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Running into a problem with the following example code for which I hope there is a way around.

Say I have defined a function:

f[x_,y_,z_] = x + y + z + x Log[x] + y Log[y] +z Log[z]

and I was to assign

f[x_,y_,z_] = x + y + z + x Log[x] + y Log[y] +z Log[z]//.x->1//.y->1//.z->0

But rather than have Mathematica replace z with 0 I just want z to be ignored to give the result f[x_,y_] = 2 without having to define a new function. Entering the above code into Mathematica results in an obvious Indeterminate solution

Helping this novice out is greatly appreciated.

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@ZB Allow me to welcome you to StackOverflow and remind three things we usually do here: 1) As you receive help, try to give it too answering questions in your area of expertise 2) Read the FAQs 3) When you see good Q&A, vote them up by using the gray triangles, as the credibility of the system is based on the reputation that users gain by sharing their knowledge. Also remember to accept the answer that better solves your problem, if any, by pressing the checkmark sign –  belisarius Sep 13 '11 at 0:22
    
how about a simple If statement in the function to check on the argument in question, like we used to do in the good old days :), based on the result of the IF statement you do one thing vs. the other. It also makes the logic more clear and more portable. Any way, that is how I would do it. –  Nasser Sep 13 '11 at 0:26
    
@Nasser If you don't define the third argument as optional, the 3 args function will not run with 2 args –  belisarius Sep 13 '11 at 1:23
    
@Belisarius, may be I was not clear. I meant, leave it as original 3 argument function, and inside that function, add a logic to check for the offending value(s) to avoid. i.e. If z==0, do not do the log(). If there is 1/z, do not do that computation, and so on. All the logic is now in one place, instead of spread among few functions, each designed to handle one special case. –  Nasser Sep 13 '11 at 1:28
1  
@ZB18749 Note that in this case ReplaceRepeated (//.) doesn't seem to make more sense than ReplaceAll (/.). Also, you might want to gather all replacement rules together in one replacement /. {x->1,y->1,z->0 which usually yields the same result and is shorter. There are exceptions, where order is important like in x Log[y] /. {x -> 0, y -> 0} which yields an error whereas x Log[y] /. {x -> 0} /. {y -> 0} yields 0. –  Sjoerd C. de Vries Sep 13 '11 at 10:59

2 Answers 2

up vote 4 down vote accepted

Assuming that you want the treatment you describe for z to apply to x and y as well, you could do this:

f[x_, y_, z_] := g[x] + g[y] + g[z]

g[0] = 0;
g[x_] := x + x Log[x]

The helper function g handles the zero case explicitly. These definitions yield results like these:

f[1, E, E^2]
(* 1 + 2*E + 3*E^2 *)

f[1, 1, 1]
(* 3 *)

f[1, 1, 0]
(* 2 *)

f[0, 0, E]
(* 2*E *)
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Nice! (10 more chars to go) –  belisarius Sep 13 '11 at 4:37

First, function application occurs by calling the function:

f[1,1,1]

Second, why not introduce a new function using limit?

f[x_,y_,z_] := x + y + z + x*Log[x] + y*Log[y] +z*Log[z]
g[x_,y_]:=Limit[f[x,y,z],z->0]
g[1,1]

That should give you the 2, though I'm not in front of mathematica now so i havent checked

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You don't need a new name for the fuction. f[x_, y_] := Limit[f[x, y, z], z -> 0] will also work when used as f[1,1]. Mathematica pattern matching engine will take control to use the correct definition –  belisarius Sep 13 '11 at 0:17

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