has been cited by the following article(s):
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[1]
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Variational quantum algorithms for Poisson equations based on the decomposition of sparse Hamiltonians
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Physical Review A,
2023 |
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[2]
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DISCRETE AND CONTINUOUS MODELS AND APPLIED COMPUTATIONAL SCIENCE
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2022 |
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Finite-difference methods for solving 1D Poisson problem
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Discrete and Continuous Models and Applied …,
2022 |
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[4]
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A whole high-accuracy numerical calculation system for the 1D Poisson equation by the interpolation finite difference method
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AIP Advances,
2022 |
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[5]
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Variational quantum algorithm for the Poisson equation
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Physical Review A,
2021 |
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Solution of Partial Derivative Equations of Poisson and Klein-Gordon with Neumann Conditions as a Generalized Problem of Two-Dimensional Moments
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2020 |
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Non-local pose means for denoising motion capture data
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2017 |
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Fundamental study of heat transport by phonons and electrons in semiconductors at micro and nanoscale
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2017 |
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Experimental Solution to the Laplace Equation, a Tutorial Approach
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2016 |
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Истраживање динамике и развој машина вертикалног транспорта применом нумеричко-експерименталних поступака
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2016 |
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Electrostatic model of the energy-bending within organic semiconductors: experiment and simulation
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Journal of Physics: Condensed Matter,
2016 |
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Investigation into the Gaussian density of states widths of organic semiconductors
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Journal of Physics D: Applied Physics,
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Manifold Learning Techniques for Editing Motion Capture Data
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2016 |
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Generalization of the Exact Solution of 1D Poisson Equation with Robin Boundary Conditions, Using the Finite Difference Method
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Journal of Electromagnetic Analysis and Applications,
2014 |
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[15]
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Max-Planck-Institut für Mathematik in den Naturwissenschaften Leipzig
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[1]
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Finite-difference methods for solving 1D Poisson problem
Discrete and Continuous Models and Applied Computational Science,
2022
DOI:10.22363/2658-4670-2022-30-1-62-78
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[2]
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A whole high-accuracy numerical calculation system for the 1D Poisson equation by the interpolation finite difference method
AIP Advances,
2022
DOI:10.1063/5.0093636
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[3]
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Variational quantum algorithm for the Poisson equation
Physical Review A,
2021
DOI:10.1103/PhysRevA.104.022418
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[4]
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Non-local pose means for denoising motion capture data
2017 International Conference on Image and Vision Computing New Zealand (IVCNZ),
2017
DOI:10.1109/IVCNZ.2017.8402451
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[5]
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Investigation into the Gaussian density of states widths of organic semiconductors
Journal of Physics D: Applied Physics,
2016
DOI:10.1088/0022-3727/49/32/325106
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[6]
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Electrostatic model of the energy-bending within organic semiconductors: experiment and simulation
Journal of Physics: Condensed Matter,
2016
DOI:10.1088/0953-8984/28/36/365002
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[7]
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Generalization of the Exact Solution of 1D Poisson Equation with Robin Boundary Conditions, Using the Finite Difference Method
Journal of Electromagnetic Analysis and Applications,
2014
DOI:10.4236/jemaa.2014.612038
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