PDES: GENERAL AND PARTICULAR SOLUTIONS
in whichκis a constant with the dimensions length^2 ×time−^1. The physical
constants that go to make upκin a particular case depend upon the nature of
the process (e.g. solute diffusion, heat flow, etc.) and the material being described.
With (20.34) we cannot hope to repeat successfully the method of subsection20.3.3, since nowu(x, t) is differentiated a different number of times on the two
sides of the equation; any attempted solution in the formu(x, t)=f(p) with
p=ax+btwill lead only to an equation in which the form offcannot be
cancelled out. Clearly we must try other methods.
Solutions may be obtained by using the standard method of separation ofvariables discussed in the next chapter. Alternatively, a simple solution is also
given if both sides of (20.34), as it stands, are separately set equal to a constant
α(say), so that
∂^2 u
∂x^2=α
κ,∂u
∂t=α.These equations have the general solutions
u(x, t)=α
2 κx^2 +xg(t)+h(t)andu(x, t)=αt+m(x)respectively and may be made compatible with each other ifg(t) is taken as
constant,g(t)=g(wheregcould be zero),h(t)=αtandm(x)=(α/ 2 κ)x^2 +gx.
An acceptable solution is thus
u(x, t)=α
2 κx^2 +gx+αt+ constant. (20.35)Let us now return to seeking solutions of equations by combining the inde-pendent variables in particular ways. Having seen that a linear combination of
xandtwill be of no value, we must search for other possible combinations. It
has been noted already thatκhas the dimensions length^2 ×time−^1 and so the
combination of variables
η=x^2
κtwill be dimensionless. Let us see if we can satisfy (20.34) with a solution of the
formu(x, t)=f(η). Evaluating the necessary derivatives we have
∂u
∂x=df(η)
dη∂η
∂x=2 x
κtdf(η)
dη,∂^2 u
∂x^2=2
κtdf(η)
dη+(
2 x
κt) 2
d^2 f(η)
dη^2,∂u
∂t=−x^2
κt^2df(η)
dη.Substituting these expressions into (20.34) we find that the new equation can be