Ghent University Academic Bibliography

Advanced

The roots of the NOT gate

Alexis De Vos UGent and Stijn De Baerdemacker UGent (2012) Proceedings: International Symposium on Multiple-Valued Logic. p.167-172
abstract
The quantum gates called `k th root of NOT' and `controlled k th root of NOT' can be applied to synthesize circuits, both classical reversible circuits and quantum circuits. Such circuits, acting on w~qubits, fill a (2^w-1)^2-dimensional subspace of the (2^w)^2-dimensional space U(2^w) of the 2^w X 2^w unitary matrices and thus describe computers situated between classical reversible computers and full quantum computers.
Please use this url to cite or link to this publication:
author
organization
year
type
conference
publication status
published
subject
keyword
quantum computing, reversible computing, Lie group
in
Proceedings: International Symposium on Multiple-Valued Logic
Proc.- Int. Symp. Mult.-Valued Log.
issue title
2012 42nd IEEE International symposium on Multiple-Valued Logic (ISMVL)
pages
167 - 172
publisher
IEEE
place of publication
New York, NY, USA
conference name
IEEE 42nd International symposium on Multiple-Valued Logic (ISMVL 2012)
conference location
Victoria, BC, Canada
conference start
2012-05-14
conference end
2012-05-16
Web of Science type
Proceedings Paper
Web of Science id
000309229100030
ISSN
0195-623X
ISBN
9780769546735
DOI
10.1109/ISMVL.2012.14
language
English
UGent publication?
yes
classification
P1
copyright statement
I have transferred the copyright for this publication to the publisher
id
2116365
handle
http://hdl.handle.net/1854/LU-2116365
date created
2012-05-28 08:10:19
date last changed
2014-11-26 13:31:10
@inproceedings{2116365,
  abstract     = {The quantum gates called `k th  root of NOT' and `controlled k th root of NOT' can be applied to synthesize circuits, both classical reversible circuits and quantum circuits. Such circuits, acting on w{\texttildelow}qubits, fill a (2\^{ }w-1)\^{ }2-dimensional subspace of the   (2\^{ }w)\^{ }2-dimensional space U(2\^{ }w) of the 2\^{ }w X 2\^{ }w unitary matrices and thus describe computers situated between classical reversible computers and full quantum computers.},
  author       = {De Vos, Alexis and De Baerdemacker, Stijn},
  booktitle    = {Proceedings: International Symposium on Multiple-Valued Logic},
  isbn         = {9780769546735},
  issn         = {0195-623X},
  keyword      = {quantum computing,reversible computing,Lie group},
  language     = {eng},
  location     = {Victoria, BC, Canada},
  pages        = {167--172},
  publisher    = {IEEE},
  title        = {The roots of the NOT gate},
  url          = {http://dx.doi.org/10.1109/ISMVL.2012.14},
  year         = {2012},
}

Chicago
De Vos, Alexis, and Stijn De Baerdemacker. 2012. “The Roots of the NOT Gate.” In Proceedings: International Symposium on Multiple-Valued Logic, 167–172. New York, NY, USA: IEEE.
APA
De Vos, Alexis, & De Baerdemacker, S. (2012). The roots of the NOT gate. Proceedings: International Symposium on Multiple-Valued Logic (pp. 167–172). Presented at the IEEE 42nd International symposium on Multiple-Valued Logic (ISMVL 2012), New York, NY, USA: IEEE.
Vancouver
1.
De Vos A, De Baerdemacker S. The roots of the NOT gate. Proceedings: International Symposium on Multiple-Valued Logic. New York, NY, USA: IEEE; 2012. p. 167–72.
MLA
De Vos, Alexis, and Stijn De Baerdemacker. “The Roots of the NOT Gate.” Proceedings: International Symposium on Multiple-Valued Logic. New York, NY, USA: IEEE, 2012. 167–172. Print.