A Python library implementing belief propagation with ordered statistics post-processing for decoding sparse quantum LDPC codes as described in arXiv:2005.07016. Note, this library has recently been completly rewritten using Python and Cython. The bulk of the code now resides in the LDPC repository. The original C++ version can be found in the cpp_version
branch of this repository.
Installation from PyPi requires Python>=3.6. To install via pip, run:
pip install -U bposd
This package buids upon the LDPC python package. The documentation for LDPC can be found here.
If you use this software in your research, please cite the following research paper:
@article{roffe_decoding_2020,
title={Decoding across the quantum low-density parity-check code landscape},
volume={2},
ISSN={2643-1564},
url={http://dx.doi.org/10.1103/PhysRevResearch.2.043423},
DOI={10.1103/physrevresearch.2.043423},
number={4},
journal={Physical Review Research},
publisher={American Physical Society (APS)},
author={Roffe, Joschka and White, David R. and Burton, Simon and Campbell, Earl},
year={2020},
month={Dec}
}
Please also cite the LDPC software package:
@software{Roffe_LDPC_Python_tools_2022,
author = {Roffe, Joschka},
title = {{LDPC: Python tools for low density parity check codes}},
url = {https://pypi.org/project/ldpc/},
year = {2022}
}
The bposd.css.css_code
class can be used to create a CSS code from two classical codes. As an example, we can create a [[7,4,3]] Steane code from the classical Hamming code
from ldpc.codes import hamming_code
from bposd.css import css_code
h=hamming_code(3) #Hamming code parity check matrix
steane_code=css_code(hx=h,hz=h) #create Steane code where both hx and hz are Hamming codes
print("Hx")
print(steane_code.hx)
print("Hz")
print(steane_code.hz)
Hx
[[0 0 0 1 1 1 1]
[0 1 1 0 0 1 1]
[1 0 1 0 1 0 1]]
Hz
[[0 0 0 1 1 1 1]
[0 1 1 0 0 1 1]
[1 0 1 0 1 0 1]]
The bposd.css.css_code
class automatically computes the logical operators of the code.
print("Lx Logical")
print(steane_code.lx)
print("Lz Logical")
print(steane_code.lz)
Lx Logical
[[1 1 1 0 0 0 0]]
Lz Logical
[[1 1 1 0 0 0 0]]
Not all combinations of the hx
and hz
matrices will produce a valid CSS code. Use the bposd.css.css_code.test
function to check whether the code is valid. For example, we can easily check that the Steane code passes all the CSS code tests:
steane_code.test()
<Unnamed CSS code>, (3,4)-[[7,1,nan]]
-Block dimensions: Pass
-PCMs commute [email protected]==0: Pass
-PCMs commute [email protected]==0: Pass
-lx \in ker{hz} AND lz \in ker{hx}: Pass
-lx and lz anticommute: Pass
-<Unnamed CSS code> is a valid CSS code w/ params (3,4)-[[7,1,nan]]
True
As an example of a code that isn't valid, consider the case when hx
and hz
are repetition codes:
from ldpc.codes import rep_code
hx=hz=rep_code(7)
qcode=css_code(hx,hz)
qcode.test()
<Unnamed CSS code>, (2,2)-[[7,-5,nan]]
-Block dimensions incorrect
-PCMs commute [email protected]==0: Fail
-PCMs commute [email protected]==0: Fail
-lx \in ker{hz} AND lz \in ker{hx}: Pass
-lx and lz anitcommute: Fail
False
The hypergraph product can be used to construct a valid CSS code from any pair of classical seed codes. To use the the hypergraph product, call the bposd.hgp.hgp
function. Below is an example of how the distance-3 surface code can be constructed by taking the hypergraph product of two distance-3 repetition codes.
from ldpc.codes import rep_code
from bposd.hgp import hgp
h=rep_code(3)
surface_code=hgp(h1=h,h2=h,compute_distance=True) #nb. set compute_distance=False for larger codes
surface_code.test()
<Unnamed CSS code>, (2,4)-[[13,1,3]]
-Block dimensions: Pass
-PCMs commute [email protected]==0: Pass
-PCMs commute [email protected]==0: Pass
-lx \in ker{hz} AND lz \in ker{hx}: Pass
-lx and lz anticommute: Pass
-<Unnamed CSS code> is a valid CSS code w/ params (2,4)-[[13,1,3]]
True
BP+OSD decoding is useful for codes that do not perform well under standard-BP. To use the BP+OSD decoder, we first call the bposd.bposd_decoder
class:
import numpy as np
from ldpc import bposd_decoder
bpd=bposd_decoder(
surface_code.hz,#the parity check matrix
error_rate=0.05,
channel_probs=[None], #assign error_rate to each qubit. This will override "error_rate" input variable
max_iter=surface_code.N, #the maximum number of iterations for BP)
bp_method="ms",
ms_scaling_factor=0, #min sum scaling factor. If set to zero the variable scaling factor method is used
osd_method="osd_cs", #the OSD method. Choose from: 1) "osd_e", "osd_cs", "osd0"
osd_order=7 #the osd search depth
)
We can then decode by passing a syndrome to the bposd.bposd_decoder.decode
method:
error=np.zeros(surface_code.N).astype(int)
error[[5,12]]=1
syndrome=surface_code.hz@error %2
bpd.decode(syndrome)
print("Error")
print(error)
print("BP+OSD Decoding")
print(bpd.osdw_decoding)
#Decoding is successful if the residual error commutes with the logical operators
residual_error=(bpd.osdw_decoding+error) %2
a=(surface_code.lz@residual_error%2).any()
if a: a="Yes"
else: a="No"
print(f"Logical Error: {a}\n")
Error
[0 0 0 0 0 1 0 0 0 0 0 0 1]
BP+OSD Decoding
[0 0 0 0 0 0 0 0 1 0 0 0 0]
Logical Error: No