Python/matrix/nth_fibonacci_using_matrix_exponentiation.py

"""
Implementation of finding nth fibonacci number using matrix exponentiation.
Time Complexity is about O(log(n)*8), where 8 is the complexity of matrix
multiplication of size 2 by 2.
And on the other hand complexity of bruteforce solution is O(n).
As we know
    f[n] = f[n-1] + f[n-1]
Converting to matrix,
    [f(n),f(n-1)] = [[1,1],[1,0]] * [f(n-1),f(n-2)]
->  [f(n),f(n-1)] = [[1,1],[1,0]]^2 * [f(n-2),f(n-3)]
    ...
    ...
->  [f(n),f(n-1)] = [[1,1],[1,0]]^(n-1) * [f(1),f(0)]
So we just need the n times multiplication of the matrix [1,1],[1,0]].
We can decrease the n times multiplication by following the divide and conquer approach.
"""


def multiply(matrix_a, matrix_b):
    matrix_c = []
    n = len(matrix_a)
    for i in range(n):
        list_1 = []
        for j in range(n):
            val = 0
            for k in range(n):
                val = val + matrix_a[i][k] * matrix_b[k][j]
            list_1.append(val)
        matrix_c.append(list_1)
    return matrix_c


def identity(n):
    return [[int(row == column) for column in range(n)] for row in range(n)]


def nth_fibonacci_matrix(n):
    """
    >>> nth_fibonacci_matrix(100)
    354224848179261915075
    >>> nth_fibonacci_matrix(-100)
    -100
    """
    if n <= 1:
        return n
    res_matrix = identity(2)
    fibonacci_matrix = [[1, 1], [1, 0]]
    n = n - 1
    while n > 0:
        if n % 2 == 1:
            res_matrix = multiply(res_matrix, fibonacci_matrix)
        fibonacci_matrix = multiply(fibonacci_matrix, fibonacci_matrix)
        n = int(n / 2)
    return res_matrix[0][0]


def nth_fibonacci_bruteforce(n):
    """
    >>> nth_fibonacci_bruteforce(100)
    354224848179261915075
    >>> nth_fibonacci_bruteforce(-100)
    -100
    """
    if n <= 1:
        return n
    fib0 = 0
    fib1 = 1
    for i in range(2, n + 1):
        fib0, fib1 = fib1, fib0 + fib1
    return fib1


def main():
    fmt = (
        "{} fibonacci number using matrix exponentiation is {} and using bruteforce "
        "is {}\n"
    )
    for ordinal in "0th 1st 2nd 3rd 10th 100th 1000th".split():
        n = int("".join(c for c in ordinal if c in "0123456789"))  # 1000th --> 1000
        print(fmt.format(ordinal, nth_fibonacci_matrix(n), nth_fibonacci_bruteforce(n)))
    # from timeit import timeit
    # print(timeit("nth_fibonacci_matrix(1000000)",
    #              "from main import nth_fibonacci_matrix", number=5))
    # print(timeit("nth_fibonacci_bruteforce(1000000)",
    #              "from main import nth_fibonacci_bruteforce", number=5))
    # 2.3342058970001744
    # 57.256506615000035


if __name__ == "__main__":
    main()
Added matrix exponentiation approach for finding fibonacci number. (#1042) * Added matrix exponentiation approach for finding fibonacci number. * Implemented the way of finding nth fibonacci. * Complexity is about O(log(n)8) Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Tighten up main() and add comments on performance 2019-07-19 07:41:37 +00:00			`"""`
			`Implementation of finding nth fibonacci number using matrix exponentiation.`
Set the Python file maximum line length to 88 characters (#2122) * flake8 --max-line-length=88 * fixup! Format Python code with psf/black push Co-authored-by: github-actions <${GITHUB_ACTOR}@users.noreply.github.com> 2020-06-16 08:09:19 +00:00			`Time Complexity is about O(log(n)*8), where 8 is the complexity of matrix`
			`multiplication of size 2 by 2.`
Added matrix exponentiation approach for finding fibonacci number. (#1042) * Added matrix exponentiation approach for finding fibonacci number. * Implemented the way of finding nth fibonacci. * Complexity is about O(log(n)8) Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Tighten up main() and add comments on performance 2019-07-19 07:41:37 +00:00			`And on the other hand complexity of bruteforce solution is O(n).`
			`As we know`
			`f[n] = f[n-1] + f[n-1]`
			`Converting to matrix,`
			`[f(n),f(n-1)] = [[1,1],[1,0]] * [f(n-1),f(n-2)]`
			`-> [f(n),f(n-1)] = [[1,1],[1,0]]^2 * [f(n-2),f(n-3)]`
			`...`
			`...`
			`-> [f(n),f(n-1)] = [[1,1],[1,0]]^(n-1) * [f(1),f(0)]`
			`So we just need the n times multiplication of the matrix [1,1],[1,0]].`
			`We can decrease the n times multiplication by following the divide and conquer approach.`
			`"""`
psf/black code formatting (#1277) 2019-10-05 05:14:13 +00:00

Added matrix exponentiation approach for finding fibonacci number. (#1042) * Added matrix exponentiation approach for finding fibonacci number. * Implemented the way of finding nth fibonacci. * Complexity is about O(log(n)8) Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Tighten up main() and add comments on performance 2019-07-19 07:41:37 +00:00			`def multiply(matrix_a, matrix_b):`
			`matrix_c = []`
			`n = len(matrix_a)`
			`for i in range(n):`
			`list_1 = []`
			`for j in range(n):`
			`val = 0`
			`for k in range(n):`
			`val = val + matrix_a[i][k] * matrix_b[k][j]`
			`list_1.append(val)`
			`matrix_c.append(list_1)`
			`return matrix_c`


			`def identity(n):`
			`return [[int(row == column) for column in range(n)] for row in range(n)]`


			`def nth_fibonacci_matrix(n):`
			`"""`
			`>>> nth_fibonacci_matrix(100)`
			`354224848179261915075`
			`>>> nth_fibonacci_matrix(-100)`
			`-100`
			`"""`
			`if n <= 1:`
			`return n`
			`res_matrix = identity(2)`
			`fibonacci_matrix = [[1, 1], [1, 0]]`
			`n = n - 1`
			`while n > 0:`
			`if n % 2 == 1:`
			`res_matrix = multiply(res_matrix, fibonacci_matrix)`
			`fibonacci_matrix = multiply(fibonacci_matrix, fibonacci_matrix)`
			`n = int(n / 2)`
			`return res_matrix[0][0]`


			`def nth_fibonacci_bruteforce(n):`
			`"""`
			`>>> nth_fibonacci_bruteforce(100)`
			`354224848179261915075`
			`>>> nth_fibonacci_bruteforce(-100)`
			`-100`
			`"""`
			`if n <= 1:`
			`return n`
			`fib0 = 0`
			`fib1 = 1`
			`for i in range(2, n + 1):`
			`fib0, fib1 = fib1, fib0 + fib1`
			`return fib1`


			`def main():`
Set the Python file maximum line length to 88 characters (#2122) * flake8 --max-line-length=88 * fixup! Format Python code with psf/black push Co-authored-by: github-actions <${GITHUB_ACTOR}@users.noreply.github.com> 2020-06-16 08:09:19 +00:00			`fmt = (`
			`"{} fibonacci number using matrix exponentiation is {} and using bruteforce "`
			`"is {}\n"`
			`)`
Added matrix exponentiation approach for finding fibonacci number. (#1042) * Added matrix exponentiation approach for finding fibonacci number. * Implemented the way of finding nth fibonacci. * Complexity is about O(log(n)8) Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Tighten up main() and add comments on performance 2019-07-19 07:41:37 +00:00			`for ordinal in "0th 1st 2nd 3rd 10th 100th 1000th".split():`
			`n = int("".join(c for c in ordinal if c in "0123456789")) # 1000th --> 1000`
Use correct function names in nth_fibonacci_using_matrix_exponentiation.py (#1045) @AnupKumarPanwar @ParthS007 @poyea Could I please get a quick review on this one because I made a mistake here that breaks the build for new pull requests. 2019-07-19 08:55:45 +00:00			`print(fmt.format(ordinal, nth_fibonacci_matrix(n), nth_fibonacci_bruteforce(n)))`
Added matrix exponentiation approach for finding fibonacci number. (#1042) * Added matrix exponentiation approach for finding fibonacci number. * Implemented the way of finding nth fibonacci. * Complexity is about O(log(n)8) Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Updated the matrix exponentiation approach of finding nth fibonacci. - Removed some extra spaces - Added the complexity of bruteforce algorithm - Removed unused function called zerro() - Added some docktest based on request * Tighten up main() and add comments on performance 2019-07-19 07:41:37 +00:00			`# from timeit import timeit`
			`# print(timeit("nth_fibonacci_matrix(1000000)",`
			`# "from main import nth_fibonacci_matrix", number=5))`
			`# print(timeit("nth_fibonacci_bruteforce(1000000)",`
			`# "from main import nth_fibonacci_bruteforce", number=5))`
			`# 2.3342058970001744`
			`# 57.256506615000035`


			`if __name__ == "__main__":`
			`main()`