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* updating DIRECTORY.md * spell changes * updating DIRECTORY.md * real world applications * updating DIRECTORY.md * Update matrix_chain_multiplication.py Add a non-dp solution with benchmarks. * [pre-commit.ci] auto fixes from pre-commit.com hooks for more information, see https://pre-commit.ci * Update matrix_chain_multiplication.py * Update matrix_chain_multiplication.py * Update matrix_chain_multiplication.py --------- Co-authored-by: github-actions <${GITHUB_ACTOR}@users.noreply.github.com> Co-authored-by: Pooja Sharma <poojasharma@MyBigMac.local> Co-authored-by: Christian Clauss <cclauss@me.com> Co-authored-by: pre-commit-ci[bot] <66853113+pre-commit-ci[bot]@users.noreply.github.com>
144 lines
4.7 KiB
Python
144 lines
4.7 KiB
Python
"""
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Find the minimum number of multiplications needed to multiply chain of matrices.
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Reference: https://www.geeksforgeeks.org/matrix-chain-multiplication-dp-8/
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The algorithm has interesting real-world applications. Example:
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1. Image transformations in Computer Graphics as images are composed of matrix.
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2. Solve complex polynomial equations in the field of algebra using least processing
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power.
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3. Calculate overall impact of macroeconomic decisions as economic equations involve a
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number of variables.
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4. Self-driving car navigation can be made more accurate as matrix multiplication can
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accurately determine position and orientation of obstacles in short time.
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Python doctests can be run with the following command:
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python -m doctest -v matrix_chain_multiply.py
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Given a sequence arr[] that represents chain of 2D matrices such that the dimension of
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the ith matrix is arr[i-1]*arr[i].
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So suppose arr = [40, 20, 30, 10, 30] means we have 4 matrices of dimensions
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40*20, 20*30, 30*10 and 10*30.
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matrix_chain_multiply() returns an integer denoting minimum number of multiplications to
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multiply the chain.
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We do not need to perform actual multiplication here.
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We only need to decide the order in which to perform the multiplication.
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Hints:
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1. Number of multiplications (ie cost) to multiply 2 matrices
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of size m*p and p*n is m*p*n.
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2. Cost of matrix multiplication is associative ie (M1*M2)*M3 != M1*(M2*M3)
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3. Matrix multiplication is not commutative. So, M1*M2 does not mean M2*M1 can be done.
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4. To determine the required order, we can try different combinations.
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So, this problem has overlapping sub-problems and can be solved using recursion.
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We use Dynamic Programming for optimal time complexity.
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Example input:
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arr = [40, 20, 30, 10, 30]
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output: 26000
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"""
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from collections.abc import Iterator
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from contextlib import contextmanager
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from functools import cache
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from sys import maxsize
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def matrix_chain_multiply(arr: list[int]) -> int:
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"""
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Find the minimum number of multiplcations required to multiply the chain of matrices
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Args:
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arr: The input array of integers.
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Returns:
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Minimum number of multiplications needed to multiply the chain
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Examples:
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>>> matrix_chain_multiply([1, 2, 3, 4, 3])
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30
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>>> matrix_chain_multiply([10])
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0
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>>> matrix_chain_multiply([10, 20])
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0
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>>> matrix_chain_multiply([19, 2, 19])
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722
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>>> matrix_chain_multiply(list(range(1, 100)))
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323398
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# >>> matrix_chain_multiply(list(range(1, 251)))
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# 2626798
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"""
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if len(arr) < 2:
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return 0
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# initialising 2D dp matrix
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n = len(arr)
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dp = [[maxsize for j in range(n)] for i in range(n)]
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# we want minimum cost of multiplication of matrices
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# of dimension (i*k) and (k*j). This cost is arr[i-1]*arr[k]*arr[j].
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for i in range(n - 1, 0, -1):
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for j in range(i, n):
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if i == j:
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dp[i][j] = 0
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continue
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for k in range(i, j):
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dp[i][j] = min(
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dp[i][j], dp[i][k] + dp[k + 1][j] + arr[i - 1] * arr[k] * arr[j]
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)
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return dp[1][n - 1]
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def matrix_chain_order(dims: list[int]) -> int:
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"""
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Source: https://en.wikipedia.org/wiki/Matrix_chain_multiplication
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The dynamic programming solution is faster than cached the recursive solution and
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can handle larger inputs.
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>>> matrix_chain_order([1, 2, 3, 4, 3])
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30
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>>> matrix_chain_order([10])
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0
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>>> matrix_chain_order([10, 20])
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0
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>>> matrix_chain_order([19, 2, 19])
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722
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>>> matrix_chain_order(list(range(1, 100)))
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323398
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# >>> matrix_chain_order(list(range(1, 251))) # Max before RecursionError is raised
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# 2626798
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"""
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@cache
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def a(i: int, j: int) -> int:
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return min(
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(a(i, k) + dims[i] * dims[k] * dims[j] + a(k, j) for k in range(i + 1, j)),
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default=0,
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)
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return a(0, len(dims) - 1)
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@contextmanager
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def elapsed_time(msg: str) -> Iterator:
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# print(f"Starting: {msg}")
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from time import perf_counter_ns
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start = perf_counter_ns()
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yield
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print(f"Finished: {msg} in {(perf_counter_ns() - start) / 10 ** 9} seconds.")
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if __name__ == "__main__":
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import doctest
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doctest.testmod()
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with elapsed_time("matrix_chain_order"):
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print(f"{matrix_chain_order(list(range(1, 251))) = }")
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with elapsed_time("matrix_chain_multiply"):
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print(f"{matrix_chain_multiply(list(range(1, 251))) = }")
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with elapsed_time("matrix_chain_order"):
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print(f"{matrix_chain_order(list(range(1, 251))) = }")
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with elapsed_time("matrix_chain_multiply"):
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print(f"{matrix_chain_multiply(list(range(1, 251))) = }")
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