Algebraic tools in the study of Multistationarity of Chemical Reaction Networks

Institut for Matematiske Fag

Algebraic tools in the study of Multistationarity of Chemical Reaction Networks

Publikation: Bog/antologi/afhandling/rapport › Ph.d.-afhandling › Forskning

Standard

Algebraic tools in the study of Multistationarity of Chemical Reaction Networks. / Sadeghi Manesh, Amirhossein.

Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2018.

Publikation: Bog/antologi/afhandling/rapport › Ph.d.-afhandling › Forskning

Harvard

Sadeghi Manesh, A 2018, Algebraic tools in the study of Multistationarity of Chemical Reaction Networks. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen. <https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122118150305763>

APA

Sadeghi Manesh, A. (2018). Algebraic tools in the study of Multistationarity of Chemical Reaction Networks. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen. https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122118150305763

Vancouver

Sadeghi Manesh A. Algebraic tools in the study of Multistationarity of Chemical Reaction Networks. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2018.

Author

Sadeghi Manesh, Amirhossein. / Algebraic tools in the study of Multistationarity of Chemical Reaction Networks. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2018.

Bibtex

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title = "Algebraic tools in the study of Multistationarity of Chemical Reaction Networks",

abstract = "This thesis consists of three articles:In the first article, we studied how Gr{\"o}bner bases and binomiality of the steady state ideal behave with respect to the addition or removal of intermediate species to a reaction network. This work is currently submitted, and available on arXiv: Sadeghimanesh and Feliu (2018a).After gaining a knowledge about binomiality of networks with intermediates in the first article, the second article studies multistationarity of reaction networks with intermediates and that have a core binomial network. This work is also submitted, and available on arXiv: Sadeghimanesh and Feliu (2018b).The last work concerns the use of Kac-Rice formulas to study and divide the parameter region of a reaction network according to the number of steady states. A nice implication of this work is the denition of a measure of robustness for multistationarity. A preliminary draft of this work is presented here, Sadeghimanesh and Feliu (2018c).",

author = "{Sadeghi Manesh}, Amirhossein",

year = "2018",

language = "English",

publisher = "Department of Mathematical Sciences, Faculty of Science, University of Copenhagen",

}

RIS

TY - BOOK

T1 - Algebraic tools in the study of Multistationarity of Chemical Reaction Networks

AU - Sadeghi Manesh, Amirhossein

PY - 2018

Y1 - 2018

N2 - This thesis consists of three articles:In the first article, we studied how Gröbner bases and binomiality of the steady state ideal behave with respect to the addition or removal of intermediate species to a reaction network. This work is currently submitted, and available on arXiv: Sadeghimanesh and Feliu (2018a).After gaining a knowledge about binomiality of networks with intermediates in the first article, the second article studies multistationarity of reaction networks with intermediates and that have a core binomial network. This work is also submitted, and available on arXiv: Sadeghimanesh and Feliu (2018b).The last work concerns the use of Kac-Rice formulas to study and divide the parameter region of a reaction network according to the number of steady states. A nice implication of this work is the denition of a measure of robustness for multistationarity. A preliminary draft of this work is presented here, Sadeghimanesh and Feliu (2018c).

AB - This thesis consists of three articles:In the first article, we studied how Gröbner bases and binomiality of the steady state ideal behave with respect to the addition or removal of intermediate species to a reaction network. This work is currently submitted, and available on arXiv: Sadeghimanesh and Feliu (2018a).After gaining a knowledge about binomiality of networks with intermediates in the first article, the second article studies multistationarity of reaction networks with intermediates and that have a core binomial network. This work is also submitted, and available on arXiv: Sadeghimanesh and Feliu (2018b).The last work concerns the use of Kac-Rice formulas to study and divide the parameter region of a reaction network according to the number of steady states. A nice implication of this work is the denition of a measure of robustness for multistationarity. A preliminary draft of this work is presented here, Sadeghimanesh and Feliu (2018c).

UR - https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122118150305763

M3 - Ph.D. thesis

BT - Algebraic tools in the study of Multistationarity of Chemical Reaction Networks

PB - Department of Mathematical Sciences, Faculty of Science, University of Copenhagen

ER -

ID: 210784817