.
Here is what I have tried so far:
I applied the definition $3x^3 + 2x + 1 ...
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Prove little o with just the definition
I have been searching for a while now but couldn't find anything about this exact pair of functions with the little $\mathcal{o}$ notation.
Given the functions $f(n) = 2^{n}$ and $g(n) = n!$ I am ...
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O nation prove with limit theroem? [duplicate]
I'm working on my school homework,even though i found all three of these. It says use limit to compare. I confused , what should i do, i mean its obvious C A B
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Big O Tires Question? [duplicate]
My question is regarding the last paragraph of this excerpt from "Cracking the Coding Interview." (For some reason, my table is not formatting here.)
What's the runtime of this code?
...
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How to tackle Big O proofs that involve multiple parameters
I am getting more and more familiar with the whole concept of time complexity but I have never encountered an example where more than one parameter is involved. Therefore, is it possible(well, I am ...
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Asymptotic growth of a function containing a sum
How to compare the asymptotic growth of a function containing a sum with another function? I'm not sure how I'm supposed to dissolve the sum. Usually I just take the limis of f(x)/g(x). If that fails ...
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Is this a correct way to thing about asymptotic notations?
I am reading a book on algorithms. It says that $2n^2+3n+1=2n+\Theta(n)$. For a person like me who has studied some set theory but not from axioms, this notation seems a bit insane. I was wondering ...
guest
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Induction proofs in Big-O notation
I'm not sure how go about this question:
Prove the following inequality. For a correct proof, we require a value of the constant $c>0$ and an $n \in \mathbb N$, such that $\forall n>N : f(x)<...
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How do I simplify $O\left({n^2}/{\log{\frac{n(n+1)}{2}}}\right)$
I'm not very certain about how to deal with asymptotics when they are in the denominator. For $$O\left(\frac{n^2}{\log{\frac{n(n+1)}{2}}}\right)$$, my intuition tells me that it should be treated in a ...
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Is O((n^2)*log(n)) greater than O(n^(2.5))?
I know that $O(n^2\times \log(n))$ is greater than $O(n^2)$, but is $O(n^2\times \log(n))$ greater than $O(n^{2.5})$?
Samuele Bianchi
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Summation of asymptotic notation
How can we solve summation of asymptotic notations like given below:
$$
\sum_{k=1}^{n-1} O(n).
$$
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When are log complexities considered equivalent?
Would we consider $O(\log_2(n))$ to be the same complexity as $O(\log_2(n-1))$?
Why or why not? I'm specifically wondering about how the number we take the log of affects the time complexity.
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Why is $\sum_{i=1}^n O(i)$ not the same as $O(1)+O(2)+\dots+O(n)$?
The well-known textbook Introduction to Algorithms ("CLRS", 3rd edition, chapter 3.1) claims the following:
$$ \sum_{i=1}^n O(i) $$
is not the same as (I'm not using DNE because the book explicitly ...
Padaca
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Substitution for Landau's O notation formula
I found the following description when I was reading a paper on computational complexity theory.
This can be done ... in time 2n・poly(logs,n)+2O(logs)c. For s≤2no(1), the runtime is 2n・poly(n).
I ...
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which rule can conduct this formula $\log n = O(n^{0.000001})$? [duplicate]
i am learning this post about Big O, which gives this formula
$$\log n = O(n^{0.000001})$$
why is that?
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Run time of pseudo code in big theta notation [duplicate]
I am looking for the run time of the following pseudo code.
...
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How can i prove this asymptotic comparison? [duplicate]
This is an exercise that's part of my assignment, but it is optional and flagged as a "challenge". I would like to discuss its solution:
Prove that: $$ 27\log{n} + \sqrt{n} = \theta(\sqrt{n})$$
...
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If my algorithm has complexity O(n!*n), can I just write O(n!), or do I have to keep it like O(n!*n)?
Just as I asked in the title: if my algorithm has complexity $O(n!\times n)$, can I just write $O(n!)$, or I have to keep it like $O(n!\times n)$?
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Proving Big Omega of a polynomial without limits
Here is the definition of $\Omega$:
$f(n) = Ω(g(n))$ iff there exist positive constants $c$ and $n_0$ such that $f(n) \ge cg(n)$ for all $n\ge n_0$.
Here is one theorem:
If $f(n) = a_m n^m + \...
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What is wrong with this solution for $\mathcal{O}({\log({n \choose \frac{n}{2}})})$?
In this recitation on MIT OCW, the instructor uses Stirling's approximation to calculate that
$\mathcal{O}({\log({n \choose \frac{n}{2}})}) = \mathcal{O}(n)$.
However, I went through the following ...
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Asymptotic relation between n! and (n+1)!
I am having difficulty writing this formally. I know that by L'Hospital's rule we can reduce it to $\lim_{n \to \infty} \frac{n+1}{n}$ which is a constant and hence $n = \theta (n+1)!$. But I am not ...
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Are the following Big Oh Notations equivalent?
In the context of Upper bounds computaion and Big Oh Notation, I was wondering if the following could be proved... if they are equivalent.
$\mathcal{O}((log(n))^{-1}) = (\mathcal{O}(log(n)))^{-1}$
$\...
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O(·) is not a function, so how can a function be equal to it?
I totally understand what big $O$ notation means. My issue is when we say $T(n)=O(f(n))$ , where $T(n)$ is running time of an algorithm on input of size $n$.
I understand semantics of it. But $T(n)$ ...
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How come O(n) + O(logn) = O(logn)
How come O(n) + O(logn) = O(logn)?
When talking for example about an algorithm that has two operations. One of them takes O(n) and the other O(logn) and in the end we say that the total complexity is ...
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Is this a valid use of big-O notation?
Suppose that $m=O(n^{c+1/2})$ for some real $c>0$ and $x=O(\sqrt{\log m})$. Are the following two computations valid? I understand that I'm abusing notations a bit to get at the desired results.
...
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Introductory explanation of the Big-Oh properties
I've noticed that Big-Oh notation actually has some properties such as summation, product but i couldn't find an introductory explanation for their use or how they can help to solve asymptotic ...
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How to prove $\Theta(g(n))\cup o(g(n))\ne O(g(n))$
How to prove $\Theta(g(n))\cup o(g(n))\ne O(g(n))$ ?
Is there a simple example for understanding? Seems there's a gap between $O(g(n))- \Theta(g(n))$ and $o(g(n))$ just from the definition. But I ...
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Is this correct in term of big-oh notation: given $g = O(f)$ and $h = O(f)$ can we say $g = O(h)$?
We have two equations $g = O(f)$ and $h = O(f)$ , then can we derive that $g = O(h)$.
I came up with following proof but i dont know it's correct or not.
$$g = O(f)$$
$$g \le c_1*f $$
$$h \le c_2*f $$
...
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Asymptotic Notation Analysis
2^n=O(3^n) : This is true or it is false if n>=0 or if n>=1
since 2^n may or not be element of O(3^n)
I need a hint to figure the problem
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complexity class of functions [duplicate]
What would these statements mean if f(n) and g(n) are functions over natural numbers?
g(n) is in Θ(f(n)).
and
An algorithm is in the complexity class Θ(f(n)).
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What is the constant $C$ in the definition of asymptotic notations?
For example in the definition of $\Theta$:
$f(n) = \Theta(g(n)$ if there exist positive constants $c_1, c_2$ and $n_0$ such that
$$ 0 \leq c_1 \cdot g(n) \leq f(n) \leq c_2 \cdot g(n) \text{ for ...
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How can I find $\Theta(log(m_1)+...+log(m_k))$ as related to $m$?
given:
$$m_1+m_2+...+m_k=m$$
How can I find $\Theta(log(m_1)+...+log(m_k))$ as related to $m$?
I know that i can doing that: $O(log(m_1)+...log(m_k))=O(log(m)+...+log(m))=O(k \cdot log(m))$ , but ...
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Complexity Reduction Analysis
I am struggling to grasp fully grasp complexity reductions, I have this example that I am working through and can not fully comprehend how to determine the complexity of one algorithm given the ...
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Two questions about complexity class
Does $2^{n-1}$ and $2^{n}$ share the same complexity complexity class as exponential named as $O(2^n)$? So the former belongs to $O(2^n)$ even though it's one order lower?
What is the name of the ...
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Is $T(n) = Ω (n^2)$ the same as $n^2=O(T(n))$?
Question: In the problem below, does proving $T(n) = O(n^2)$ and $n^2 = O(T(n))$ lead to the same result as proving $T(n)=O(n^2)$ and $T(n)=Ω (n^2)$? Which would be the better approach to take? I feel ...
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If $f(n)=\omega(h(n))$ and $g(n)=o(h(n))$ then is $f(n)=\Theta(g(n))$?
My question is exactly what the title says. If I have that $f(n)=\omega(h(n))$ and $g(n)=o(h(n))$ hold, then does $f(n)=\Theta(g(n))$ hold as well? My intuition says that the second part is false, but ...
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Big O understanding given different input sizes
I have a question about big O notation. Let's say I have 3 algorithms which, for an input of size $n$, have time complexity $O(n)$, $O(n^2)$ and $O(n \log n)$, respectively. Assume that all 3 ...
