Ponencia
Matrix Representation of Spiking Neural P Systems
Autor/es | Zeng, Xiangxiang
Adorna, Henry N. Martínez del Amor, Miguel Ángel Pan, Linqiang Pérez Jiménez, Mario de Jesús |
Departamento | Universidad de Sevilla. Departamento de Ciencias de la Computación e Inteligencia Artificial |
Fecha de publicación | 2011 |
Fecha de depósito | 2018-03-15 |
Publicado en |
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ISBN/ISSN | 978-3-642-18122-1 0302-9743 |
Resumen | Spiking neural P systems (SN P systems, for short) are a class of distributed parallel computing devices inspired from the way neurons communicate by means of spikes. In this work, a discrete structure representation of ... Spiking neural P systems (SN P systems, for short) are a class of distributed parallel computing devices inspired from the way neurons communicate by means of spikes. In this work, a discrete structure representation of SN P systems with extended rules and without delay is proposed. Specifically, matrices are used to represent SN P systems. In order to represent the computations of SN P systems by matrices, configuration vectors are defined to monitor the number of spikes in each neuron at any given configuration; transition net gain vectors are also introduced to quantify the total amount of spikes consumed and produced after the chosen rules are applied. Nondeterminism of the systems is assured by a set of spiking transition vectors that could be used at any given time during the computation. With such matrix representation, it is quite convenient to determine the next configuration from a given configuration, since it involves only multiplication and addition of matrices after deciding the spiking transition vector. |
Agencias financiadoras | Ministerio de Ciencia e Innovación (MICIN). España Junta de Andalucía |
Identificador del proyecto | TIN2009-13192
P08-TIC04200 |
Cita | Zeng, X., Adorna, H.N., Martínez del Amor, M.Á., Pan, L. y Pérez Jiménez, M.d.J. (2011). Matrix Representation of Spiking Neural P Systems. En CMC 2010: 11th International Conference on Membrane Computing (377-392), Jena, Germany: Springer. |
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