|
| This Article | ||
| ||
| Share | ||
| Bibliographic References | ||
| Add to: | ||
 Digg  Furl  Spurl  Blink  Simpy  Google  Del.icio.us  Y!MyWeb | ||
| Search | ||
| ||
An Algebraic Approach to Boolean Equations
February 1974 (vol. 23 no. 2)
pp. 206-207
| ASCII Text | x | ||
| S. Rudeanu, "An Algebraic Approach to Boolean Equations," IEEE Transactions on Computers, vol. 23, no. 2, pp. 206-207, February, 1974. | |||
| BibTex | x | ||
| @article{ 10.1109/T-C.1974.223891, author = {S. Rudeanu}, title = {An Algebraic Approach to Boolean Equations}, journal ={IEEE Transactions on Computers}, volume = {23}, number = {2}, issn = {0018-9340}, year = {1974}, pages = {206-207}, doi = {http://doi.ieeecomputersociety.org/10.1109/T-C.1974.223891}, publisher = {IEEE Computer Society}, address = {Los Alamitos, CA, USA}, } | |||
| RefWorks Procite/RefMan/Endnote | x | ||
| TY - JOUR JO - IEEE Transactions on Computers TI - An Algebraic Approach to Boolean Equations IS - 2 SN - 0018-9340 SP206 EP207 EPD - 206-207 A1 - S. Rudeanu, PY - 1974 KW - Boolean equations KW - general solution KW - L?wenheim formula. VL - 23 JA - IEEE Transactions on Computers ER - | |||
A generalization of the L?wenheim formula for the solutions of a Boolean equation was recently obtained by Ju. A. Serikov. In this correspondence the Serikov theorem is written in a somewhat simpler form and it is shown that it can also be viewed as a particular case of the classical L?wenheim formula.
Index Terms:
Boolean equations, general solution, L?wenheim formula.
Citation:
S. Rudeanu, "An Algebraic Approach to Boolean Equations," IEEE Transactions on Computers, vol. 23, no. 2, pp. 206-207, Feb. 1974, doi:10.1109/T-C.1974.223891
Usage of this product signifies your acceptance of the Terms of Use.