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Abstract
ローレンツ変換L(β)の行列を局所的に相互作用を持たない線形セルラーオートマトンとみなし、局所的相互作用を持つセルラーオートマトンの考えを用いてL(β)をL_X(β, 0)=L(β)となるようにL_X(β, γ)に拡張し、新しい特殊相対論の原理を導入する。
Cellular automata are transformations with local interaction, and can thus be used to generalize the Lorentz transformation L(β) by regarding the matrix as a linear cellular automaton with no interaction (i.e., scope 1). It is consequently obtained as a special case given by L_X(β, 0)=L(β), where L_X(β, γ) is the generalized form of L(β) including local interaction based on the concept of linear cellular automata. This case leads to a new principle of special relativity.
Journal
- Technical report of IEICE. LQE [List of Volumes]
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Technical report of IEICE. LQE 105(593), 1-4, 2006-01-26 [Table of Contents]
The Institute of Electronics, Information and Communication Engineers
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