Homological product codes
APA
Bravyi, S. (2014). Homological product codes. Perimeter Institute. https://pirsa.org/14070013
MLA
Bravyi, Sergey. Homological product codes. Perimeter Institute, Jul. 16, 2014, https://pirsa.org/14070013
BibTex
@misc{ pirsa_PIRSA:14070013, doi = {10.48660/14070013}, url = {https://pirsa.org/14070013}, author = {Bravyi, Sergey}, keywords = {}, language = {en}, title = {Homological product codes}, publisher = {Perimeter Institute}, year = {2014}, month = {jul}, note = {PIRSA:14070013 see, \url{https://pirsa.org}} }
IBM (United States)
Collection
Talk Type
Abstract
All examples of quantum LDPC codes known to this date suffer from a poor distance scaling limited by the square-root of the code length. This is in a sharp contrast with the classical case where good LDPC codes are known that combine constant encoding rate and linear distance. In this talk I will describe the first family of good quantum "almost LDPC" codes. The new codes have a constant encoding rate, linear distance, and stabilizers acting on at most square root of n qubits, where n is the code length. For comparison, all previously known families of good quantum codes have stabilizers of linear weight. The proof combines two techniques: randomized constructions of good quantum codes and the homological product operation from algebraic topology. We conjecture that similar methods can produce good quantum codes with stabilizer weight n^a for any a>0. Finally, we apply the homological product to construct new small codes with low-weight stabilizers.
This is a joint work with Matthew Hastings
Preprint: arXiv:1311.0885
This is a joint work with Matthew Hastings
Preprint: arXiv:1311.0885