Remove unnecessary branch (#4824)

* Algorithm Optimized * Update divide_and_conquer/inversions.py Co-authored-by: John Law <johnlaw.po@gmail.com> * Update divide_and_conquer/inversions.py Co-authored-by: John Law <johnlaw.po@gmail.com> * Update divide_and_conquer/inversions.py Co-authored-by: John Law <johnlaw.po@gmail.com> Co-authored-by: John Law <johnlaw.po@gmail.com>
2024-11-23 21:11:08 +00:00 · 2021-10-11 21:33:06 +05:00 · 2021-10-11 21:33:06 +05:00 · e311b02e70
commit e311b02e70
parent fadb97609f
1 changed files with 10 additions and 26 deletions
--- a/divide_and_conquer/inversions.py
+++ b/divide_and_conquer/inversions.py
@ -2,31 +2,25 @@
 Given an array-like data structure A[1..n], how many pairs
 (i, j) for all 1 <= i < j <= n such that A[i] > A[j]? These pairs are
 called inversions. Counting the number of such inversions in an array-like
-object is the important. Among other things, counting inversions  can help
-us determine how close a given array is to being sorted
-
+object is the important. Among other things, counting inversions can help
+us determine how close a given array is to being sorted.
 In this implementation, I provide two algorithms, a divide-and-conquer
 algorithm which runs in nlogn and the brute-force n^2 algorithm.
-
 """


 def count_inversions_bf(arr):
    """
    Counts the number of inversions using a a naive brute-force algorithm
-
    Parameters
    ----------
    arr: arr: array-like, the list containing the items for which the number
    of inversions is desired. The elements of `arr` must be comparable.
-
    Returns
    -------
    num_inversions: The total number of inversions in `arr`
-
    Examples
    ---------
-
     >>> count_inversions_bf([1, 4, 2, 4, 1])
     4
     >>> count_inversions_bf([1, 1, 2, 4, 4])
@ -49,20 +43,16 @@ def count_inversions_bf(arr):
 def count_inversions_recursive(arr):
    """
    Counts the number of inversions using a divide-and-conquer algorithm
-
    Parameters
    -----------
    arr: array-like, the list containing the items for which the number
    of inversions is desired. The elements of `arr` must be comparable.
-
    Returns
    -------
    C: a sorted copy of `arr`.
    num_inversions: int, the total number of inversions in 'arr'
-
    Examples
    --------
-
    >>> count_inversions_recursive([1, 4, 2, 4, 1])
    ([1, 1, 2, 4, 4], 4)
    >>> count_inversions_recursive([1, 1, 2, 4, 4])
@ -72,40 +62,34 @@ def count_inversions_recursive(arr):
    """
    if len(arr) <= 1:
        return arr, 0
-    else:
-        mid = len(arr) // 2
-        P = arr[0:mid]
-        Q = arr[mid:]
+    mid = len(arr) // 2
+    P = arr[0:mid]
+    Q = arr[mid:]

-        A, inversion_p = count_inversions_recursive(P)
-        B, inversions_q = count_inversions_recursive(Q)
-        C, cross_inversions = _count_cross_inversions(A, B)
+    A, inversion_p = count_inversions_recursive(P)
+    B, inversions_q = count_inversions_recursive(Q)
+    C, cross_inversions = _count_cross_inversions(A, B)

-        num_inversions = inversion_p + inversions_q + cross_inversions
-        return C, num_inversions
+    num_inversions = inversion_p + inversions_q + cross_inversions
+    return C, num_inversions


 def _count_cross_inversions(P, Q):
    """
    Counts the inversions across two sorted arrays.
    And combine the two arrays into one sorted array
-
    For all 1<= i<=len(P) and for all 1 <= j <= len(Q),
    if P[i] > Q[j], then (i, j) is a cross inversion
-
    Parameters
    ----------
    P: array-like, sorted in non-decreasing order
    Q: array-like, sorted in non-decreasing order
-
    Returns
    ------
    R: array-like, a sorted array of the elements of `P` and `Q`
    num_inversion: int, the number of inversions across `P` and `Q`
-
    Examples
    --------
-
    >>> _count_cross_inversions([1, 2, 3], [0, 2, 5])
    ([0, 1, 2, 2, 3, 5], 4)
    >>> _count_cross_inversions([1, 2, 3], [3, 4, 5])