Record Display for the EPA National Library Catalog

RECORD NUMBER: 2 OF 6

OLS Field Name OLS Field Data
Main Title Verification and Transfer of Thermal Pollution Model. Volume I: Verification of Three-Dimensional Free-Surface Model.
Author Lee, Samual S. ; Sengupta, Subrata ; Tuann, S. Y. ; Lee, C. R. ;
CORP Author Miami Univ., Coral Gables, FL. Dept. of Mechanical Engineering.;National Aeronautics and Space Administrattion, Cocoa Beach, FL. John F. Kennedy Space Center.;Industrial Environmental Research Lab., Research Triangle Park, NC.
Year Published 1982
Report Number NAS10-9410; EPA-600/7-82-037A;
Stock Number PB82-238569
Additional Subjects Lake Keowee ; Water pollution control ; Thermal pollution ; Estuaries ; Lakes ; Plumes ; Three dimensional flow ; Height ; Water waves ; Boundary layer ; Circulation ; Interfaces ; Electric power plants ; Aquatic animals ; Turbulent diffusion ; Seasonal variations ; South Carolina ; Flow rate ;
Internet Access
Description Access URL
http://nepis.epa.gov/Exe/ZyPDF.cgi?Dockey=20006VAA.PDF
Holdings
Library Call Number Additional Info Location Last
Modified
Checkout
Status
NTIS  PB82-238569 Most EPA libraries have a fiche copy filed under the call number shown. Check with individual libraries about paper copy. NTIS 06/23/1988
Collation 125p
Abstract
The six-volume report: describes the theory of a three-dimensional (3-D) mathematical thermal discharge model and a related one-dimensional (1-D) model, includes model verification at two sites, and provides a separate user's manual for each model. The 3-D model has two forms: free surface and rigid lid. The former, verified at Anclote Anchorage (FL), allows a free air/water interface and is suited for significant surface wave heights compared to mean water depth; e.g., estuaries and coastal regions. The latter, verified at Lake Keowee (SC), is suited for small surface wave heights compared to depth because surface elevation has been removed as a parameter. These models allow computation of time-dependent velocity and temperature fields for given initial conditions and time-varying boundary conditions.