Local and global robustness at steady state

Department of Mathematical Sciences

Local and global robustness at steady state

Research output: Contribution to journal › Journal article › Research › peer-review

Standard

Local and global robustness at steady state. / Pascual Escudero, Beatriz; Feliu, Elisenda.

In: Mathematical Methods in the Applied Sciences, Vol. 45, No. 1, 2022, p. 359-382.

Research output: Contribution to journal › Journal article › Research › peer-review

Harvard

Pascual Escudero, B & Feliu, E 2022, 'Local and global robustness at steady state', Mathematical Methods in the Applied Sciences, vol. 45, no. 1, pp. 359-382. https://doi.org/10.1002/mma.7780

APA

Pascual Escudero, B., & Feliu, E. (2022). Local and global robustness at steady state. Mathematical Methods in the Applied Sciences, 45(1), 359-382. https://doi.org/10.1002/mma.7780

Vancouver

Pascual Escudero B, Feliu E. Local and global robustness at steady state. Mathematical Methods in the Applied Sciences. 2022;45(1):359-382. https://doi.org/10.1002/mma.7780

Author

Pascual Escudero, Beatriz ; Feliu, Elisenda. / Local and global robustness at steady state. In: Mathematical Methods in the Applied Sciences. 2022 ; Vol. 45, No. 1. pp. 359-382.

Bibtex

@article{05b164023dcf48a6bb6a58265dbab3d8,

title = "Local and global robustness at steady state",

abstract = "In this work we consider systems of polynomial equations and study under what conditions the semi-algebraic set of positive real solutions is contained in a parallel translate of a coordinate hyperplane. To this end we make use of algebraic and geometric tools to relate the local and global structure of the set of positive points. Specifically, we consider the local property termed zero sensitivity at a coordinate xi, which means that the tangent space is contained in a hyperplane of the form xi=c, and provide a criterion to identify it. We consider the global property, namely that the whole positive part of the variety is contained in a hyperplane of the form xi=c, termed absolute concentration robustness (ACR). We show that zero sensitivity implies ACR, and identify when the two properties do not agree, via an intermediate property we term local ACR.The motivation of this work stems from the study of robustness in biochemical systems modelling the concentration of species in a reaction network, where the terms ACR and zero sensitivity are both used to this end. Here we clarify and formalise the relation between the two approaches, and, as a consequence, we obtain a practical criterion to decide upon (local) ACR under some mild assumptions.",

author = "{Pascual Escudero}, Beatriz and Elisenda Feliu",

year = "2022",

doi = "10.1002/mma.7780",

language = "English",

volume = "45",

pages = "359--382",

journal = "Mathematical Methods in the Applied Sciences",

issn = "0170-4214",

publisher = "JohnWiley & Sons Ltd",

number = "1",

}

RIS

TY - JOUR

T1 - Local and global robustness at steady state

AU - Pascual Escudero, Beatriz

AU - Feliu, Elisenda

PY - 2022

Y1 - 2022

N2 - In this work we consider systems of polynomial equations and study under what conditions the semi-algebraic set of positive real solutions is contained in a parallel translate of a coordinate hyperplane. To this end we make use of algebraic and geometric tools to relate the local and global structure of the set of positive points. Specifically, we consider the local property termed zero sensitivity at a coordinate xi, which means that the tangent space is contained in a hyperplane of the form xi=c, and provide a criterion to identify it. We consider the global property, namely that the whole positive part of the variety is contained in a hyperplane of the form xi=c, termed absolute concentration robustness (ACR). We show that zero sensitivity implies ACR, and identify when the two properties do not agree, via an intermediate property we term local ACR.The motivation of this work stems from the study of robustness in biochemical systems modelling the concentration of species in a reaction network, where the terms ACR and zero sensitivity are both used to this end. Here we clarify and formalise the relation between the two approaches, and, as a consequence, we obtain a practical criterion to decide upon (local) ACR under some mild assumptions.

AB - In this work we consider systems of polynomial equations and study under what conditions the semi-algebraic set of positive real solutions is contained in a parallel translate of a coordinate hyperplane. To this end we make use of algebraic and geometric tools to relate the local and global structure of the set of positive points. Specifically, we consider the local property termed zero sensitivity at a coordinate xi, which means that the tangent space is contained in a hyperplane of the form xi=c, and provide a criterion to identify it. We consider the global property, namely that the whole positive part of the variety is contained in a hyperplane of the form xi=c, termed absolute concentration robustness (ACR). We show that zero sensitivity implies ACR, and identify when the two properties do not agree, via an intermediate property we term local ACR.The motivation of this work stems from the study of robustness in biochemical systems modelling the concentration of species in a reaction network, where the terms ACR and zero sensitivity are both used to this end. Here we clarify and formalise the relation between the two approaches, and, as a consequence, we obtain a practical criterion to decide upon (local) ACR under some mild assumptions.

UR - https://arxiv.org/abs/2005.08796

U2 - 10.1002/mma.7780

DO - 10.1002/mma.7780

M3 - Journal article

VL - 45

SP - 359

EP - 382

JO - Mathematical Methods in the Applied Sciences

JF - Mathematical Methods in the Applied Sciences

SN - 0170-4214

IS - 1

ER -

ID: 256319389