Functional graph trees for circulants with linear boolean functions at the vertices | Applied Discrete Mathematics. Supplement. 2013. № 6.

HomeIssuesFunctional graph trees for circulants with linear boolean functions at the vertices | Applied Discrete Mathematics. Supplement. 2013. № 6.

Functional graph trees for circulants with linear boolean functions at the vertices

The functional graph of a discrete dynamic system being a model of regulatory gene network circuit is defined as the graph of the transformation Af, 2 : F2n ^ F2n where Af, 2(v 0,v 1, ... ,V n-1) = (щ,щ,... ,u,n-i), Ui = Vi-i + Vi + v+, i = 0,1,...,n - 1, V-1 = Vn-1, Vn = V0. The structure of this graph is completely described.

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Keywords

дискретная динамическая система, циркулянт, генная сеть, регуляторный контур, функциональный граф, discrete dynamical system, circulant, gene network, regulatory circuit, functional graph

Authors

NameOrganizationE-mail
Kornienko A. S.Novosibirsk State Universitanastasia.s.kornienko@gmail.com
Всего: 1

References

Харари Ф. Теория графов. М.: УРСС, 2003.
Евдокимов A. A, Пережогин A. Л. Дискретные динамические системы циркулянтного типа с линейными функциями в вершинах сети // Дискретный анализ и исследование операций. 2011. T.3. №3. С. 39-48.
Functional graph trees for circulants with linear boolean functions at the vertices | Applied Discrete Mathematics. Supplement. 2013. № 6.

Functional graph trees for circulants with linear boolean functions at the vertices | Applied Discrete Mathematics. Supplement. 2013. № 6.