Your search keyword '"Scheutzow, Michael"' showing total 21 results

1. Rivers under Noise

Author

Scheutzow, Michael and Grinfeld, Michael

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems, 34F05, 37H05, 37H30, 60H10

Abstract

We consider the deterministic and stochastic versions of a first order non-autonomous differential equation which allows us to discuss the persistence of rivers ("fleuves") under noise., Comment: 26 pages

Published

2024

2. Correction to: Criteria for Strong and Weak Random Attractors

Author

Crauel, Hans, Geiss, Sarah, and Scheutzow, Michael

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems

Abstract

In the article 'Criteria for Strong and Weak Random Attractors' necessary and sufficient conditions for strong attractors and weak attractors are studied. In this note we correct two of its theorems on strong attractors., Comment: 4 pages

Published

2023

3. Expansion and attraction of RDS: long time behavior of the solution to singular SDE

Author

Ling, Chengcheng and Scheutzow, Michael

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems, 60H10, 60G17, 60J60, 60H50

Abstract

We provide a framework for studying the expansion rate of the image of a bounded set under a flow in Euclidean space and apply it to stochastic differential equations (SDEs for short) with singular coefficients. If the singular drift of the SDE can be split into two terms, one of which is singular and the radial component of the other term has a radial component of sufficient strength in the direction of the origin, then the random dynamical system generated by the SDE admits a pullback attractor., Comment: 35 pages

Published

2022

4. The perfection of local semi-flows and local random dynamical systems with applications to SDEs

Author

Ling, Chengcheng, Scheutzow, Michael, and Vorkastner, Isabell

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems

Abstract

We provide a rather general perfection result for crude local semi-flows taking values in a Polish space showing that a crude semi-flow has a modification which is a (perfect) local semi-flow which is invariant under a suitable metric dynamical system. Such a (local) semi-flow induces a (local) random dynamical system. Then we show that this result can be applied to several classes of stochastic differential equations driven by semimartingales with stationary increments such as equations with locally monotone coefficients and equations with singular drift. For these examples it was previously unknown whether they generate a (local) random dynamical system or not.

Published

2021

5. Noise-induced strong stabilization

Author

Leimbach, Matti, Mattingly, Jonathan C., and Scheutzow, Michael

Subjects

Mathematics - Dynamical Systems, Mathematics - Probability, 37H30, 60H10, 34D45

Abstract

We consider a 2-dimensional stochastic differential equation in polar coordinates depending on several parameters. We show that if these parameters belong to a specific regime then the deterministic system explodes in finite time, but the random dynamical system corresponding to the stochastic equation is not only strongly complete but even admits a random attractor., Comment: updated version. Small corrections

Published

2020

6. A prey-predator model with three interacting species

Author

Jamilov, Uygun, Scheutzow, Michael, and Vorkastner, Isabell

Subjects

Mathematics - Dynamical Systems, 37N25, 92D25, 37B25

Abstract

In this paper we consider a class of discrete time prey-predator models with three interacting species defined on the two-dimensional simplex. For some choices of parameters of the operator describing the evolution of the relative frequencies, we show that the ergodic hypothesis does not hold. Moreover, we prove that any order Ces\`aro mean of the trajectories diverges. For another class of parameters, we show that all orbits starting from the interior of the simplex converge to the unique fixed point of the operator while for the remaining choices of parameters all orbits converge to one of the vertices of the simplex. Contrary to many authors we study discrete time models but we include a speed function $f$ in the dynamics which allows us to approximate the continuous-time case arbitrarily well when $f$ is small., Comment: 14 pages

Published

2019

7. A dynamical theory for singular stochastic delay differential equations I: Linear equations and a Multiplicative Ergodic Theorem on fields of Banach spaces

Author

Varzaneh, Mazyar Ghani, Riedel, Sebastian, and Scheutzow, Michael

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems

Abstract

We show that singular stochastic delay differential equations (SDDEs) induce cocycle maps on a field of Banach spaces. A general Multiplicative Ergodic Theorem on fields of Banach spaces is proved and applied to linear SDDEs. In Part II of this article, we use our results to prove a stable manifold theorem for non-linear singular SDDEs.

Published

2019

8. Asymptotics for a class of iterated random cubic operators

Author

Homburg, Ale Jan, Jamilov, Uygun, and Scheutzow, Michael

Subjects

Mathematics - Dynamical Systems, 37N25, 37H10

Abstract

We consider a class of cubic stochastic operators that are motivated by models for evolution of frequencies of genetic types in populations. We take populations with three mutually exclusive genetic types. The long term dynamics of single maps, starting with a generic initial condition where in particular all genetic types occur with positive frequency, is asymptotic to equilibria where either only one genetic type survives, or where all three genetic types occur. We consider a family of independent and identically distributed maps from this class and study its long term dynamics, in particular its random point attractors. The long term dynamics of the random composition of maps is asymptotic, almost surely, to equilibria. In contrast to the deterministic system, for generic initial conditions these can be equilibria with one or two or three types present (depending only on the distribution)., Comment: 15 pages

Published

2018

9. Minimal Random Attractors

Author

Crauel, Hans and Scheutzow, Michael

Subjects

Mathematics - Dynamical Systems

Abstract

It is well-known that random attractors of a random dynamical system are generally not unique. We show that for general pullback attractors and weak attractors, there is always a minimal (in the sense of smallest) random attractor which attracts a given family of (possibly random) sets. We provide an example which shows that this property need not hold for forward attractors. We point out that our concept of a random attractor is very general: The family of sets which are attracted is allowed to be completely arbitrary., Comment: 19 pages

Published

2017

10. Connectedness of random set attractors

Author

Scheutzow, Michael and Vorkastner, Isabell

Subjects

Mathematics - Dynamical Systems, Mathematics - Probability, 37H99, 37B25, 37C70, 28B20

Abstract

We examine the question whether random set attractors for continuous-time random dynamical systems on a connected state space are connected. In the deterministic case, these attractors are known to be connected. In the probabilistic setup, however, connectedness has only been shown under stronger connectedness assumptions on the state space. Under a weak continuity condition on the random dynamical system we prove connectedness of the pullback attractor on a connected space. Additionally, we provide an example of a weak random set attractor of a random dynamical system with even more restrictive continuity assumptions on an even path-connected space which even attracts all bounded sets and which is not connected. On the way to proving connectedness of a pullback attractor we prove a lemma which may be of independent interest and which holds without the assumption that the state space is connected. It states that even though pullback convergence to the attractor allows for exceptional nullsets which may depend on the compact set, these nullsets can be chosen independently of the compact set (which is clear for $\sigma$-compact spaces but not at all clear for spaces which are not $\sigma$-compact)., Comment: 7 pages

Published

2017

11. Random Delta-Hausdorff-attractors

Author

Scheutzow, Michael and Wilke-Berenguer, Maite

Subjects

Mathematics - Dynamical Systems, Mathematics - Probability, 37H99, 37H10, 37B25, 37C70

Abstract

Global random attractors and random point attractors for random dynamical systems have been studied for several decades. Here we introduce two intermediate concepts: $\Delta$-attractors are characterized by attracting all deterministic compact sets of Hausdorff dimension at most $\Delta$, where $\Delta$ is a non-negative number, while cc-attractors attract all countable compact sets. We provide two examples showing that a given random dynamical system may have various different $\Delta$-attractors for different values of $\Delta$. It seems that both concepts are new even in the context of deterministic dynamical systems., Comment: v1: 20 pages v2: 20 pages, corrected typos, streamlined proofs

Published

2017

12. Synchronization, Lyapunov exponents and stable manifolds for random dynamical systems

Author

Scheutzow, Michael and Vorkastner, Isabell

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems, 37D10, 37D45, 37G35, 37H15

Abstract

During the past decades, the question of existence and properties of a random attractor of a random dynamical system generated by an S(P)DE has received considerable attention, for example by the work of Gess and R\"ockner. Recently some authors investigated sufficient conditions which guarantee synchronization, i.e. existence of a random attractor which is a singleton. It is reasonable to conjecture that synchronization and negativity (or non-positivity) of the top Lyapunov exponent of the system should be closely related since both mean that the system is contracting in some sense. Based on classical results by Ruelle, we formulate positive results in this direction. Finally we provide two very simple but striking examples of one-dimensional monotone random dynamical systems for which 0 is a fixed point. In the first example, the Lyapunov exponent is strictly negative but nevertheless all trajectories starting outside of 0 diverge to $\infty$ or $-\infty$. In particular, there is no synchronization (not even locally). In the second example (which is just the time reversal of the first), the Lyapunov exponent is strictly positive but nevertheless there is synchronization., Comment: 8 pages

Published

2017

13. Weak synchronization for isotropic flows

Author

Cranston, Michael, Gess, Benjamin, and Scheutzow, Michael

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems, 37B25, 37G35, 37H15

Abstract

We study Brownian flows on manifolds for which the associated Markov process is strongly mixing with respect to an invariant probability measure and for which the distance process for each pair of trajectories is a diffusion $r$. We provide a sufficient condition on the boundary behavior of $r$ at $0$ which guarantees that the statistical equilibrium of the flow is almost surely a singleton and its support is a weak point attractor. The condition is fulfilled in the case of negative top Lyapunov exponent, but it is also fulfilled in some cases when the top Lyapunov exponent is zero. Particular examples are isotropic Brownian flows on $S^{d-1}$ as well as isotropic Ornstein-Uhlenbeck flows on $\mathbb{R}^d$., Comment: 14 pages

Published

2015

14. Synchronization by noise for order-preserving random dynamical systems

Author

Flandoli, Franco, Gess, Benjamin, and Scheutzow, Michael

Subjects

Mathematics - Probability, Mathematics - Analysis of PDEs, Mathematics - Dynamical Systems, 37B25, 37G35, 37H15

Abstract

We provide sufficient conditions for weak synchronization by noise for order-preserving random dynamical systems on Polish spaces. That is, under these conditions we prove the existence of a weak point attractor consisting of a single random point. This generalizes previous results in two directions: First, we do not restrict to Banach spaces and second, we do not require the partial order to be admissible nor normal. As a second main result and application we prove weak synchronization by noise for stochastic porous media equations with additive noise., Comment: 25 pages

Published

2015

15. Synchronization by noise

Author

Flandoli, Franco, Gess, Benjamin, and Scheutzow, Michael

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems, 37B25, 37G35, 37H15

Abstract

We provide sufficient conditions for synchronization by noise, i.e. under these conditions we prove that weak random attractors for random dynamical systems consist of single random points. In the case of SDE with additive noise, these conditions are also essentially necessary. In addition, we provide sufficient conditions for the existence of a minimal weak point random attractor consisting of a single random point. As a result, synchronization by noise is proven for a large class of SDE with additive noise. In particular, we prove that the random attractor for an SDE with drift given by a (multidimensional) double-well potential and additive noise consists of a single random point. All examples treated in [Tearne, PTRF; 2008] are also included., Comment: 45 pages

Published

2014

16. Invariance and Monotonicity for Stochastic Delay Differential Equations

Author

Chueshov, Igor and Scheutzow, Michael

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems, 34K50, 60H10, 37H10, 93E15

Abstract

We study invariance and monotonicity properties of Kunita-type stochastic differential equations in $\RR^d$ with delay. Our first result provides sufficient conditions for the invariance of closed subsets of $\RR^d$. Then we present a comparison principle and show that under appropriate conditions the stochastic delay system considered generates a monotone (order-preserving) random dynamical system. Several applications are considered., Comment: 27 pages

Published

2012

17. Evolution systems of measures for stochastic flows

Author

Chen, Xiaopeng, Duan, Jinqiao, and Scheutzow, Michael

Subjects

Mathematics - Dynamical Systems, 37H99, 76D05, 60G57

Abstract

A new concept of {\em an evolution system of measures for stochastic flows} is considered. It corresponds to the notion of an invariant measure for random dynamical systems (or cocycles). The existence of evolution systems of measures for asymptotically compact stochastic flows is obtained. For a white noise stochastic flow, there exists a one to one correspondence between evolution systems of measures for a stochastic flow \emph{and} evolution systems of measures for the associated Markov transition semigroup. As an application, an alternative approach for evolution systems of measures of 2D stochastic Navier-Stokes equations with a time-periodic forcing term is presented., Comment: 14 pages

Published

2010

18. Asymptotic coupling and a weak form of Harris' theorem with applications to stochastic delay equations

Author

Hairer, Martin, Mattingly, Jonathan C., and Scheutzow, Michael

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems, 34K50, 37A30, 37A25, 37L55, 60H15

Abstract

There are many Markov chains on infinite dimensional spaces whose one-step transition kernels are mutually singular when starting from different initial conditions. We give results which prove unique ergodicity under minimal assumptions on one hand and the existence of a spectral gap under conditions reminiscent of Harris' theorem. The first uses the existence of couplings which draw the solutions together as time goes to infinity. Such "asymptotic couplings" were central to recent work on SPDEs on which this work builds. The emphasis here is on stochastic differential delay equations.Harris' celebrated theorem states that if a Markov chain admits a Lyapunov function whose level sets are "small" (in the sense that transition probabilities are uniformly bounded from below), then it admits a unique invariant measure and transition probabilities converge towards it at exponential speed. This convergence takes place in a total variation norm, weighted by the Lyapunov function. A second aim of this article is to replace the notion of a "small set" by the much weaker notion of a "d-small set," which takes the topology of the underlying space into account via a distance-like function d. With this notion at hand, we prove an analogue to Harris' theorem, where the convergence takes place in a Wasserstein-like distance weighted again by the Lyapunov function. This abstract result is then applied to the framework of stochastic delay equations., Comment: Updated version correcting a few errors and typos in the original version

Published

2009

19. Criteria for strong and weak random attractors

Author

Crauel, Hans, Dimitroff, Georgi, and Scheutzow, Michael

Subjects

Mathematics - Probability, Mathematics - Dynamical Systems, 60H25 (Primary), 37B25, 37H99, 37L55, 60D05

Abstract

The theory of random attractors has different notions of attraction, amongst them pullback attraction and weak attraction. We investigate necessary and sufficient conditions for the existence of pullback attractors as well as of weak attractors.

Published

2008

20. Synchronization by noise for order-preserving random dynamical systems

Author

Benjamin Gess, Franco Flandoli, Michael Scheutzow, Flandoli, Franco, Gess, Benjamin, and Scheutzow, Michael

Subjects

Statistics and Probability, 37B25, 37G35, 37H15, random attractor, Banach space, 37H15, 37G35, Dynamical Systems (math.DS), Synchronization, stochastic differential equation, order-preserving RDS, 01 natural sciences, 010104 statistics & probability, Stochastic differential equation, Mathematics - Analysis of PDEs, statistical equilibrium, Attractor, Synchronization (computer science), FOS: Mathematics, Applied mathematics, Point (geometry), Mathematics - Dynamical Systems, 0101 mathematics, Mathematics, random dynamical system, 010102 general mathematics, Probability (math.PR), Order (ring theory), 37B25, Noise, Statistics, Probability and Uncertainty, Random dynamical system, Mathematics - Probability, Analysis of PDEs (math.AP)

Abstract

We provide sufficient conditions for weak synchronization by noise for order-preserving random dynamical systems on Polish spaces. That is, under these conditions we prove the existence of a weak point attractor consisting of a single random point. This generalizes previous results in two directions: First, we do not restrict to Banach spaces and second, we do not require the partial order to be admissible nor normal. As a second main result and application we prove weak synchronization by noise for stochastic porous media equations with additive noise., Comment: 25 pages

Published

2015

21. Synchronization by noise

Author

Benjamin Gess, Michael Scheutzow, Franco Flandoli, Flandoli, Franco, Gess, Benjamin, and Scheutzow, Michael

Subjects

Statistics and Probability, 37B25, 37G35, 37H15, Mathematical finance, 010102 general mathematics, Probability (math.PR), Lyapunov exponent, Dynamical Systems (math.DS), 01 natural sciences, Noise (electronics), Synchronization, 010104 statistics & probability, Stochastic differential equation, symbols.namesake, Attractor, symbols, FOS: Mathematics, Applied mathematics, Point (geometry), 0101 mathematics, Statistics, Probability and Uncertainty, Mathematics - Dynamical Systems, Random dynamical system, Analysis, Mathematics - Probability, Mathematics

Abstract

We provide sufficient conditions for synchronization by noise, i.e. under these conditions we prove that weak random attractors for random dynamical systems consist of single random points. In the case of SDE with additive noise, these conditions are also essentially necessary. In addition, we provide sufficient conditions for the existence of a minimal weak point random attractor consisting of a single random point. As a result, synchronization by noise is proven for a large class of SDE with additive noise. In particular, we prove that the random attractor for an SDE with drift given by a (multidimensional) double-well potential and additive noise consists of a single random point. All examples treated in [Tearne, PTRF; 2008] are also included., 45 pages

Published

2014