|MODELING OF BEHAVIOR AND INTELLIGENCE|
|Moscow. Translated from Avtomatika and Telemekhanika, No. 9, pp. 123-134, September, 1989.|
|Original Article submitted April 15, 1988.|
I. O. Libkin, I. B. Muchnik, and L. V. Shvartser
Quasilinear Monotone Systems (pdf)
A class of monotone systems, called Quasilinear, is introduced. It is shown that an arbitrary monotone system can be represented as a combination of such systems. It is established that the construction of monotone systems, defined as Boolean, can be carried over to an arbitrary finite distributive sublattice.