Asymptotic solution of Sturm-Liouville problem with periodic boundary conditions for relativistic finite-difference Schrödinger equation

Discrete and Continuous Models and Applied Computational Science Pub Date : 2020-12-15 DOI:10.22363/2658-4670-2020-28-3-230-251

I. Amirkhanov, Irina S. Kolosova, S. Vasilyev

{"title":"Asymptotic solution of Sturm-Liouville problem with periodic boundary conditions for relativistic finite-difference Schrödinger equation","authors":"I. Amirkhanov, Irina S. Kolosova, S. Vasilyev","doi":"10.22363/2658-4670-2020-28-3-230-251","DOIUrl":null,"url":null,"abstract":"The quasi-potential approach is very famous in modern relativistic particles physics. This approach is based on the so-called covariant single-time formulation of quantum field theory in which the dynamics of fields and particles is described on a space-like three-dimensional hypersurface in the Minkowski space. Special attention in this approach is paid to methods for constructing various quasi-potentials. The quasipotentials allow to describe the characteristics of relativistic particles interactions in quark models such as amplitudes of hadron elastic scatterings, mass spectra, widths of meson decays and cross sections of deep inelastic scatterings of leptons on hadrons. In this paper SturmLiouville problems with periodic boundary conditions on a segment and a positive half-line for the 2m-order truncated relativistic finite-difference Schrdinger equation (LogunovTavkhelidzeKadyshevsky equation, LTKT-equation) with a small parameter are considered. A method for constructing of asymptotic eigenfunctions and eigenvalues in the form of asymptotic series for singularly perturbed SturmLiouville problems with periodic boundary conditions is proposed. It is assumed that eigenfunctions have regular and boundary-layer components. This method is a generalization of asymptotic methods that were proposed in the works of A. N. Tikhonov, A. B. Vasilyeva, and V. F Butuzov. We present proof of theorems that can be used to evaluate the asymptotic convergence for singularly perturbed problems solutions to solutions of degenerate problems when 0 and the asymptotic convergence of truncation equation solutions in the case m. In addition, the SturmLiouville problem on the positive half-line with a periodic boundary conditions for the quantum harmonic oscillator is considered. Eigenfunctions and eigenvalues \nare constructed for this problem as asymptotic solutions for 4-order LTKT-equation.","PeriodicalId":34192,"journal":{"name":"Discrete and Continuous Models and Applied Computational Science","volume":"1 1","pages":""},"PeriodicalIF":0.0000,"publicationDate":"2020-12-15","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Discrete and Continuous Models and Applied Computational Science","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.22363/2658-4670-2020-28-3-230-251","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}

引用次数: 0

Abstract

The quasi-potential approach is very famous in modern relativistic particles physics. This approach is based on the so-called covariant single-time formulation of quantum field theory in which the dynamics of fields and particles is described on a space-like three-dimensional hypersurface in the Minkowski space. Special attention in this approach is paid to methods for constructing various quasi-potentials. The quasipotentials allow to describe the characteristics of relativistic particles interactions in quark models such as amplitudes of hadron elastic scatterings, mass spectra, widths of meson decays and cross sections of deep inelastic scatterings of leptons on hadrons. In this paper SturmLiouville problems with periodic boundary conditions on a segment and a positive half-line for the 2m-order truncated relativistic finite-difference Schrdinger equation (LogunovTavkhelidzeKadyshevsky equation, LTKT-equation) with a small parameter are considered. A method for constructing of asymptotic eigenfunctions and eigenvalues in the form of asymptotic series for singularly perturbed SturmLiouville problems with periodic boundary conditions is proposed. It is assumed that eigenfunctions have regular and boundary-layer components. This method is a generalization of asymptotic methods that were proposed in the works of A. N. Tikhonov, A. B. Vasilyeva, and V. F Butuzov. We present proof of theorems that can be used to evaluate the asymptotic convergence for singularly perturbed problems solutions to solutions of degenerate problems when 0 and the asymptotic convergence of truncation equation solutions in the case m. In addition, the SturmLiouville problem on the positive half-line with a periodic boundary conditions for the quantum harmonic oscillator is considered. Eigenfunctions and eigenvalues are constructed for this problem as asymptotic solutions for 4-order LTKT-equation.

查看原文本刊更多论文

相对论有限差分Schrödinger方程具有周期边界条件的Sturm-Liouville问题的渐近解

准势方法在现代相对论粒子物理学中非常著名。这种方法基于量子场论的所谓协变单时间公式，其中场和粒子的动力学是在闵可夫斯基空间中的类空间三维超曲面上描述的。该方法特别注意构造各种拟势的方法。准势可以描述夸克模型中相对论粒子相互作用的特征，如强子弹性散射的振幅、质谱、介子衰变的宽度以及轻子在强子上的深非弹性散射的截面。本文研究了2m阶截断相对论性小参数有限差分薛定谔方程（LogunovTavkhelidzeKadyshevsky方程，LTKT方程）在一段正半线上具有周期边界条件的SturmLiuville问题。针对具有周期边界条件的奇摄动SturmLiuville问题，提出了一种构造渐近特征函数和渐近级数形式特征值的方法。假设本征函数具有规则分量和边界层分量。该方法是a.N.Tikhonov、a.B.Vasilyeva和V.F.Butuzov等人提出的渐近方法的推广。我们给出了一些定理的证明，这些定理可用于评估奇摄动问题解到退化问题解在0时的渐近收敛性和截断方程解在情况m下的渐近收敛。此外，考虑了具有周期边界条件的量子谐振子正半线上的SturmLiuville问题。将该问题的特征函数和特征值构造为4阶LTKT方程的渐近解。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

求助全文

约1分钟内获得全文求助全文

来源期刊