EXACT AND APPROXIMATE SOLUTIONS OF THE SPECTRAL PROBLEMS FOR THE DIFFERENTIAL SCHROEDINGER OPERATOR WITH POLYNOMIAL POTENTIAL IN R~K, K≥2

V. L. Makarov

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EXACT AND APPROXIMATE SOLUTIONS OF THE SPECTRAL PROBLEMS FOR THE DIFFERENTIAL SCHROEDINGER OPERATOR WITH POLYNOMIAL POTENTIAL IN R~K, K≥2

机译：差分施罗德轿车操作员的频谱问题的精确和近似解，具有r〜k，k≥2的多项式电位

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We consider spectral problems for the Schrodinger operator with polynomial potentials in R~k≥2. By using a functional-discrete (FD-)method and the Maple computer algebra system, we determine a series of exact least eigenvalues for the potentials of special form. In the case where the traditional FD-method is divergent (the degree of the polynomial potential exceeds 2 at least in one variable), we propose a modification of the method, which proves to be quite efficient for the class of problems under consideration. The obtained theoretical results are illustrated by numerical examples.

机译：我们考虑Schrodinger运算符的频谱问题，具有R〜K≥2的多项式电位。通过使用功能 - 离散（FD-）方法和枫木计算机代数系统，我们确定了一系列特殊形式潜力的确切最小特征值。在传统FD-方法的情况下（多项式电位的程度至少在一个变量中超过2），我们提出了对该方法的修改，这证明了对所考虑的问题类别非常有效。通过数值实施例说明所获得的理论结果。

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《Journal of Mathematical Sciences》 |2019年第3期|289-322|共34页
作者
V. L. Makarov;
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Institute of Mathematics Ukrainian National Academy of Sciences Tereshchenkivs'ka Str. .3 Kyiv 01004 Ukraine;

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1. EXACT AND APPROXIMATE SOLUTIONS OF THE SPECTRAL PROBLEMS FOR THE DIFFERENTIAL SCHROEDINGER OPERATOR WITH POLYNOMIAL POTENTIAL IN R~K, K≥2 [J] . V. L. Makarov Journal of Mathematical Sciences . 2019,第3期

机译：R〜K，K≥2的具有多项式势的微分Schroedinger算子的谱问题的精确解
2. Exact and Approximate Solutions of Spectral Problems for the Schrodinger Operator on (-infinity, infinity) with Polynomial Potential [J] . Makarov V. L. Ukrainian mathematical journal . 2018,第1期

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EXACT AND APPROXIMATE SOLUTIONS OF THE SPECTRAL PROBLEMS FOR THE DIFFERENTIAL SCHROEDINGER OPERATOR WITH POLYNOMIAL POTENTIAL IN R~K, K≥2

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