Boundary Value Problems/Introduction to BVPs: Difference between revisions

Introduce Boundary value problems for a single independent variable.

• What is a Boundary Value problem?

• Solution of a Boundary Value Problem is directly related to solution of an Initial Value Problem. So let's review the material on IVPs first and then make the connection to BVPs.

• Details of solving a two point BVP.

For a single independent variable ${\displaystyle x}$ in an interval ${\displaystyle I:a<x<b}$, an initial value problem consists of an ordinary differential equation including one or more derivatives of the dependent variable, ${\displaystyle y}$,

${\displaystyle y^{(n)}+p_{n-1}(x)y^{(n-1)}+...+p_1(x)y^{\prime }(x)+p_{0}y(x)=f(x)}$

and ${\displaystyle n}$ additional equations specifying conditions on the solution and the derivatives at a point ${\displaystyle x_0\in I}$

${\displaystyle y^{(n-1)}(x_0)=b_{n-1}}$, ..., ${\displaystyle y^{\prime }(x_0)=b_1}$, ${\displaystyle y(x_0)=b_0}$

Example:

The differential equation is ${\displaystyle y^{\prime }=x}$ (First order differential equation.) and the initial condition at ${\displaystyle x=0}$ is given as ${\displaystyle y(0)=1}$ .

Solution:

${\displaystyle \int y^{\prime }dx=\int xdx}$

${\displaystyle y=\frac{x^2}{2}+C}$.

When,${\displaystyle x=0}$ ${\displaystyle 1=C}$ and ${\displaystyle y=\frac{x^2}{2}+1}$

Get out a piece of paper and try to solve the following IVP in a manner similar to the preceding example:

${\displaystyle y^{\prime }=xy}$ and the initial condition at ${\displaystyle x=0}$ is given as ${\displaystyle y(0)=3}$ .

Once you have an answer (or are stuck) check your solution here. Click here for the solution: /IVP-student-1/

A second order ODE example:

The differential equation is ${\displaystyle y^{″}+5y^{\prime }+4y=0}$ (Second order differential equation.) and the two initial conditions at ${\displaystyle x=0}$ given as ${\displaystyle y(0)=1,y^{\prime }(0)=-2}$ .

Solution:

Assume the solution has the form ${\displaystyle y=e^{rx}}$

${\displaystyle y^{\prime }=r{e}^{rx},y^{″}=r^2{e}^{rx}}$

${\displaystyle y^{″}+5y^{\prime }+4y=r^2{e}^{rx}+5r{e}^{rx}+4e^{rx}}$

${\displaystyle 0=r^2{e}^{rx}+5r{e}^{rx}+4e^{rx}}$

${\displaystyle 0=r^2+5r+4}$ The characteristic polynomial. Solve for "r".

${\displaystyle \begin{array}{c}{r}_1=4\\ r_2=1\end{array}}$

See the Wikipedia link for more on Initial Value Problems

Begin with second order DEs, ${\displaystyle x^{″}=f(t,x,x^{\prime })}$, with conditions on the solution at ${\displaystyle t=a}$ and ${\displaystyle t=b}$.

${\displaystyle \frac{d^{2}x}{d{t}^2}+p(t)\frac{dx}{dt}+q(t)x(t)=f(t)}$ with ${\displaystyle a_{0}x(a)+a_1{x}^{\prime }(a)=g}$ and ${\displaystyle b_{0}x(b)+b_1{x}^{\prime }(b)=h}$ on the interval ${\displaystyle I_{ab}=\{x|a\le t\le b\}}$

Hello

${\displaystyle \frac{d^{2}x}{d{t}^2}+4\frac{dx}{dt}+2x(t)=f(t)}$ with ${\displaystyle x(0)=0}$ and ${\displaystyle x(1)=0}$ on the interval ${\displaystyle I_{ab}=\{x|0\le t\le 1\}}$

See the wikipedia topic

Boundary Value Problems

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