Partial Differential Equations Introduction –Adam Zornes, Deng Li Discretization Methods –Chunfang Chen, Danny Thorne, Adam Zornes.

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Presentation transcript:

Partial Differential Equations Introduction –Adam Zornes, Deng Li Discretization Methods –Chunfang Chen, Danny Thorne, Adam Zornes

What do You Stand For? A PDE is a Partial Differential Equation This is an equation with derivatives of at least two variables in it. In general, partial differential equations are much more difficult to solve analytically than are ordinary differential equations

What Does a PDE Look Like Let u be a function of x and y. There are several ways to write a PDE, e.g., –u x + u y = 0 –  u/  x +  u/  y = 0

The Baskin Robin’s esq Characterization of PDE’s The order is determined by the maximum number of derivatives of any term. Linear/Nonlinear –A nonlinear PDE has the solution times a partial derivative or a partial derivative raised to some power in it Elliptic/Parabolic/Hyperbolic

Six One Way Say we have the following: Au xx + 2Bu xy + Cu yy + Du x + Eu y + F = 0. Look at B 2 - AC – < 0 elliptic – = 0 parabolic – > 0 hyperbolic

Or Half a Dozen Another A general linear PDE of order 2: Assume symmetry in coefficients so that A = [aij] is symmetric. Eig(A) are real. Let P and Z denote the number of positive and zero eigenvalues of A. –Elliptic: Z = 0 and P = n or Z = 0 and P = 0.. –Parabolic: Z > 0 (det(A) = 0). –Hyperbolic: Z=0 and P = 1 or Z = 0 and P = n-1. –Ultra hyperbolic: Z = 0 and 1 < P < n-1.

Elliptic, Not Just For Exercise Anymore Elliptic partial differential equations have applications in almost all areas of mathematics, from harmonic analysis to geometry to Lie theory, as well as numerous applications in physics. The basic example of an elliptic partial differential equation is Laplace’s Equation –u xx - u yy = 0

The Others The heat equation is the basic Hyperbolic –u t - u xx - u yy = 0 The wave equations are the basic Parabolic –u t - u x - u y = 0 –u tt - u xx - u yy = 0 Theoretically, all problems can be mapped to one of these

What Happens Where You Can’t Tell What Will Happen Types of boundary conditions –Dirichlet: specify the value of the function on a surface –Neumann: specify the normal derivative of the function on a surface –Robin: a linear combination of both Initial Conditions

Is It Worth the Effort? Basically, is it well-posed? –A solution to the problem exists. –The solution is unique. –The solution depends continuously on the problem data. In practice, this usually involves correctly specifying the boundary conditions

Why Should You Stay Awake for the Remainder of the Talk? Enormous application to computational science, reaching into almost every nook and cranny of the field including, but not limited to: physics, chemistry, etc.

Example Laplace’s equation involves a steady state in systems of electric or magnetic fields in a vacuum or the steady flow of incompressible non-viscous fluids Poisson’s equation is a variation of Laplace when an outside force is applied to the system

Poisson Equation in 2D

Example: CFD

Coupled Eigenvalue Problem Structure/Acoustic Coupled system

3D Coupled Problem Ω 0 : a three-dimensional acoustic region, S 0 : a plate region, Γ 0 =∂Ω 0 \ S 0 : a part of the boundary of the acoustic field, ∂S 0 : the boundary of the plate, P 0 : the acoustic pressure in Ω 0, U 0 : the vertical plate displacement, c : the sound velocity, ρ 0 : the air mass density, D : the flexural rigidity of plate, ρ 1 : the plate mass density, n : the outward normal vector on ∂Ω from Ω 0, and σ : the outward normal vector on ∂S 0 from S 0.

2D Coupled Problem

2D Un-coupled Problem Acoustic Problem

2D Un-coupled Problem Structure Problem,.

Homework Make the procese how to get the eigenvalue of structure problem (on previous page).