I have a really simple question, I have this loop:
for (int i=0; i<n; i++) {
"some O(n) stuff here)"
}
what will be the BEST time complexity of this algorithm?
O(n)? (for loop O(1) * O(n) stuff)
or
O(n^2)? (for loop O(n) * O(n) stuff inside the loop)
Will the for loop itself be considered as O(n) as normally, or will it be considered as O(1)
since it will only make only 1 loop for the BEST case scenario?
You are right, the best time complexity is O(N) (and even Θ(N)), if the best running time of "stuff" is constant (even zero).
Anyway, if "stuff" is known to be best case Ω(f(N)), then the best total time is Ω(N f(N)).
If your loop is doing O(n) stuff for n times then the time complexity will be O(n^2). May you call it worst case. The best case and average case will be based on your some O(n) stuff that is executed with every iteration of your loop.
Lets take a simple example of bubble sort algorithm:
for (int i = 0; i < n - 1; ++i) {
for (int j = 0; j < n - i - 1; ++j) {
if (a[j] > a[j + 1]) {
swap(&a[j], &a[j + 1]);
}
}
}
Time complexity this will always be O(n^2), whether array is sorted (irrespective of order - ascending or descending) or not.
But this can be optimised by observing that the nth pass finds the nth largest element and puts it into its final place. So, the inner loop can avoid looking at the last n − 1 items when running for the nth time:
for (int i = 0; i < n - 1; ++i) {
swapped = false;
for (int j = 0; j < n - i - 1; ++j) {
if (a[j] > a[j + 1]) {
swap(&a[j], &a[j + 1]);
swapped = true;
}
}
if (swapped == false) {
break;
}
}
Now the best case time complexity is O(n) i.e. when the array is sorted in ascending order (in context of above implementation). Average and worst case are still O(n^2).
So, to identify the best case time complexity of your algorithm you have to show us the implementation of some O(n) stuff and if not implementation then at least show the algorithm that you are trying to implement.
As you stated it, it's O(n^2).
'Cause You are doing n times a O(n) operation.
Related
Would the following code be considered O(1) or O(n)? The for loop has constant complexity which runs 10 times but I'm not sure whether the if condition would be considered O(n) or O(1).
for (i = 0; i < 10; i++)
{
if (arr [i] == 1001)
{
return i;
}
}
The complexity would be O(1), because regardless of how much you increase the input the complexity of the algorithm remains constant. Namely, the operations performed inside that loop are considered to have constant time, hence O(1).
for (i = 0; i < 10; i++)
{
if (arr [i] == 1001)
{
return i;
}
}
On the other hand if your loop was:
for (i = 0; i < 10; i++)
{
f(n)
}
and the function f(n) had a complexity of O(n) then the complexity of the entire code snippet would be O(n) since 10 * N can be labeled as O(n).
For a more in depth explanation have a look at What is a plain English explanation of “Big O” notation?
I want to detect the time complexity for this block of code that consists of 2 nested loops:
function(x) {
for (var i = 4; i <= x; i++) {
for (var k = 0; k <= ((x * x) / 2); k++) {
// data processing
}
}
}
I guess the time complexity here is O(n^3), could you please correct me if I am wrong with a brief explanation?
the time complexity here is O(n^2). Loops like this where you increment the value of i and k by one have the complexity of O(n) and since there are two nested it is O(n^2). This complexity doesn't depend on X. If X is a smaller number the program will execute faster but still the complexity stays the same.
Can there be an algorithm with two loops (nested) such that the overall time complexity is O(log(log n))
This arised after solving the following :
for(i=N; i>0; i=i/2){
for(j=0; j<i; j++){
print "hello world"
}
}
The above code has time complexity of N. (Using concept of Geometric Progression). Can there exists similar loop with time complexity O(log(log n)) ?
For a loop to iterate O(log log n) times, where the loop index variable counts up to n, then the index variable has to grow like the inverse function of log log k where k is the number of iterations; i.e. it has to grow like 2^2^k, or some other base than 2.
One way to achieve this is by starting at 2 and repeatedly squaring until you reach n - if the index variable is (((2^2)^2)...^2) with k squarings, then this equals 2^2^k as required:
for(int i = 2; i < n; i = i*i) {
//...
}
This loop iterates O(log log n) times, as required. If you absolutely must do it with nested loops, we can trivially add an extra loop which iterates O(1) times, leaving the total number of iterations asymptotically the same:
for(int i = 2; i < n; i = i*i) {
for(int j = 0; j < 10; j++) {
// ...
}
}
I have just started to learn time complexity, but I don't really get the idea, could you help with those questions and explain the way of thinking:
int Fun1(int n)
{
for (i = 0; i < n; i += 1) {
for (j = 0; j < i; j += 1) {
for (k = j; k < i; i += 1) {
// do something
}
}
}
}
void Fun2(int n){
i=o
while(i<n){
for (j = 0; j < i; j += 1) {
k=n
while(k>j){
k=k/2
}
k=j
while(k>1){
k=k/2
}
}
}
int Fun3(int n){
for (i = 0; i < n; i += 1) {
print("*")
}
if(n<=1){
print("*")
return
}
if (n%2 != 0){
Fun3(n-1)
}
else{
Fun3(n/2)
}
}
for function 1, I think its Theta(n^3) because it runs at most
n*n*n times but I am not sure how to prove this.
for the second I think its Theta (n^2log(n))
I am not sure
Could you help, please?
First a quick note, in Fun2(n) there should be a i++ before closing the while loop, anyway, time complexity is important in order to understand the efficiency of your algorithms. In this case you have these 3 functions:
Fun1(n)
In this function you have three nested for loops, each for loops iterates n times over a given input, we know that the complexity of this iteration is O(n). Since there are three nested for loops, the second for loop will iterate n times over each iteration of the outer for loop. The same will do the most inner loop. The resulting complexity, as you correctly said, is O(n) * O(n) * O(n) = O(n^3)
Fun2(n)
This function has a while loop that iterates n times over a given input. So the outer loop complexity is O(n). Same as before we have an inner for loop that iterates n times on each cycle of the outer loop. So far we have O(n) * O(n) which is O(n^2) as complexity. Inside the for loop we have a while loop, that differs from the other loops, since does not iterate on each element in a specific range, but it divides the range by 2 at each iteration. For example from 0 to 31 we have 0-31 -> 0-15 -> 0-7 -> 0-3 -> 0-1
As you know the number of iteration is the result of the logarithmic function, log(n), so we end up with O(n^2) * O(log(n)) = O(n^2(log(n)) as time complexity
Fun3(n)
In this function we have a for loop with no more inner loops, but then we have a recursive call. The complexity of the for loop as we know is O(n), but how many times will this function be called?
If we take a small number (like 6) as example we have a first loop with 6 iteration, then we call again the function with n = 6-1 since 6 mod 2 = 0
Now we have a call to Fun3(5), we do 5 iteration and the recursively we call Fun3(2) since 5 mod 2 != 0
What are we having here? We having a recursive call that in the worst case will call itself n times
The complexity result is O(n!)
Note that when we calculate time complexity we ignore the coefficients since are not relevant, usually the function we consider, especially in CS, are:
O(1), O(n), O(log(n)), O(n^a) with a > 1, O(n!)
and we combine and simplify them in order to know who has the best (lowest) time complexity to have an idea of which algorithm could be used
I am currently studying to an examen in algorithms and I am trying to solve a question about time complexity in java, but can't really figure out how to do it. I am suppose to calculate the expected time complexity. N is a positive integer.
for (int i=0; i < N; i++)
for (int j=i+1; j < N; i++) {
int x=j+1; int h=N-1; int k;
while(x<h) {
k=(x+h)/2;
if (a[i]+a[j]+a[k] == 0) { cnt++; break;}
if (a[i]+a[j]+a[k] < 0) x=k+1;
else h=k-1;
}}
The first for loop should run N times and the second should run N-1. Since x is j+1 I guessed that x= N-2. I dont know how to think after that with the while loop or if I have done anything right. Would really appreciate help!
Create your time complexity function in parts.
for (int i=0; i < N; i++) //Takes linear O(n)
for (int j=i+1; j < N; i++) { //Takes linear O(n) and in computer science we can safely assume -1 is irrelevant at N-1 in big O notation
int x=j+1; int h=N-1; int k; // 3 x O(1)
while( x < h ) { // Worst case is when j equals i + 1 where i = 0 so x is at lowest 2 and h equals to N-1 so h depends on N. So again loop takes linear O(n) time.
k=(x+h)/2; // Takes O(1) time
if (a[i]+a[j]+a[k] == 0) { // Takes O(1) time and if this gives true we do break from the while loop
cnt++; // Takes O(1) time
break; // Takes O(1) time
}
if ( a[i]+a[j]+a[k] < 0 ) { // Takes O(1) time
x=k+1; // Takes O(1) time
} else {
h=k-1; // Takes O(1) time
}
}
}
}
So in summary T(N) equals to O(N^3) and Ω(N^2)
More specific T(N) = N * N-1 * N-2 + 10 and this last while loop in avarage takes O(N/2) time but still in computer science it is same as O(N).
We are only interested in worst and best cases.
To confuse even more big O notation actually
T(N)=O(g(N)) means this:
I hope this answer helps even little bit...