Unconditional stability of a recurrent neural circuit implementing divisive normalization.

ArXiv Pub Date : 2024-10-31
Shivang Rawat, David J Heeger, Stefano Martiniani
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Abstract

Stability in recurrent neural models poses a significant challenge, particularly in developing biologically plausible neurodynamical models that can be seamlessly trained. Traditional cortical circuit models are notoriously difficult to train due to expansive nonlinearities in the dynamical system, leading to an optimization problem with nonlinear stability constraints that are difficult to impose. Conversely, recurrent neural networks (RNNs) excel in tasks involving sequential data but lack biological plausibility and interpretability. In this work, we address these challenges by linking dynamic divisive normalization (DN) to the stability of "oscillatory recurrent gated neural integrator circuits" (ORGaNICs), a biologically plausible recurrent cortical circuit model that dynamically achieves DN and that has been shown to simulate a wide range of neurophysiological phenomena. By using the indirect method of Lyapunov, we prove the remarkable property of unconditional local stability for an arbitrary-dimensional ORGaNICs circuit when the recurrent weight matrix is the identity. We thus connect ORGaNICs to a system of coupled damped harmonic oscillators, which enables us to derive the circuit's energy function, providing a normative principle of what the circuit, and individual neurons, aim to accomplish. Further, for a generic recurrent weight matrix, we prove the stability of the 2D model and demonstrate empirically that stability holds in higher dimensions. Finally, we show that ORGaNICs can be trained by backpropagation through time without gradient clipping/scaling, thanks to its intrinsic stability property and adaptive time constants, which address the problems of exploding, vanishing, and oscillating gradients. By evaluating the model's performance on RNN benchmarks, we find that ORGaNICs outperform alternative neurodynamical models on static image classification tasks and perform comparably to LSTMs on sequential tasks.

实施除法归一化的递归神经回路的无条件稳定性
循环神经模型的稳定性是一项重大挑战,尤其是在开发可无缝训练的生物学上可信的神经动力学模型方面。传统的大脑皮层电路模型由于动态系统中的扩展非线性而难以训练,导致优化问题中的非线性稳定性约束难以施加。相反,递归神经网络(RNN)在涉及序列数据的任务中表现出色,但缺乏生物合理性和可解释性。在这项工作中,我们通过将动态分裂归一化(DN)与 ORGaNICs 的稳定性联系起来来应对这些挑战。ORGaNICs 是一种生物学上可信的递归皮层电路模型,可动态实现 DN,并已被证明能模拟各种神经生理现象。通过使用李亚普诺夫的间接方法,我们证明了任意维度的 ORGaNICs 电路在递归权重矩阵为同一值时无条件局部稳定的显著特性。因此,我们将 ORGaNICs 与耦合阻尼谐振子系统联系起来,从而推导出电路的能量函数,为电路和单个神经元的目标提供了规范原理。此外,对于一般的递归权重矩阵,我们证明了二维模型的稳定性,并通过经验证明稳定性在更高维度上也是成立的。最后,我们证明 ORGaNICs 可以通过时间反向传播进行训练,而无需梯度剪切/缩放,这要归功于其固有的稳定性和自适应时间常数,它们解决了梯度爆炸、消失和振荡的问题。通过在 RNN 基准上评估该模型的性能,我们发现 ORGaNIC 在静态图像分类任务中的表现优于其他神经动力学模型,而在顺序任务中的表现则与 LSTM 不相上下。
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