Numerical Solution for Partial Differential Equations (Pde's): the Stability of One Space Dimension Diffusion  Equation with Finite Difference Methods - Michael Mkwizu - Grāmatas - LAP LAMBERT Academic Publishing - 9783846582398 - 2012. gada 6. februāris
Ja vāks un nosaukums nesakrīt, pareizs ir nosaukums

Numerical Solution for Partial Differential Equations (Pde's): the Stability of One Space Dimension Diffusion Equation with Finite Difference Methods

Cena
€ 45,49

Pasūtīts no attālās noliktavas

Paredzamā piegāde . gada 31. jūl. - . gada 10. aug.
Saņemiet paziņojumus par jauniem Michael Mkwizu izdevumiem
Pievienot savam iMusic vēlmju sarakstam

Not rated yet

This book is intended to determine the stability of one space dimension diffusion equation. A Matlab code of finite difference methods with increment of time-space was used in which the behaviour of the errors was observed from the graphs. The explicit scheme was stable with Dirichlet boundary condition when considering space for r less than or equal to 0.5. It was observed that as the gradient alpha of temperature decreases with derivative boundary conditions, the interval of r for the explicit scheme stet stable decreases from the values r less than or equal to 0.5 corresponding to Dirichlet boundary conditions. When the term with coefficient gamma is added to the PDE,explicit scheme becomes stable depending to the value of gamma. The Crank-Nicolson and semi-analytic schemes were stable with both Dirichlet boundary conditions and derivative boundary conditions for all r. It was observed that the Crank-Nicolson scheme was accurate than explicit scheme. The semi-analytic method has only one source of error, the space discretization also it is able to solve for a vector of time simultaneously. But with sufficient small r all three methods were performed well.

Mediji Grāmatas     Paperback Book   (Grāmata ar mīksto vāku un līmēto muguru)
Izlaists 2012. gada 6. februāris
ISBN13 9783846582398
Izdevēji LAP LAMBERT Academic Publishing
Lapas 68
Izmēri 150 × 4 × 226 mm   ·   119 g
Valoda Vācu