The partial differential equation to be solved is linear and homogeneous.
The boundary conditions are of the form
where
are
constants.
The solution obeys the initial condition
University Maths Notes: Calculus – Solving Partial Differential Equations Using the Separation of Variables Method
The separation of variables method is a technique for solving partial differential equations subject to boundary conditions and is used to solve problems where
The partial differential equation to be solved is linear and homogeneous.
The boundary conditions are of the formwhereare
constants.
The solution obeys the initial condition
I will illustrate the method with an example.
(1)
We look for solutions of the form
Substitution into the original differential equation gives
Divide
by
to
gives
The
left hand side is a function of t only and the right hand side is a
function of x only. Since x and t are independent variables, we must
have that both sides are constant. Suppose that both sides equal k.
We can write
and
or
(2)
If
the
solution to the first is
This
solution tends to infinity as
tends
to infinity so we must have
Put
then
the two equations (2) become
with
solutions
so
all solutions take the form
since
are
arbitrary. We now fit these solutions to the boundary conditions.
Since the original equation is linear, any linear combination of
these solutions is also a solution. We can write the most general
solution to (1) as
We now fit these solutions to the initial condition
In general fitting the most general solution
to
the initial condition will involve finding the coefficients of a
Fourier series.