Thermodynamic Tree: The Space of Admissible Paths

Gorban, Alexander N.

doi:10.1137/120866919

Cited by 15 publications

(17 citation statements)

References 49 publications

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“…Universal Lyapunov functions are instruments for evaluation of possible dynamics when the reaction rate constants are unknown or highly uncertain. Without any knowledge of the reaction mechanism we use the thermodynamic potentials for evaluation of the attainable sets of chemical reactions (the theory and algorithms are presented in [15,19,58], some industrial applications are discussed in [18,59,60]). Convexity allows us to transform the n-dimensional problems about attainability and attainable sets into an analysis of onedimensional continua and discrete objects, thermodynamic trees [19].…”

Section: Outline Of Possible Generalizations and Applicationsmentioning

confidence: 99%

Universal Lyapunov functions for non-linear reaction networks

Gorban

2019

Communications in Nonlinear Science and Numerical Simulation

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In 1961, Rényi discovered a rich family of non-classical Lyapunov functions for kinetics of the Markov chains, or, what is the same, for the linear kinetic equations. This family was parameterized by convex functions on the positive semi-axis. After works of Csiszár and Morimoto, these functions became widely known as f -divergences or the Csiszár-Morimoto divergences. These Lyapunov functions are universal in the following sense: they depend only on the state of equilibrium, not on the kinetic parameters themselves.Despite many years of research, no such wide family of universal Lyapunov functions has been found for nonlinear reaction networks. For general non-linear networks with detailed or complex balance, the classical thermodynamics potentials remain the only universal Lyapunov functions.We constructed a rich family of new universal Lyapunov functions for any non-linear reaction network with detailed or complex balance. These functions are parameterized by compact subsets of the projective space. They are universal in the same sense: they depend only on the state of equilibrium and on the network structure, but not on the kinetic parameters themselves.The main elements and operations in the construction of the new Lyapunov functions are partial equilibria of reactions and convex envelopes of families of functions.

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Section: Outline Of Possible Generalizations and Applicationsmentioning

confidence: 99%

Universal Lyapunov functions for non-linear reaction networks

Gorban

2019

Communications in Nonlinear Science and Numerical Simulation

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“…Gorban () has used level set tree methods to study dynamical systems with a strictly convex Lyapunov function f defined on a positively invariant convex polyhedron. Level set trees can help to find the admissible paths, along which f decreases monotonically, and find the states that are attainable from the given initial state along the admissible paths.…”

Section: Level Set Trees and Density Estimationmentioning

confidence: 99%

Level set tree methods

Klemelä¹

2018

WIREs Computational Stats

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Level set trees provide a tool for analyzing multivariate functions. Level set trees are particularly efficient in visualizing and presenting properties related to local maxima and local minima of functions. Level set trees can help statistical inference related to estimating probability density functions and regression functions, and they can be used in cluster analysis and function optimization, among other things. Level set trees open a new way to look at multivariate functions, which makes the detection and analysis of multivariate phenomena feasible, going beyond one‐ and two‐dimensional analysis. This article is categorized under: Statistical and Graphical Methods of Data Analysis > Analysis of High Dimensional Data Statistical and Graphical Methods of Data Analysis > Statistical Graphics and Visualization Statistical and Graphical Methods of Data Analysis > Nonparametric Methods

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“…(There is no chance to find many Lyapunov functions for all nonlinear mechanisms together under given thermodynamics because in this case the cone of the possible velocitieṡ N is a half-space and locally there is the only divergence with a given tangent hyperplane. Globally, such a divergence can be given by an arbitrary monotonic function on the thermodynamic tree [53,55]).…”

Section: A1 Maximum Of Quasiequilibrium Entropies -A New Family Of Umentioning

confidence: 99%

General H-theorem and Entropies that Violate the Second Law

Gorban

2014

Entropy

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H-theorem states that the entropy production is nonnegative and, therefore, the entropy of a closed system should monotonically change in time. In information processing, the entropy production is positive for random transformation of signals (the information processing lemma). Originally, the H-theorem and the information processing lemma were proved for the classical Boltzmann-Gibbs-Shannon entropy and for the correspondent divergence (the relative entropy). Many new entropies and divergences have been proposed during last decades and for all of them the H-theorem is needed. This note proposes a simple and general criterion to check whether the H-theorem is valid for a convex divergence H and demonstrates that some of the popular divergences obey no H-theorem. We consider systems with n states A i that obey first order kinetics (master equation). A convex function H is a Lyapunov function for all master equations with given equilibrium if and only if its conditional minima properly describe the equilibria of pair transitions A i ⇌ A j . This theorem does not depend on the principle of detailed balance and is valid for general Markov kinetics. Elementary analysis of pair equilibria demonstrate that the popular Bregman divergences like Euclidian distance or Itakura-Saito distance in the space of distribution cannot be the universal Lyapunov functions for the first-order kinetics and can increase in Markov processes. Therefore, they violate the second law and the information processing lemma. In particular, for these measures of information (divergences) random manipulation with data may add information to data. The main results are extended to nonlinear generalized mass action law kinetic equations.

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Thermodynamic Tree: The Space of Admissible Paths

Cited by 15 publications

References 49 publications

Universal Lyapunov functions for non-linear reaction networks

Universal Lyapunov functions for non-linear reaction networks

Level set tree methods

General H-theorem and Entropies that Violate the Second Law

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