Convergence Characteristics of Multi-scale Quantum Harmonic Oscillator Algorithm

doi:10.3969/j.issn.0372-2112.2016.08.031

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Convergence Characteristics of Multi-scale Quantum Harmonic Oscillator Algorithm

更新时间：2025-07-08

- Convergence Characteristics of Multi-scale Quantum Harmonic Oscillator Algorithm
- Acta Electronica Sinica Vol. 44, Issue 8, Pages: 1988-1993(2016)
- 作者机构：
  
  1. 西南民族大学,四川,成都,610225
  2. 中国科学院成都计算机应用研究所,四川,成都,610041
  3. 中国科学院大学,北京,100049
  4. 国家超级计算深圳中心,广东,深圳,518055
  5. 成都信息工程大学并行计算实验室,四川,成都,610225
  6. 西南民族大学,四川,成都,610225
  7. 中国科学院成都计算机应用研究所,四川,成都,610041
  8. 中国科学院大学,北京,100049
  9. 国家超级计算深圳中心,广东,深圳,518055
  10. 成都信息工程大学并行计算实验室,四川,成都,610225
- 作者简介：
- 基金信息：
  
  National Natural Science Foundation of China (No.60702075);igh-tech Industrialization Science and Technology Research and Development Project of Science and Technology Department of Guangdong Province (No.2011B010200007);Sichuan Youth Science Foundation (No.09ZQ026-068);Technology Innovation Research and Development Project of Chengdu Science and Technology Bureau (No.11RXYB016ZF)
- DOI：10.3969/j.issn.0372-2112.2016.08.031
  CLC： TP301
- Published：2016
- 稿件说明：
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Convergence Characteristics of Multi-scale Quantum Harmonic Oscillator Algorithm[J]. Acta Electronica Sinica, 2016, 44(8): 1988-1993.
DOI：

Convergence Characteristics of Multi-scale Quantum Harmonic Oscillator Algorithm[J]. Acta Electronica Sinica, 2016, 44(8): 1988-1993. DOI： 10.3969/j.issn.0372-2112.2016.08.031.

摘要

多尺度量子谐振子算法的收敛特性证明单一尺度的收敛过程不能同时获得良好的全局搜索精度和局部搜索精度，只有采用多尺度迭代才能实现对全局最优解的逐步精确定位，所以MQHOA算法利用量子谐振子收敛过程（QHO收敛）和多尺度收敛过程（M收敛）两个嵌套的收敛过程实现对优化问题的求解.QHO收敛过程按谐振子波函数由高能态向低能态的变化实现搜索区域的收缩，M收敛过程以2的倍数逐步减小尺度提高搜索精度.算法的波函数收敛定理证明QHO收敛时采样分布为高斯分布.QHO收敛过程算法模型中不同能级和不同尺度下的波函数图像为跟踪研究算法的迭代收敛过程提供了直观的具有物理含义的手段.实验证明算法在收敛过程中基态波函数形态和基态时零点能的存在都与算法物理模型的理论描述和预言是高度吻合的.

Abstract

The convergence characteristics of Multi-scale Quantum Harmonic Oscillator Algorithm (MQHOA) prove that single scale convergence process cannot simultaneously get global search accuracy and local search accuracy.Only by multi-scale iteration can we gradually get the accurate position of the global optimum solution.MQHOA solves the optimization problem by two nested convergence processes:Quantum Harmonic Oscillator convergence process (QHO process) and Multi-scale convergence process (M process).QHO process shrinks the searching areas by the manner harmonic oscillator's wave function moving from high-energy state to low-energy state.M process shrinks the search areas by half cutting to improve searching precision.The wave function convergence theorem proves that sampling distribution is Gauss distribution when QHO process is convergent.By the wave function diagram in different energy level and scale

we can track the algorithm iterative process explicitly.The experiments demonstrate the shape of ground-state wave function

the existence of zero-point energy on the ground state

all of which exactly match the physical model of MQHOA.

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