9

Experts;

Given

f = (#1^#2) &

Is there a way to define 'f' above such that if #1 and #2 are both zero, then the value of the pure function 'f' should be 1 ?

so that when I write

f[0,0]

it will return 1 and not Indeterminate?

btw, I know I can write

f = (If[#1 == 0 && #2 == 0, 1, #1^#2]) &

But I wanted a general rule or pattern, so I do not have to write these checks, as the pure function can be more complicated (many # in it ) and I do not want to do many of these 'if then else' checks for each possible 0^0 that might show up.

thanks

Update:

May be I should clarify more why I am doing this.
I have a user selects a function from a menu. The function is

a x^n0 + b y^n1 + c x^n2 y^n3

Where in the above, the parameters 'n0', 'n1', 'n2' and 'n3' also can be selected from sliders, and these can be zero.

Now, 'x' and 'y' are coordinates, and these can be zero also.

Therefore, it is possible that 0^0 can be encountered when evaluating the above function.

There are many cases to check for, when doing it myself. For example 'y^n3' can be 0^0 and not the other, y^n1 can be 0^0 and not the other, x^n2 y^n3 can be both 0^0 and not the others, etc.., and so I have to define many different cases. (16 possible cases I think).

And I am trying to avoid this. If I can tell Mathematica to replace 0^0 by 1 at a lower level, then life will be simpler.

Update 12/7/11 Thanks for everyone's answers and comments, all are very useful and solve my problem and I learned from them.

I selected Leonid answer as it allowed me to solve my problem with least amount of additional coding.

Here is an small example

Manipulate[Row[{format[x, n], "=", eval[x, n]}],
 {{x, 0.0, "x="}, 0, 1, .1, Appearance -> "Labeled"},
 {{n, 0.0, "n="}, 0, 1, .1, Appearance -> "Labeled"},
 Initialization :>
  (
   format[x_, n_] := HoldForm["(" x ")"^n];
   eval = Unevaluated[#1^#2] /. HoldPattern[0.0^0.0] :> 0.0 &
   )
 ]

I use real numbers everywhere in my code (it is a numerical pde solver), so that is why I used 0.0 in the above and not 0^0 to fit with what I am doing.

enter image description here

  • 2
    Are you sure you want these to eval to 1 and not 0? The notation makes it look as though you are evaluating polynomials where the exponents are nonnegative ints or perhaps reals. Continuity considerations would indicate that a value of 0 might be preferable in that scenario. – Daniel Lichtblau Dec 6 '11 at 18:03
  • @DanielLichtblau, Ok, thanks, will look into 0^0 be replaced by 0 instead of 1. But either case, if I use IF THEN ELSE (or its functional equivalent by defining many different signatures for each possible case), there are still 16 different cases. Was hoping there is a way to short circuit this, but telling Mathematica to replace 0^0 by X where X is the correct choice (0 or 1 as it might be). – Nasser Dec 6 '11 at 18:18
  • See also this mathgroup discussion: mathforum.org/kb/message.jspa?messageID=6577581&tstart=0 and this question on the programmers SE: programmers.stackexchange.com/questions/9788/… – Sjoerd C. de Vries Dec 6 '11 at 22:58
10

I agree with the answer of @Deep Yellow, but if you insist on a pure function, here is one way:

f = Unevaluated[#1^#2] /. HoldPattern[0^0] :> 1 &

EDIT

Staying within the realm of pure functions, the situation you described in your edit can be addressed in the same way as my solution to your specific original example. You can automate this with a tiny bit of metaprogramming, defining the following function transformer:

z2zProtect[Function[body_]] := 
   Function[Unevaluated[body] /. HoldPattern[0^0] :> 1]

Then, my previous code can be rewritten as:

 f = z2zProtect[#1^#2 &]

But you can is this more generally, for example:

ff = z2zProtect[#1^#2 + 2 #2^#3 + 3 #3^#4 &]

In[26]:= ff[0,0,0,0]
Out[26]= 6
  • +1 Nice, although let me point out that f[foo, 0] returns 1 for undefined foo. – Codie CodeMonkey Dec 6 '11 at 17:26
  • @Deep Yellow Thanks for the upvote. Regarding your comment - this is as expected, and is based on a built-in rule for Power, not on my particular definition. Your solution exhibits the same behavior. – Leonid Shifrin Dec 6 '11 at 17:32
  • Oh yeah :-) Mathematica assumes undefined expressions aren't equal to zero for Power. – Codie CodeMonkey Dec 6 '11 at 17:36
  • @LeonidShifrin, thanks, will try your Protect meta solution in my program, as it seems it will work, Will update with what I find later today. – Nasser Dec 6 '11 at 18:22
16

Of course there are many ways to do things in Mathematica, but a design idiom I often use is to write the "function" (actually, a pattern) with decreasing specificity. Mathematica has the property that it will apply more specific patterns before less specific.

So, for your case I'd just write:

Clear[f];
f[0, 0] = 1;
f[a_, b_] := a^b;

I assume you expect to work with integer values since that's the usual context for this type of situation, e.g. when evaluating Bernstein basis functions.

  • +1 Good, clear answer with no frills. BTW,I think you meant to say "with decreasing specificity". – DavidC Dec 7 '11 at 2:37
  • @DavidCarraher: Thanks, corrected. – Codie CodeMonkey Dec 7 '11 at 7:21
4

You may try writing it like f = Quiet[Check[#1^#2,1]] &.

Quiet will suppress the "Power::indet: "Indeterminate expression 0^0 encountered." message and Check will replace the result with 1 if it is indeterminate.

It is probably better to use some function like s = Quiet[Check[#1, 1]] and wrap your expressions in it.

  • 5
    Note that this will also suppress everything that produces the same error and output 1, irrespective of whether that's the desired outcome. For example, f[0,I]. – abcd Dec 6 '11 at 19:21
3

I'm slightly surprised the trivial (albeit slightly dangerous) fix did not get mentioned earlier. If you really don't expect the expression 0^0 to come up in any context where you'd (a) be worried that it did, or (b) would like it to evaluate it to something other than 1, you can simply try

Unprotect[Power];
Power[0, 0] = 1;
Protect[Power];
0^0

I needed this fix in a situation where a complicated function had a number of calls to expressions of the form x^n where x is real and n is an integer, in which case 0^0 should be seen as the limit of x^0=1 as x goes to 0.

It's important to note, though, that doing this will 'contaminate' Power for the current kernel session, and may therefore break other notebooks which run concurrently and for which conditions (a) and (b) may not hold. Since Power is located in the System՝ context instead of Global՝, it may be difficult to separate the contexts of different notebooks to avoid clashes produced by this fix.

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