TRANSFORMATIONS BETWEEN HALF-RANGE AND FULL-RANGE ANGULAR EXPANSIONS AND THE TRANSPORT PROBLEM

Author: O'Reilly, B. D.
Published: United States : [publisher not identified], 1961.
[Oak Ridge, Tennessee] : [U.S. Atomic Energy Commission], 1961.
Physical Description: microopaque : positive ; 8 x 13 cm

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Summary

Transformati ons were derived which relate the expansion coefficients of an arbitrary function f( omega ) represented in terms of a complete set of functions orthogonal over in terms of the members of a pair of such sets orthogonal over (-1,0) and (0,+1). The expansion sets were then specialized to full-range and half-range polynomials, and the results used to obtain a general expression for the angularly reduced scattering integral in the double-P representation of the one-dimensional transport equation. The reduction of the scattering integral is illustrated for the cases of scattering without deflection and isotropic scattering. General formulas for obtaining representations of the transformation matrices are given. (auth)

Report Numbers

WAPD-T-1305

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Collection

U.S. Atomic Energy Commission depository collection.

Note

DOE contract number: AT(11-1)-GEN-14
NSA number: NSA-17-005206
OSTI Identifier 4756201
Research organization: Westinghouse Electric Corp. Bettis Atomic Power Lab., Pittsburgh.

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TRANSFORMATIONS BETWEEN HALF-RANGE AND FULL-RANGE ANGULAR EXPANSIONS AND THE TRANSPORT PROBLEM

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