Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them; it only takes a minute:

The expressions I am working with are much too complicated to fully enter here, but I've included a simple examples that highlights the problem I am running into. I am hoping there is someone out there with enough programming fortitude to help me around this issue. Let me preface this by saying I have little to no background in programming in general, but I know the basics of Mathematica. Any and all help is greatly appreciated. Suppose I have set up the following functions:

X[x_] := x Log[x]
X[0] := 0
Y[y_] := y Log[y]
Y[0] := 0
Z[z_] := z Log[z]
A[x_, y_, z_] := X[x] + Y[y] + Z[z]

In[7]:= A[x, y, z]

Out[7]= x Log[x] + y Log[y] + z Log[z]

In[8]:= B[x_, y_, z_] := 
 Evaluate[A[x, y, z] - x*D[A[x, y, z], x] - y*D[A[x, y, z], y] - 
   z*D[A[x, y, z], z]]

In[9]:= B[x, y, z]

Out[9]= x Log[x] - x (1 + Log[x]) + y Log[y] - y (1 + Log[y]) + 
 z Log[z] - z (1 + Log[z])

I have set up A[x,y,z] with the rules for X[x], Y[y], and Z[z] so that it can handle the case where x,y,z == 0, i.e. when x == 0 I want all expressions in A[x,y,z] with x to go to zero or be neglected including Log[x]. I've defined a function B[x,y,z] that involves the partial derivatives of A[x,y,z]. Now, I want the result so that B[0,y,z] yields


that is to basically go back and make A[x,y,z]:= Y[y]+Z[z] but instead I am currently running into the following, understandable, error:

Infinity::indet: Indeterminate expression 0 (-[Infinity]) encountered. >>

There must be some way around this with Mathematica and I am wondering if it will involve the Hold function or something related. Thank you all for the help.

share|improve this question

1 Answer 1

up vote 6 down vote accepted

One way is to use dummy variables in the derivatives, and replace afterward with the actual values.

Clear[X, Y, Z];
X[x_] := x Log[x]
X[0]   = 0;
Y[y_] := y Log[y]
Y[0]   = 0;
Z[z_] := z Log[z]
Z[0]   = 0;

A[x_, y_, z_] := X[x] + Y[y] + Z[z]    
B[x_, y_, z_] := 
 Module[{xx, yy, zz}, 
  A[x, y, z] - x*D[A[xx, y, z], xx] - y*D[A[x, yy, z], yy] - 
    z*D[A[x, y, zz], zz] /. {xx -> x, yy -> y, zz -> z}]

B[0, y, z]

(* Output: y Log[y] - y (1 + Log[y]) + z Log[z] - z (1 + Log[z]) *)

This works because each derivative has a factor of 0. A more general solution might involve defining UpValues on X, Y, Z for handling derivatives at the origin (I don't have time to check this at the moment).

share|improve this answer
That was a simple fix, thank you! – CaptanFunkyFresh Jan 7 '12 at 21:31

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.