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Enhance readability of Minimax #10838

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merged 8 commits into from
Oct 23, 2023
Merged

Enhance readability of Minimax #10838

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cfe54f8
Enhance readability of Minimax
Hardvan Oct 23, 2023
cd9f3f4
[pre-commit.ci] auto fixes from pre-commit.com hooks
pre-commit-ci[bot] Oct 23, 2023
eed78ca
Reduce line overflow
Hardvan Oct 23, 2023
fd758d0
Complete line overflow
Hardvan Oct 23, 2023
e0282c9
Update backtracking/minimax.py
Hardvan Oct 23, 2023
36ca2c9
Update backtracking/minimax.py
Hardvan Oct 23, 2023
9474d75
Update backtracking/minimax.py
Hardvan Oct 23, 2023
b17d6d7
Remove line overflow
Hardvan Oct 23, 2023
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26 changes: 25 additions & 1 deletion backtracking/minimax.py
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Original file line number Diff line number Diff line change
Expand Up @@ -16,6 +16,22 @@ def minimax(
depth: int, node_index: int, is_max: bool, scores: list[int], height: float
) -> int:
"""
This function implements the minimax algorithm, which helps achieve the optimal
score for a player in a two-player game by checking all possible moves.
If the player is the maximizer, then the score is maximized.
If the player is the minimizer, then the score is minimized.

Parameters:
- depth: Current depth in the game tree.
- node_index: Index of the current node in the scores list.
- is_max: A boolean indicating whether the current move
is for the maximizer (True) or minimizer (False).
- scores: A list containing the scores of the leaves of the game tree.
- height: The maximum height of the game tree.

Returns:
- An integer representing the optimal score for the current player.

>>> import math
>>> scores = [90, 23, 6, 33, 21, 65, 123, 34423]
>>> height = math.log(len(scores), 2)
Expand All @@ -37,28 +53,36 @@ def minimax(

if depth < 0:
raise ValueError("Depth cannot be less than 0")

if len(scores) == 0:
raise ValueError("Scores cannot be empty")

# Base case: If the current depth equals the height of the tree,
# return the score of the current node.
if depth == height:
return scores[node_index]

# If it's the maximizer's turn, choose the maximum score
# between the two possible moves.
if is_max:
return max(
minimax(depth + 1, node_index * 2, False, scores, height),
minimax(depth + 1, node_index * 2 + 1, False, scores, height),
)

# If it's the minimizer's turn, choose the minimum score
# between the two possible moves.
return min(
minimax(depth + 1, node_index * 2, True, scores, height),
minimax(depth + 1, node_index * 2 + 1, True, scores, height),
)


def main() -> None:
# Sample scores and height calculation
scores = [90, 23, 6, 33, 21, 65, 123, 34423]
height = math.log(len(scores), 2)

# Calculate and print the optimal value using the minimax algorithm
print("Optimal value : ", end="")
print(minimax(0, 0, True, scores, height))

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