<--- Back to Details
First PageDocument Content
Finite differences / Interpolation / Finite difference method / Finite difference / Polynomials / Numerical differentiation / Partial differential equation / Polynomial interpolation / Computational fluid dynamics / Mathematical analysis / Mathematics / Numerical analysis
Date: 2015-04-02 12:13:45
Finite differences
Interpolation
Finite difference method
Finite difference
Polynomials
Numerical differentiation
Partial differential equation
Polynomial interpolation
Computational fluid dynamics
Mathematical analysis
Mathematics
Numerical analysis

Finite differences (cont.)

Add to Reading List

Source URL: ocw.mit.edu

Download Document from Source Website

File Size: 1,01 MB

Share Document on Facebook

Similar Documents

Numerical analysis / Interpolation / Numerical linear algebra / Partial differential equations / Computational science / Polynomial interpolation / Numerical integration / Relaxation / Multigrid method / Discrete Fourier transform / Numerical differentiation / Singular value decomposition

PDF Document

DocID: 1p4ir - View Document

Mathematics / Mathematical analysis / Academia / Operations research / Differential calculus / Automatic differentiation / Computer algebra / Applied mathematics / Numerical analysis / Finite element method / Mathematical optimization / Linear programming

Posters at ADPatrick E. Farrell (Department of Earth Science and Engineering, Imperial College London, UK): Automating the adjoint of finite element discretisations In this work we demonstrate the capability of

DocID: 1nsZ8 - View Document

Computer algebra / Computer arithmetic / Algebra / Numerical analysis / Polynomials / Interval arithmetic / Automatic differentiation / Floating point / Polynomial / Remainder / Symbolic computation / Interval

JAR manuscript No. (will be inserted by the editor) Proving Tight Bounds on Univariate Expressions with Elementary Functions in Coq Érik Martin-Dorel · Guillaume Melquiond

DocID: 1nqBL - View Document

NDL-v2.0: A New Version of the Numerical Differentiation Library for Parallel Architectures P. E. Hadjidoukasa,∗, P. Angelikopoulosa , C. Voglisb , D. G. Papageorgiouc , I. E. Lagarisb a

DocID: 1mLJU - View Document

Numerical Differentiation The aim of numerical differentiation is to obtain an approximation for the derivative of a function at a point in terms of function values in one of the following contexts: when the function is

DocID: 1mJ3o - View Document