# I'm trying to solve a very simple heat conduction differential equation with NDSolve in Mathematica, but the solution I get is quite strange…

## This problem has been solved here, I should admit that I haven't catch the nature yet at the time I posted this question…

This is a very simple one-dimensional solid-phase heat conduction differential equation, here is my code:

 a = NDSolve[{D[721.7013888888889 0.009129691127380562 tes[t, x],
t] == 2.04988920646734*^-6 D[tes[t, x], x, x],
tes[t, 0] == 298 + 200 t, tes[t, 0.01] == 298,
tes[0, x] == 298}, {tes[t, x]}, {t, 0, 0.005}, {x, 0, 0.01}]
Plot3D[tes[t, x] /. a, {t, 0, 0.005}, {x, 0, 0.01}, PlotRange -> All]
(Plot[(tes[t, x] /. a) /. t -> 0.0005, {x, 0, 0.01},
PlotRange -> All])


After you run it, you will see: the temperature (in the equation it's named as tes) is lower than 298! It's ridiculous, it's against the second law of thermodynamics…how does this error come out? How can I correct it?

-

I'll deal only with the numerical aspects of this. First, scale time and space so that your equation becomes $\partial_t f=\partial_{x,x}f$ in the dimensionless units. then, for instance,

a = NDSolve[{D[ tes[t, x], t] == D[tes[t, x], x, x],
tes[t, 0] \[Equal] 1,
tes[t, 1] \[Equal] 1,
tes[0, x] \[Equal] Cos[2 \[Pi]*x/2]^2},
tes[t, x],
{t, 0, 1},
{x, 0, 1}
]

Plot3D[tes[t, x] /. a, {t, 0, .2}, {x, 0, 1}, PlotRange -> All,
AxesLabel \[Rule] {"t", "x"}]


so heat just diffuses inwards (note I changed the boundary and initial conditions).

-
Er...do you mean what I should do is to turn to (maybe here I should say create? ) a new system of units to make the coefficient of the PDE simpler? It seems useless...: a = NDSolve[{D[tes[t, x], t] == D[tes[t, x], x, x], tes[t, 0] == 298 + 200/6.588910766757118 t, tes[t, 0.01/Sqrt[2.04988920646734*^-6 ]] == 298, tes[0, x] == 298}, {tes[t, x]}, {t, 0, 0.005/6.588910766757118}, {x, 0, 0.01/Sqrt[2.04988920646734*^-6 ]}] Plot[(tes[t, x] /. a) /. t -> 0.0005/ 6.588910766757118, {x, 0, 0.01/Sqrt[2.04988920646734*^-6 ]}, PlotRange -> All] –  xzczd Jul 29 '12 at 7:04
you probably should read about putting things in terms of dimensionless variables before doing numerics. –  acl Jul 29 '12 at 12:06
Well…I'm sorry, my English isn't that good, maybe I just misunderstand you, but…I'm afraid I don't understand what you mean, in fact the numbers in the original equation (such as 2.04988920646734*^-6）are all in terms of SI units, so…what's the meaning of putting the numbers in terms of dimensionless numbers? –  xzczd Jul 29 '12 at 14:09
I wasn't being ironic, you really should read up about putting things in terms of dimensionless variables before doing numerics. This isn't the best place for me to explain that... –  acl Jul 29 '12 at 15:18
Hehe…so…where's the "best place"? We can go there if you don't mind! –  xzczd Jul 30 '12 at 9:41
show 1 more comment