Finite Difference Schemes for Long-Time Integration

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Abstract:

Finite difference schemes for the evaluation of first and second derivatives are presented. These second order compact schemes were designed for long-time integration of evolution equations by solving a quadratic constrained minimization problem. The quadratic cost function measures the global truncation error while taking into account the initial data. The resulting schemes are applicable for integration times fourfold, or more, longer than similar previously studied schemes. A similar approach was used to obtain improved integration schemes. Finite differences, Long-time integration, Compact schemes.

Author(s):
Haras, Zigo ; Ta'asan, Shlomo
Author Organization(s):
INSTITUTE FOR COMPUTER APPLICATIONS IN SCIENCE AND ENGINEERING HAMPTON VA
Descriptive Note:
Contractor rept.
Pagination:
0033

Security Markings

DOCUMENT & CONTEXTUAL SUMMARY

Distribution:
Approved For Public Release
Distribution Statement:
Approved For Public Release; Distribution Is Unlimited.

RECORD

Collection: TR
Identifying Numbers
Report Number(s):
ICASE-93-25, NASA-CR-191471
Contract/Grant Number(s):
NAS1-19480, NAS1-18605
Monitor Series:
CR-191471, NASA
 Subject Terms
Joint Capability Areas:
JCA_1.4.2_Health Service Delivery; JCA_1.4_Force Support; JCA_5.3_Planning; JCA_5_Command and Control; JCA_6.3.3_Spectrum Management; JCA_4.5.1_Contract Support Integration; JCA_4.5_Operational Contract Support; JCA_1_Force Support; JCA_6.3_Net Management; JCA_6_Net Centric
Modernization Areas:
Quantum Science and Computing
Communities of Interest:
Energy and Power Technologies
Descriptor(s):
*FINITE DIFFERENCE THEORY, *NUMERICAL INTEGRATION, *DERIVATIVES(MATHEMATICS), TEST AND EVALUATION, GLOBAL, ERRORS, EQUATIONS, APPROACH, TRUNCATION, PARTIAL DIFFERENTIAL EQUATIONS, TURBULENT FLOW, TIME, COSTS
Field(s)/Group(s):
Numerical Mathematics
Keyword(s):
WU505 90 52 01
Report Date:
1993 Jun 01