Dynamical systems are often subject to forcing or changes in their governing parameters and it is of interest to study how this affects their statistical properties. A prominent real-life example of this class of problems is the investigation of climate response to perturbations. In this respect, it is crucial to determine what the linear response of a system is as a quantification of sensitivity. Alongside previous work, here we use the transfer operator formalism to study the response and sensitivity of a dynamical system undergoing perturbations. By projecting the transfer operator onto a suitable finite dimensional vector space, one is able to obtain matrix representations which determine finite Markov processes. Further, using perturba...
We consider linear dynamical systems including random parameters for uncertainty quantification. A s...
We consider optimal control problems for discrete-time random dynamical systems, finding unique pert...
AbstractStationary distribution vectors p∞ for Markov chains with associated transition matrices T a...
Using straightforward linear algebra we derive response operators describing the impact of small per...
Using straightforward linear algebra we derive response operators describing the impact of small per...
The linear response of a dynamical system refers to changes to properties of the system under small ...
Abstract: Markov chains are useful to model various complex systems. In numerous situations, the und...
Predicting the response of a system to perturbations is a key challenge in mathematical and natural ...
We provide algorithms to compute the performance derivatives of Markov chains with respect to change...
Two fundamental concepts and quantities, realization factors and performance potentials, are introdu...
In the realm of statistical physics, a system can be studied for its response to an external stimulu...
We provide a physical interpretation of the first and second order terms occurring in Ruelle respons...
The use of linear response theory for forced dissipative stochastic dynamical systems through the fl...
Using the formalism of the Ruelle response theory, we study how the invariant measure of an Axiom A ...
The climate belongs to the class of non-equilibrium forced and dissipative systems, for which most r...
We consider linear dynamical systems including random parameters for uncertainty quantification. A s...
We consider optimal control problems for discrete-time random dynamical systems, finding unique pert...
AbstractStationary distribution vectors p∞ for Markov chains with associated transition matrices T a...
Using straightforward linear algebra we derive response operators describing the impact of small per...
Using straightforward linear algebra we derive response operators describing the impact of small per...
The linear response of a dynamical system refers to changes to properties of the system under small ...
Abstract: Markov chains are useful to model various complex systems. In numerous situations, the und...
Predicting the response of a system to perturbations is a key challenge in mathematical and natural ...
We provide algorithms to compute the performance derivatives of Markov chains with respect to change...
Two fundamental concepts and quantities, realization factors and performance potentials, are introdu...
In the realm of statistical physics, a system can be studied for its response to an external stimulu...
We provide a physical interpretation of the first and second order terms occurring in Ruelle respons...
The use of linear response theory for forced dissipative stochastic dynamical systems through the fl...
Using the formalism of the Ruelle response theory, we study how the invariant measure of an Axiom A ...
The climate belongs to the class of non-equilibrium forced and dissipative systems, for which most r...
We consider linear dynamical systems including random parameters for uncertainty quantification. A s...
We consider optimal control problems for discrete-time random dynamical systems, finding unique pert...
AbstractStationary distribution vectors p∞ for Markov chains with associated transition matrices T a...