Questions tagged [chaos-theory]

Question 1

The Henon map $H_{a,b}$ is a smooth one-to-one mapping ${\mathbb R}^2 \ni (x,y) \rightarrow H_{a,b} (x,y):= (1 - a x^2 + y, b x) \in {\mathbb R}^2 $ of the plane to itself. This mapping exhibits a ...

Question 2

It feels to me the answer must be no because the circumstances have changed however subtly. Is there a Mathematical name for this - is it determinism, causality, chaos theory? Another example: There ...

Question 3

A continuous function $f$ maps $[a,b]$ to itself. For each $x$ in $[a,b]$, $f(f(x)) = x \Rightarrow f(x) = x$. Is it true that each sequence generated by iterating $f$ over $x$ always commerges? ...

Question 4

Consider a sequence $A=(a_i)_{i=0}^{\infty}$ with $a_0\neq 0$ that determines the evolution of an infinite system of ODEs \begin{align*} \dot{X}_n&=-\epsilon X_n-a_n+\frac{a_0}{X_1}X_{n+1}, \end{...

Question 5

I'm trying to study the behaviour of the family of maps $T_h:[0,1]\to[0,1]$ defined by $T_h(x)=\min{(h,1-2|x-\frac{1}{2}|)}$. I stumbled upon the family at the end of this paper on Sharkovsky's ...

Question 6

Given any system that behaves chaotically (e.g. three-body problem), can the chaotic nature of it be erased by "rescaling" it? In other words, will the system behave in a non-chaotic manner ...

Question 7

Fasano & Marmi Analytical Mechanics, states the K.A.M. theorem in section 12.6, page 528 as follows: Theorem 12.12 (KAM) Consider a quasi-integrable Hamiltonian system $$H(J, χ, ε) = H_0(J) + εF(...

Question 8

Based on the concept of logistic iterative operations, $x\rightarrow kx(1-x)$,where $k\in[0,4]$, I have proposed a similar iterative operation relationship.Specifically, I considered the form $${} x\...

Question 9

The orthic triangle exists for any given triangle with the following remarks: For acute triangle orthic triangle is inscribed triangle For a rectangular triangle it is degenerated triangle (a segment)...

Question 10

The Lorenz equation is given by $\frac{dx}{dt}=\sigma\left(y-x\right)$ $\frac{dy}{dt}=\rho x - y - xz$ $\frac{dz}{dt}=xy - \beta z$. I want to change the deterministic equation to stochastic version ...

Question 11

I am interested in the following question. Consider two identical cylinders (or in 2D, two circles) of radius $r$, with centers separated by a distance $s$. A point particle is released above with a ...

Question 12

I'm currently studying the following map: $$ T(x)=2\min\{1.5x\bmod1,1-(1.5x\bmod 1)\} $$ If $f_\alpha$ denotes the family of tent maps (with $\alpha\in[0,2]$) and $g_\beta$ denotes the family of beta ...

Question 13

I have a fundamental question about the behavior of Lyapunov exponents under smooth transformations. Intuitively, I would expect that a chaotic system's Lyapunov exponents will not be preserved if, ...

Question 14

I stumbled across an interesting paper from decades ago, about a simple way to find strange attractors of the following quadratic map: $$ x_{n+1}=a_1+a_2x_n+a_3x_n^2+a_4x_ny_n+a_5y_n+a_6y_n^2\\ y_{n+1}...

Question 15

Behavior of the iterative process $f(x) = x^2 - 1$: divergence for $x > \phi$ and convergence to a 2-cycle for $0 < x < \phi$ I am analyzing the iterative process defined by $f(x) = x^2 - 1$, ...

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Questions tagged [chaos-theory]

Period-eight transition critical parameter for the Henon map.

You skip a go on roulette and your number comes up. But would it necessarily have come up if you had placed the bet? [closed]

Suppose a continuous function $f : [a,b] \to [a, b]$ has no point of period 2. Does each sequence $x, f(x), f(f(x)), \cdots$ converges?

Admissibility of chaos in an infinite system of ODEs

Family of truncated tent maps

Chaos theory problems and arbitrary precision

Lebesgue measure of the set of invariant tori in KAM theorem

Strange phenomenon in iterative operations

Iterations of orthic triangles

Stochastic version of Lorentz equation based on the system size

Reflection between Two Parallel Cylinders

Literature on $\beta$-transformation composed with tent map

Invariance of Lyapunov exponents under diffeomorphisms

Determining if a quadratic map is a strange attractor using Lyapunov exponent

Behavior of the iterative process $f(x)=x^2-1$: divergence for $x>\phi$ and convergence to a 2-cycle for $0<x< \phi$

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