I need to calculate the sum of all k-sized sub-arrays in an array using sliding window algorithm. Is that a valid sliding window algorithm? If not, why?

var sumOfSubArrays = function(arr, k) {
    let currentSubArray = 0;
    for(let i=0; i<k; i++) {
        currentSubArray += arr[i];

    let sum = currentSubArray;

    for(let i=0; i<arr.length-k; i++) {
    sum += currentSubArray - arr[i] + arr[i+k];
    currentSubArray = currentSubArray - arr[i] + arr[i+k];

    return sum;

let arr = [1,2,3,4,5]
let k = 3;

console.log(sumOfSubArrays(arr, k));

Should return 27

  • 1
    This feels like this would be better suited for codereview.stackexchange.com? What's the issue you're having with the code? Sep 22, 2023 at 18:17
  • There is no issue, it works, but I want to know if what i wrote here is a sliding window algorithm and what is the time and space complexity of this code
    – Alekam
    Sep 22, 2023 at 18:22
  • You seem to ask whether the current approach is 'valid'. What do you mean with that if the code does seem to work?
    – Mast
    Sep 22, 2023 at 19:17
  • I mean is this code a sliding window algorithm?
    – Alekam
    Sep 22, 2023 at 19:21

2 Answers 2


I analysed your code and it is actually window sliding algorithm, but done in a bit different way than I'm used to. I'd do it by moving the "window" a bit differently and not going from 0 index twice, but from the last visited index.

Difference is on how we move "the tail" - I move it by subtracting "k" and you by adding it.

My way of doing it would be this:

// O(n) solution for finding sum of all k-sized sub-arrays of size k using window sliding algorithm
function sumOfSubArrays(arr, k) {
    let arrayLength = arr.length;
    let sum = 0;
    let finalSum = 0;
    // Find initial sum of first k elements
    for (let i = 0; i < k; i++) {
        sum += arr[i];
        finalSum = sum;
    // Iterate the array once and increment the right edge
    for (let i = k; i < arrayLength; i++) {
        // Moving "window" to next element 
        sum += arr[i] - arr[i - k];

        // Add a sum of new sub-array to finalSum;
        finalSum += sum;
    return finalSum;

let arr = [1, 2, 3, 4, 5]
let k = 3;

console.log(sumOfSubArrays(arr, k));

  • Could you explain why is my code iterating through the array twice?
    – Alekam
    Sep 22, 2023 at 19:32
  • I updated my answer above.
    – Ben
    Sep 22, 2023 at 19:44
  • I tested it on some other inputs and it seems to be working as well.
    – Alekam
    Sep 22, 2023 at 19:49
  • You can also see that in the code that I provided we're not "visiting" the same index twice in the loops. We "visit" every index (or a window) just once and that is the point of window sliding algorithm, to not go back - but to move forward and not revisit. Your question was is this window sliding algorithm and I answered it. It is not, because of the way you implemented it. It produces right results, but it is not right implementation of window sliding algorithm. I hope my code makes it clearer. I updated my answer.
    – Ben
    Sep 22, 2023 at 19:51
  • So what's the complexity of my code if i may ask?
    – Alekam
    Sep 22, 2023 at 19:57

Reduce the array, as long as the index is lesser than k just add the current number to the total, and subTotal. Afterwards calculate the newSubTotal by adding the current number to the last newSubTotal, and removing the 1st number used for creating the previous subTotal. Add the newSubTotal to the total to get the new total.

const sumOfSubArrays = (arr, k) =>
  arr.reduce(([total, subTotal], n, i) => {
    // calculate the base total and subTotal
    if(i < k) return [total + n, subTotal + n];
    // sliding window
    const newSubTotal = subTotal + n - arr[i - k];
    return [total + newSubTotal, newSubTotal]
  }, [0, 0])[0];

const arr = [1, 2, 3, 4, 5]
const k = 3;

console.log(sumOfSubArrays(arr, k));

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