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order_finding.py
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order_finding.py
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# Copyright (c) Microsoft Corporation.
# Licensed under the MIT License.
import argparse
import random
import qsharp
from Microsoft.Quantum.Samples.OrderFinding import FindOrder
def get_order(perm, index):
"""Returns the exact order (length) of the cycle that contains a given index.
"""
order = 1
curr = index
while index != perm[curr]:
order += 1
curr = perm[curr]
return order
def guess_quantum(perm, index):
"""Estimates the order of a cycle, using a quantum algorithm defined in the Q# file.
Computes the permutation πⁱ(input) where i is a superposition of all values from 0 to 7.
The algorithm then uses QFT to find a period in the resulting state.
The result needs to be post-processed to find the estimate.
"""
result = FindOrder.simulate(perm=perm, input=index)
if result == 0:
guess = random.random()
# The probability distribution is extracted from the second column (m = 0) in Fig. 2's table
# on the right-hand side, as shown in L.M.K. Vandersypen et al., PRL 85, 5452, 2000 (https://arxiv.org/abs/quant-ph/0007017).
if guess <= 0.5505:
return 1
elif guess <= 0.5505 + 0.1009:
return 2
elif guess <= 0.5505 + 0.1009 + 0.1468:
return 3
return 4
elif result % 2 == 1:
return 3
elif (result == 2) or (result == 6):
return 4
return 2
def guess_classical(perm, index):
"""Guesses the order (classically) for cycle that contains a given index
The algorithm computes π³(index). If the result is index, it
returns 1 or 3 with probability 50% each, otherwise, it
returns 2 or 4 with probability 50% each.
"""
if perm[perm[perm[index]]] == index:
return random.choice([1, 3])
return random.choice([2, 4])
def guess_order(perm, index, n):
# This object counts the number of times the quantum algorithm guesses a
# given order.(so { order: count })
q_guesses = {k + 1: 0 for k in perm}
# This object counts the number of times the classical algorithm guesses a
# given order.(so { order: count })
c_guesses = {k + 1: 0 for k in perm}
# Guess the order, 'n' amount of times.
for i in range(n):
# Count the classical guesses.
c_guesses[guess_classical(perm, index)] += 1
# Count the quantum guesses.
q_guesses[guess_quantum(perm, index)] += 1
print("\nClassical Guesses: ")
for order, count in c_guesses.items():
# Return the percentage of each order guess, which = (num_of_guesses /
# total_guesses) * 100.
print(f"{order}: {count / n : 0.2%}")
print("\nQuantum Guesses: ")
for order, count in q_guesses.items():
# Return the percentage of each order guess, which = (num_of_guesses /
# total_guesses) * 100.
print(f"{order}: {count / n : 0.2%}")
if __name__ == "__main__":
parser = argparse.ArgumentParser(
description="Guess the order of a given permutation, using both classical and Quantum computing.")
parser.add_argument(
'-p',
'--permutation',
nargs=4,
type=int,
help='provide only four integers to form a permutation.(default=[1,2,3,0])',
metavar='INT',
default=[
1,
2,
3,
0])
parser.add_argument(
'-i',
'--index',
type=int,
help='the permutations cycle index.(default=0)',
default=0
)
parser.add_argument(
'-s',
'--shots',
type=int,
help='number of repetitions when guessing.(default=1024)',
default=1024
)
args = parser.parse_args()
print(f"Permutation: {args.permutation}")
print(f"Find cycle length at index: {args.index}")
exact_order = get_order(args.permutation, args.index)
print(f"Exact order: {exact_order}")
guess_order(args.permutation, args.index, args.shots)