Back to the Continuous Attractor.

ArXiv Pub Date : 2024-11-05
Ábel Ságodi, Guillermo Martín-Sánchez, Piotr Sokół, Il Memming Park
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引用次数: 0

Abstract

Continuous attractors offer a unique class of solutions for storing continuous-valued variables in recurrent system states for indefinitely long time intervals. Unfortunately, continuous attractors suffer from severe structural instability in general--they are destroyed by most infinitesimal changes of the dynamical law that defines them. This fragility limits their utility especially in biological systems as their recurrent dynamics are subject to constant perturbations. We observe that the bifurcations from continuous attractors in theoretical neuroscience models display various structurally stable forms. Although their asymptotic behaviors to maintain memory are categorically distinct, their finite-time behaviors are similar. We build on the persistent manifold theory to explain the commonalities between bifurcations from and approximations of continuous attractors. Fast-slow decomposition analysis uncovers the persistent manifold that survives the seemingly destructive bifurcation. Moreover, recurrent neural networks trained on analog memory tasks display approximate continuous attractors with predicted slow manifold structures. Therefore, continuous attractors are functionally robust and remain useful as a universal analogy for understanding analog memory.

回到 "持续吸引器"。
连续吸引子提供了一类独特的解决方案,可以在无限长的时间间隔内将连续值变量存储在循环系统状态中。遗憾的是,连续吸引子一般都具有严重的结构不稳定性--它们会被定义它们的动力学规律的最微小变化所破坏。这种脆弱性限制了它们的应用,尤其是在生物系统中,因为它们的循环动力学会受到持续的扰动。我们观察到,理论神经科学模型中连续吸引子的分岔显示出各种结构稳定的形式。虽然它们维持记忆的渐近行为截然不同,但它们的有限时间行为却很相似。我们以持久流形理论为基础,来解释连续吸引子的分岔和近似之间的共性。快慢分解分析揭示了在看似破坏性的分岔中幸存下来的持久流形。此外,在模拟记忆任务中训练的递归神经网络显示出近似连续吸引子与预测的慢流形结构。因此,连续吸引子在功能上是稳健的,并且仍可作为理解模拟记忆的通用类比。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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