Applications of Quantum Physics on Resistivity, Dielectricity, Giant Magneto Resistance, Hall Effect and Conductance  

Applications of Quantum Physics on Resistivity, Dielectricity, Giant Magneto Resistance, Hall Effect and Conductance

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作  者:Saleem Iqbal Farhana Sarwar Syed Masood Raza Syed Mohsin Raza Saleem Iqbal;Farhana Sarwar;Syed Masood Raza;Syed Mohsin Raza(Department of Mathematics, University of Balochistan, Quetta, Pakistan;Department of Mathematics, F. G. Girls Degree College, Quetta, Pakistan;Department of Physics, Federal Urdu University of Arts, Science and Technology, Karachi, Pakistan;Department of Physics, University of Balochistan, Quetta, Pakistan)

机构地区:[1]Department of Mathematics, University of Balochistan, Quetta, Pakistan [2]Department of Mathematics, F. G. Girls Degree College, Quetta, Pakistan [3]Department of Physics, Federal Urdu University of Arts, Science and Technology, Karachi, Pakistan [4]Department of Physics, University of Balochistan, Quetta, Pakistan

出  处:《World Journal of Condensed Matter Physics》2016年第2期95-102,共8页凝固态物理国际期刊(英文)

摘  要:Quantum theory with conjecture of fractional charge quantization, eigenfunctions for fractional charge quantization, fractional Fourier transform, Hermite function for fractional charge quantization, and eigenfunction for a twisted and twigged electron quanta is developed and applied to resistivity, dielectricity, giant magneto resistance, Hall effect and conductance. Our theoretical relationship for quantum measurements is in good conformity and in agreement with most of the experimental results. These relationships will pave a new approach to quantum physics for deciphering measurements on single quantum particles without destroying them. Our results are in agreement with 2012 Physics Nobel Prize winning Scientists, Serge Haroche and David J. Wineland.Quantum theory with conjecture of fractional charge quantization, eigenfunctions for fractional charge quantization, fractional Fourier transform, Hermite function for fractional charge quantization, and eigenfunction for a twisted and twigged electron quanta is developed and applied to resistivity, dielectricity, giant magneto resistance, Hall effect and conductance. Our theoretical relationship for quantum measurements is in good conformity and in agreement with most of the experimental results. These relationships will pave a new approach to quantum physics for deciphering measurements on single quantum particles without destroying them. Our results are in agreement with 2012 Physics Nobel Prize winning Scientists, Serge Haroche and David J. Wineland.

关 键 词:Quantum Resistivity Quantum Dielectricity Giant Magneto Resistance Quantum Hall Effect and Conductance 

分 类 号:O17[理学—数学]

 

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