2015
DOI: 10.1137/140975929
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Monomials and Basin Cylinders for Network Dynamics

Abstract: We describe methods to identify cylinder sets inside a basin of attraction for Boolean dynamics of biological networks. Such sets are used for designing regulatory interventions that make the system evolve towards a chosen attractor, for example initiating apoptosis in a cancer cell. We describe two algebraic methods for identifying cylinders inside a basin of attraction, one based on the Groebner fan that finds monomials that define cylinders and the other on primary decomposition. Both methods are applied to… Show more

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Cited by 1 publication
(2 citation statements)
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References 38 publications
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“…Ways to find control variables, or nodes for intervention, are developed in [3]. One way is to find the prime decomposition (see [7]) of the ideal I Bex,A which is the algebraic way to find simple cylindrical subsets of the variety B ex,A .…”
Section: Algebraic Computationmentioning
confidence: 99%
See 1 more Smart Citation
“…Ways to find control variables, or nodes for intervention, are developed in [3]. One way is to find the prime decomposition (see [7]) of the ideal I Bex,A which is the algebraic way to find simple cylindrical subsets of the variety B ex,A .…”
Section: Algebraic Computationmentioning
confidence: 99%
“…Then the prime ideal P = 〈 s j 1 − a 1 , …, s j c − a c 〉 in the ring ℂ[ s ] will show up in the prime or minimal decomposition ∩ j P j of the radical ideal Ī. The details are in Theorem 2.2 of [3]. …”
Section: Algebraic Computationmentioning
confidence: 99%