The following sections of this BookRags Literature Study Guide is offprint from Gale's For Students Series: Presenting Analysis, Context, and Criticism on Commonly Studied Works: Introduction, Author Biography, Plot Summary, Characters, Themes, Style, Historical Context, Critical Overview, Criticism and Critical Essays, Media Adaptations, Topics for Further Study, Compare & Contrast, What Do I Read Next?, For Further Study, and Sources.
(c)1998-2002; (c)2002 by Gale. Gale is an imprint of The Gale Group, Inc., a division of Thomson Learning, Inc. Gale and Design and Thomson Learning are trademarks used herein under license.
The following sections, if they exist, are offprint from Beacham's Encyclopedia of Popular Fiction: "Social Concerns", "Thematic Overview", "Techniques", "Literary Precedents", "Key Questions", "Related Titles", "Adaptations", "Related Web Sites". (c)1994-2005, by Walton Beacham.
The following sections, if they exist, are offprint from Beacham's Guide to Literature for Young Adults: "About the Author", "Overview", "Setting", "Literary Qualities", "Social Sensitivity", "Topics for Discussion", "Ideas for Reports and Papers". (c)1994-2005, by Walton Beacham.
All other sections in this Literature Study Guide are owned and copyrighted by BookRags, Inc.
As used in quantum mechanics to describe solutions for Schrödinger equations, the term Eigenfunction derives from the Germanic Eigenfunktion, meaning characteristic or proper function. Eigenfunctions correspond to particular eigenvalues (derived from the Germanic Eigenwert to mean the characteristic or proper values). In quantum physics eigenfunctions yield defined and discrete eigenvalues related to quantized values used to describe various attributes of a body or system(e.g., quantum numbers).
The postulates of quantum mechanics state that the physical state of a system can be fully described by specific types of wave functions that can be obtained by solving Schrödinger's equation. Such functions that are possible solutions of this equation are called eigenfunctions or characteristic functions. They exist only for specific eigenvalues or characteristic values of energy. In quantum mechanical calculations, every dynamic variable that correlates with a physically observable property (such as position, linear momentum, angular momentum, time, kinetic energy, potential energy, etc.) is represented by a linear operator. Operators are derived from classical expressions for these properties and, as their name implies, they operate on a function to yield another function, an eigenfunction, that only differs from the first by a constant factor (an eigenvalue).
For example, in quantum mechanical calculations to obtain specific values for energy, the wavefunction is operated with the Hamiltonian operator associated with energy. The solutions of the Schrödinger equation yield only quantized values of energy (i.e., eigenvalues of energy).