Examples of 'lyapunov' in a sentence
Meaning of "lyapunov"
lyapunov (noun) - a mathematical term referring to a function or method used in the study of stability in dynamical systems
How to use "lyapunov" in a sentence
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lyapunov
Lyapunov developed many important approximation methods.
Finite time lyapunov exponent.
Lyapunov functions are really this simple thing.
Usually we study the cml synchronization by calculating the conditional lyapunov exponents.
Lyapunov vectors are not necessarily orthogonal.
The convergence and stability analysis is based on the lyapunov stability theory.
Lyapunov function for general dynamical systems.
Therefore is a Lyapunov function for the system.
Lyapunov developed many important approximative methods.
The continuous Lyapunov equation is of the form.
Lyapunov exponents play an important role in this work.
A more general method involves Lyapunov functions.
Determining lyapunov exponents from a time series.
Trivial solution and its stability according to Lyapunov.
Lyapunov functions and stability problems.
See also
I am gonna call this a Lyapunov function.
Lyapunov enjoyed a successful career as a pianist.
Remember we are talking about Lyapunov functions.
Lyapunov enjoyed a successful career as a pianist as well as a composer.
Laugh we are done now with Lyapunov functions.
Lyapunov stability and instability.
Specialized software is available for solving Lyapunov equations.
Lyapunov theorems for systems described by retarded functional differential equations.
Control based on direct method of Lyapunov.
Lyapunov functions arise in the study of equilibrium points of dynamical systems.
The obtained controller is called recursive Lyapunov redesign.
Lyapunov candidate function.
This is the center of the Lyapunov stability theory.
Lyapunov characteristic exponent.
Is instable in the sense of Lyapunov for.
Lyapunov characteristic number.
The stability of control system is proved by Lyapunov theory.
Lyapunov exponents use logarithms to gauge the degree of chaoticity of a dynamical system.
A center equilibrium position is stable in the sense of Lyapunov.
Lyapunov theory is used to prove the stability of the closed loop system.
Stability is understood in the Lyapunov sense.
The three largest lyapunov exponents were computed in order to characterize all the attractors.
So this is gonna be a Lyapunov function.
Lyapunov stability is typically used to derive control adaptation laws and show convergence.
Thus the sum of all Lyapunov exponents must be zero.
Lyapunov exponents will be obtained to characterize the chaotic dynamics observed in the phase space.
It is based on Lyapunov stability theory.
A Lyapunov function for an autonomous dynamical system.
So we are talking about Lyapunov processes.
A Lyapunov based analysis probes the system stability.
Let us choose as a Lyapunov function.
At least one Lyapunov exponent of a deterministically chaotic system is positive.
These conditions allow implicitly determining a local Lyapunov function.
Positive Lyapunov exponents in families of one dimensional dynamical systems.
The proof relies essentially on the existence of a Lyapunov functional.
