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Generalized Variation Theory—A New, Direct, Numerical Method for the Solution of General Eigenvalue‐Eigenvector Equation
Author(s) -
Lin ChiHsiung,
Huang WinHua,
Su ChaoChang
Publication year - 1982
Publication title -
journal of the chinese chemical society
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.329
H-Index - 45
eISSN - 2192-6549
pISSN - 0009-4536
DOI - 10.1002/jccs.198200001
Subject(s) - eigenvalues and eigenvectors , harmonic oscillator , helium atom , momentum (technical analysis) , chemistry , mathematical analysis , function (biology) , measure (data warehouse) , mathematics , quantum mechanics , helium , physics , finance , database , evolutionary biology , computer science , economics , biology
A new variation theory based on the behavior of function vector in a dual vector space is presented. The procedure is applicable to any quantum mechanical eigenvalue‐eigenvector problem and gives appropriate solution even with crude numerical integration to save computational cost. The theory offers an absolute measure of propriety for the assigned trial function. Applications on a free particle with a definite momentum, a particle in a one‐dimensional box with a definite energy, the one‐dimensional harmonic oscillator, and the ground state of helium atom are shown to demonstrate the merits of the theory.