APM346-2016F > TT1

TT1-P1

(1/1)

Victor Ivrii:
Consider the first order equation:
\begin{equation}
u_t +  xt u_x = - u.
\label{eq-1-1} 
\end{equation}
(a) Find the characteristic curves and sketch them in the $(x,t)$ plane.

(b) Write the general solution.

(c) Solve  equation (\ref{eq-1-1})  with the initial condition $u(x,0)= (x^2+1)^{-1}$.
Explain why the solution is fully  determined by the initial condition.

Roro Sihui Yap:
a) Characteristic Equation

\begin{equation}  \frac{dt}{1} = \frac{dx}{xt} = \frac{du}{-u} \end{equation}
From $ \frac{dt}{1} = \frac{dx}{xt} $, $\frac{t^2}{2} + \ln c = \ln x$, thus $ x = ce^\frac{t^2}{2}$

b) General Solution
From $ \frac{dt}{1} = \frac{du}{-u}$, $-t + \ln k = \ln u$ 
So $u = ke^{-t} = \phi(xe^{\frac{-t^2}{2}})e^{-t} $

c) Since $u|_{t=0} = \frac{1}{1+x^2}$,
$\phi(x) =  \frac{1}{1+x^2} $ 
Therefore, \begin{equation} u(x,t) = \frac{1}{1+x^2e^{-t^2}}e^{-t}\end{equation}
 

 

XinYu Zheng:
Just to add onto Roro Sihui Yap's solution for (c), the solution is fully determined by condition at $t=0$ because all characteristics intersect the $x$ axis and do not intersect with each other.

Victor Ivrii:
 :D

Navigation

[0] Message Index