Existence and stability of local excitations in homogeneous neural fields

K. Kishimoto; S. Amari

doi:10.1007/BF00275151

Existence and stability of local excitations in homogeneous neural fields

K. Kishimoto, S. Amari

The University of Tokyo

Research output: Contribution to journal › Article › peer-review

112 Scopus citations

Abstract

Dynamics of excitation patterns is studied in one-dimensional homogeneous lateral-inhibition type neural fields. The existence of a local excitation pattern solution as well as its waveform stability is proved by the use of the Schauder fixed-point theorem and a generalized version of the Perron-Frobenius theorem of positive matrices to the function space. The dynamics of the field is in general multi-stable so that the field can keep short-term memory.

Original language	English
Pages (from-to)	303-318
Number of pages	16
Journal	Journal of Mathematical Biology
Volume	7
Issue number	4
DOIs	https://doi.org/10.1007/BF00275151
State	Published - May 1979
Externally published	Yes

Keywords

Dynamics of pattern formation
Lateral inhibition
Neural field
Perron-Frobenius theorem
Waveform stability

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10.1007/BF00275151

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abstract = "Dynamics of excitation patterns is studied in one-dimensional homogeneous lateral-inhibition type neural fields. The existence of a local excitation pattern solution as well as its waveform stability is proved by the use of the Schauder fixed-point theorem and a generalized version of the Perron-Frobenius theorem of positive matrices to the function space. The dynamics of the field is in general multi-stable so that the field can keep short-term memory.",

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author = "K. Kishimoto and S. Amari",

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AU - Amari, S.

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AB - Dynamics of excitation patterns is studied in one-dimensional homogeneous lateral-inhibition type neural fields. The existence of a local excitation pattern solution as well as its waveform stability is proved by the use of the Schauder fixed-point theorem and a generalized version of the Perron-Frobenius theorem of positive matrices to the function space. The dynamics of the field is in general multi-stable so that the field can keep short-term memory.

KW - Dynamics of pattern formation

KW - Lateral inhibition

KW - Neural field

KW - Perron-Frobenius theorem

KW - Waveform stability

UR - https://www.scopus.com/pages/publications/0018649243

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DO - 10.1007/BF00275151

M3 - 記事

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VL - 7

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EP - 318

JO - Journal of Mathematical Biology

JF - Journal of Mathematical Biology

IS - 4

ER -

Existence and stability of local excitations in homogeneous neural fields

Abstract

Keywords

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