Solution of Nonlinear Advection-Diffusion Equations via Linear Fractional Map Type Nonlinear QCA 被引量：1

Solution of Nonlinear Advection-Diffusion Equations via Linear Fractional Map Type Nonlinear QCA

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摘要 Linear fractional map type (LFMT) nonlinear QCA (NLQCA), one of the simplest reversible NLQCA is studied analytically as well as numerically. Linear advection equation or Time Dependent Schrödinger Equation (TDSE) is obtained from the continuum limit of linear QCA. Similarly it is found that some nonlinear advection-diffusion equations including inviscid Burgers equation and porous-medium equation are obtained from LFMT NLQCA. Linear fractional map type (LFMT) nonlinear QCA (NLQCA), one of the simplest reversible NLQCA is studied analytically as well as numerically. Linear advection equation or Time Dependent Schrödinger Equation (TDSE) is obtained from the continuum limit of linear QCA. Similarly it is found that some nonlinear advection-diffusion equations including inviscid Burgers equation and porous-medium equation are obtained from LFMT NLQCA.

作者 Shinji Hamada Hideo Sekino Shinji Hamada;Hideo Sekino(Toyohashi University of Technology, Toyohashi, Japan;Stony Brook University, New York, USA;Tokyo Institute of Technology, Tokyo, Japan)

机构地区 Toyohashi University of Technology Stony Brook University Tokyo Institute of Technology

出处《Journal of Quantum Information Science》 2016年第4期263-295,共33页 量子信息科学期刊（英文）

关键词 Nonlinear Quantum Cellular Automaton QCA Quantum Walk Linear Fractional Map Advection-Diffusion Equation Burgers Equation Porous-Medium Equation SOLITON Nonlinear Quantum Cellular Automaton QCA Quantum Walk Linear Fractional Map Advection-Diffusion Equation Burgers Equation Porous-Medium Equation Soliton

分类号 O17 [理学—基础数学]

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Journal of Quantum Information Science

2016年第4期

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Solution of Nonlinear Advection-Diffusion Equations via Linear Fractional Map Type Nonlinear QCA 被引量：1

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