2,332 research outputs found

    ANALYSIS OF CELLULAR DYNAMIC BINARY NEURAL NETWORKS

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    This paper studies dynamic binary neural networks characterized by signum activation function, local connection parameters and integer threshold paremeters. The DBNN is constructed by applying delayed feedback to the binary neural networks. The network can generate various periodic orbits. The dynamics is simplified into a digital return map on a set of lattice points. We analyze the dynamics by replacing The DBNN with a simple class network in this paper. We consider the relationship between cellular automata and DBNN. Calculating feature quantities, we investigate the relationship between a simple class of CA and DBNN with local connection. Analysis of the DBNN is important not only as fundamental nonlinear problems but also for engineering applications

    Analysis of various steady states and transient phenomena in digital maps : foundation for theory construction and engineering applications

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    研究成果の概要 (和文) : デジタルマップ(Dmap)の解析と実装に関して以下のような成果を得た。まず、周期軌道の豊富さと安定性に関する特徴量を用いた解析法を考案し、典型例を解析し、現象の基本的な分類を行った。次に、簡素な進化計算によって所望のDmapを合成するアルゴリズムを考案した。アルゴリズムの個体はDmapに対応し、個体数は柔軟に変化する。典型的な例題によってアルゴリズムの妥当性を確認した。さらに、Dmapをデジタルスパイキングニューロン(DSN)によって実現する方法を構築した。DSNは2つのシフトレジスタと配線回路で構成され、様々なスパイク列を生成する。FPGAによる簡素な試作回路を構成し、動作を確認した。研究成果の概要 (英文) : We have studied analysis and implementation of digital maps (Dmaps). The major results are as the following. First, we have developed an analysis method based on two feature quantities. The first quantity characterizes plentifulness of periodic orbits and the second quantity characterizes stability of the periodic orbits. Applying the method, typical Dmap examples are analyzed and basic phenomena are classified. Second, we have developed a simple evolutionary algorithm to realize a desired Dmap. The algorithm uses individuals each of which corresponds to one Dmap and the number of individuals can vary flexibly. Using typical example problems, the algorithm efficiency is confirmed. Third, we have developed a realization method of Dmaps by means of digital spiking neurons (DSNs). The DSN consists of two shift registers connected by a wiring circuit and can generate various periodic spike-trains. Presenting a FPGA based simple test circuit, the DSN dynamics is confirmed

    On Dynamics of Integrate-and-Fire Neural Networks with Conductance Based Synapses

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    We present a mathematical analysis of a networks with Integrate-and-Fire neurons and adaptive conductances. Taking into account the realistic fact that the spike time is only known within some \textit{finite} precision, we propose a model where spikes are effective at times multiple of a characteristic time scale δ\delta, where δ\delta can be \textit{arbitrary} small (in particular, well beyond the numerical precision). We make a complete mathematical characterization of the model-dynamics and obtain the following results. The asymptotic dynamics is composed by finitely many stable periodic orbits, whose number and period can be arbitrary large and can diverge in a region of the synaptic weights space, traditionally called the "edge of chaos", a notion mathematically well defined in the present paper. Furthermore, except at the edge of chaos, there is a one-to-one correspondence between the membrane potential trajectories and the raster plot. This shows that the neural code is entirely "in the spikes" in this case. As a key tool, we introduce an order parameter, easy to compute numerically, and closely related to a natural notion of entropy, providing a relevant characterization of the computational capabilities of the network. This allows us to compare the computational capabilities of leaky and Integrate-and-Fire models and conductance based models. The present study considers networks with constant input, and without time-dependent plasticity, but the framework has been designed for both extensions.Comment: 36 pages, 9 figure

    Complex Dynamics in Dedicated / Multifunctional Neural Networks and Chaotic Nonlinear Systems

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    We study complex behaviors arising in neuroscience and other nonlinear systems by combining dynamical systems analysis with modern computational approaches including GPU parallelization and unsupervised machine learning. To gain insights into the behaviors of brain networks and complex central pattern generators (CPGs), it is important to understand the dynamical principles regulating individual neurons as well as the basic structural and functional building blocks of neural networks. In the first section, we discuss how symbolic methods can help us analyze neural dynamics such as bursting, tonic spiking and chaotic mixed-mode oscillations in various models of individual neurons, the bifurcations that underlie transitions between activity types, as well as emergent network phenomena through synergistic interactions seen in realistic neural circuits, such as network bursting from non-intrinsic bursters. The second section is focused on the origin and coexistence of multistable rhythms in oscillatory neural networks of inhibitory coupled cells. We discuss how network connectivity and intrinsic properties of the cells affect the dynamics, and how even simple circuits can exhibit a variety of mono/multi-stable rhythms including pacemakers, half-center oscillators, multiple traveling-waves, fully synchronous states, as well as various chimeras. Our analyses can help generate verifiable hypotheses for neurophysiological experiments on central pattern generators. In the last section, we demonstrate the inter-disciplinary nature of this research through the applications of these techniques to identify the universal principles governing both simple and complex dynamics, and chaotic structure in diverse nonlinear systems. Using a classical example from nonlinear laser optics, we elaborate on the multiplicity and self-similarity of key organizing structures in 2D parameter space such as homoclinic and heteroclinic bifurcation curves, Bykov T-point spirals, and inclination flips. This is followed by detailed computational reconstructions of the spatial organization and 3D embedding of bifurcation surfaces, parametric saddles, and isolated closed curves (isolas). The generality of our modeling approaches could lead to novel methodologies and nonlinear science applications in biological, medical and engineering systems
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