ERROR BOUNDS FOR APPROXIMATIONS TO EXPECTATION VALUES OF UNBOUNDED OPERATORS.

Abstract

A bound for the error between the expectation value of a self-adjoint operator B on the eigenfunction of a self -adjoint Hamiltonian H and the value given by an approximating vector, is obtained when H is a radial Schrodinger operator and B is multiplicative and unbounded. The analysis makes use of point and asymptotic estimates for the eigenfunction.

Document Details

Document Type
Technical Report
Publication Date
Oct 01, 1965
Accession Number
AD0630037

Entities

People

  • David W. Fox
  • Norman W. Bazley

Organizations

  • Johns Hopkins University Applied Physics Laboratory

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  • Algebra
  • Behavior And Behavior Mechanisms
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  • Eigenvectors
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Fields of Study

  • Mathematics

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  • Linear Algebra