| 隔离层厚度对量子垒堆结构的电子滤波作用的影响 |
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| 引用本文: | 郭子政,吴晓薇.隔离层厚度对量子垒堆结构的电子滤波作用的影响[J].内蒙古师范大学学报(自然科学版),1996(3):22-27. |
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| 作者姓名: | 郭子政 吴晓薇 |
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| 作者单位: | 内蒙古师范大学物理系,内蒙古农牧学院基础部 |
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| 摘 要: | 研究了隔离层厚区对量子垒堆结构的电子滤波作用的影响.对于单隔离层,在较为一般的情况下解析推得隔离层厚度满足的广义Bragg公式,以多重双势垒结构为例对多隔离层的情况也进行了研究。结果表明同时存在两类共振隧穿(RT),第一类RT是法布里-珀罗型RT,要求隔离层厚度满足Bragg公式或广义Bregg公式;第二类RT是依次型RT,对隔离层厚度没有要求.特别指出x=0的RT能对于中心对称结构是实现依次型RT的重要途径.
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| 关 键 词: | 量子垒堆结构,隔离层,共振隧穿,Bragg公式,法布里-珀罗效应 |
EFFECTS OF SPACER THICKNESS ON THE ELECTRON FILTING FUNCTION OF QUANTUM BARRIER-STACK STRUCTURES |
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| Guo Zizheng, Wu Xiaowei.EFFECTS OF SPACER THICKNESS ON THE ELECTRON FILTING FUNCTION OF QUANTUM BARRIER-STACK STRUCTURES[J].Journal of Inner Mongolia Normal University(Natural Science Edition),1996(3):22-27. |
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| Authors: | Guo Zizheng Wu Xiaowei |
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| Abstract: | The effects of spaeer thickness on the electron filting funetion of quantum barrier-stack structures are studied. For the case of single spacer.the generallzed Bragg for mula confining the spacer thickness is derived analytically.The multiple double-barrier structures are also studied as an example of the systems with more than one spacers. The results show that there exist two types of resonant tunneling(RT),one is Fabry-Perot RT. in which the spacer thickness must he satisfied with the Bragg formula or the generallzed Bragg formula; and the another type is the successive RT.in which the spacer thickness has nothing to do with the RT. It is pointed out especially that the RT energies satisfying the equation x= 0 is an important approach to realze successive RT for the systems with central symmetry. |
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| Keywords: | quantum barrier-stack strueture spacer resonant tunneling Bragg's formula Fabry-Perot's effect |
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