# Design of Sturm global attractors 1: Meanders with three noses, and   reversibility

**Authors:** Bernold Fiedler, Carlos Rocha

arXiv: 2302.12531 · 2023-07-27

## TL;DR

This paper classifies a specific class of global attractors for scalar parabolic PDEs on an interval, using Sturm meanders with three noses, and reveals surprising reversibility properties.

## Contribution

It introduces a systematic classification of Sturm meanders with three noses and describes the global attractor structure and reversibility in these PDEs.

## Key findings

- Classification of Sturm meanders with three noses.
- Description of the connection graphs for the global attractors.
- Reversibility properties on the attractor boundary.

## Abstract

We systematically explore a simple class of global attractors, called Sturm due to nodal properties, for the semilinear scalar parabolic PDE   \begin{equation*}\label{eq:*}   u_t = u_{xx} + f(x,u,u_x) %\tag{$*$}   \end{equation*} on the unit interval $0 < x<1$, under Neumann boundary conditions. This models the interplay of reaction, advection, and diffusion.   Our classification is based on the Sturm meanders, which arise from a shooting approach to the ODE boundary value problem of equilibrium solutions $u_t=0$. Specifically, we address meanders with only three "noses", each of which is innermost to a nested family of upper or lower meander arcs. The Chafee-Infante paradigm, with cubic nonlinearity $f=f(u)$, features just two noses.   Our results on the gradient-like global PDE dynamics include a precise description of the connection graphs. The edges denote PDE heteroclinic orbits $v_1 \leadsto v_2$ between equilibrium vertices $v_1, v_2$ of adjacent Morse index. The global attractor turns out to be a ball of dimension $d$, given as the closure of the unstable manifold $W^u(\mathcal{O})$ of the unique equilibrium with maximal Morse index $d$. Surprisingly, for parabolic PDEs based on irreversible diffusion, the connection graph indicates time reversibility on the ($d$-1)-sphere boundary of the global attractor.

## Full text

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## Figures

8 figures with captions in the complete paper: https://tomesphere.com/paper/2302.12531/full.md

## References

106 references — full list in the complete paper: https://tomesphere.com/paper/2302.12531/full.md

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Source: https://tomesphere.com/paper/2302.12531