<--- Back to Details
First PageDocument Content
Differential equations / Differential calculus / Mathematics / Calculus / Ordinary differential equation / Linear differential equation / Equation / Partial differential equation / Delay differential equation
Date: 2018-02-19 20:58:37
Differential equations
Differential calculus
Mathematics
Calculus
Ordinary differential equation
Linear differential equation
Equation
Partial differential equation
Delay differential equation

Lecture Notes on Virtual Substitution & Real Arithmetic

Add to Reading List

Source URL: symbolaris.com

Download Document from Source Website

File Size: 4,76 MB

Share Document on Facebook

Similar Documents

Efficient Bayesian estimation and uncertainty quantification in ordinary differential equation models

DocID: 1tgNl - View Document

Bayesian inference for higher order ordinary differential arXiv:1505.04242v1 [math.ST] 16 May 2015 equation models Prithwish Bhaumik and Subhashis Ghosal

DocID: 1td6u - View Document

Calculus / Mathematical analysis / Mathematics / Partial differential equations / Differential equations / Multivariable calculus / Integral equation / Metric tensor / Operator theory / Method of characteristics / Heat equation

RESEARCH ON ORDINARY DIFFERENTIAL EQUATION AND FRACTIONAL DIFFERENTIAL EQUATION QU HAIDONG and LIU XUAN Department of Mathematics and Statistics

DocID: 1rstj - View Document

Mathematical analysis / Differential calculus / RungeKutta methods / Numerical analysis / Numerical methods for ordinary differential equations / Stiff equation / Truncation error / CashKarp method / Richardson extrapolation

Noname manuscript No. (will be inserted by the editor) A Linearly Fourth Order Multirate Runge-Kutta Method with Error Control Pak-Wing Fok

DocID: 1rr6w - View Document

Mathematical analysis / Mathematics / Analysis / Interpolation / Meromorphic functions / Polynomials / Algebraic varieties / Complex analysis / Chebyshev polynomials / Chebfun / Rational function / Taylor series

COMPUTING COMPLEX SINGULARITIES OF DIFFERENTIAL EQUATIONS WITH CHEBFUN AUTHOR: MARCUS WEBB∗ AND ADVISOR: LLOYD N. TREFETHEN† Abstract. Given a solution to an ordinary differential equation (ODE) on a time interval, t

DocID: 1riMJ - View Document