Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

A light-weight question for the experts. I can't seem to figure the correct syntax to this replacement. I have this list

Clear[a, b, c, d]
polesList = {{3, {a, b}}, {5, {c, d}}};

It is of the form of a list with sublists each have the form {order,{x,y}} and I want to generate a new list of this form (x+y)^order

Currently this is what I do, which works:

((#[[2, 1]] + #[[2, 2]])^#[[1]]) & /@ polesList

(* ----->   {(a + b)^3, (c + d)^5}  *)  

But I have been trying to learn to use ReplaceAll as it is more clear to me than pure functions, since I can see the pattern better, like this:

Clear[a, b, c, d, n]
polesList = {{3, {a, b}}, {5, {c, d}}};
ReplaceAll[polesList, {n_, {x_, y_}} :> (x + y)^n]   (*I thought this will work*)

I get strange result, which is

{(5 + c)^3, {(5 + d)^a, (5 + d)^b}}

What is the correct syntax to do this replacement using ReplaceAll instead of the pure function method?

Thanks

Update:

I find that using Replace, instead of ReplaceAll works, but need to say {1} at the end:

Clear[a, b, c, d, n]
polesList = {{3, {a, b}}, {5, {c, d}}};
Replace[polesList, {n_, {x_, y_}} :> (x + y)^n, {1}]

which gives

{(a + b)^3, (c + d)^5}

But ReplaceAll does not take {1} at the end. I am more confused now which to use :)

share|improve this question
    
I think that ReplaceAll[expr,rules] is essentially equivalent to Replace[expr,rules,Infinity]. Replacing at all levels is a more common thing than just at a single level. That's why ReplaceAll has a infix form /. and Replace doesn't. –  Simon Aug 1 '11 at 2:44
2  
Apparently the order that Replace and ReplaceAll traverse the expression tree is different‌​. Replace starts at the lowest level while ReplaceAll starts at the highest. Compare Replace[h[f1[a1], f2[e][a2]], (a_ /; Print[a] :> 0), Infinity] with ReplaceAll[h[f1[a1], f2[e][a2]], (a_ /; Print[a] :> 0)]. –  Simon Aug 1 '11 at 2:52
    
This is why in your case (polesList = {{3, {a, b}}, {5, {c, d}}}): Replace[polesList, {n_, {x_, y_}} :> (x + y)^n, Infinity] works, but ReplaceAll[polesList, {n_, {x_, y_}} :> (x + y)^n] does not. –  Simon Aug 1 '11 at 2:54
4  
1  
@Simon Perhaps it was not long enough :) –  Leonid Shifrin Aug 1 '11 at 13:43

3 Answers 3

up vote 8 down vote accepted

The problem is that ReplaceAll inspects all levels of the expression when looking for replacements. The entire expression matches the pattern {n_, {x_, y_}} where:

n matches {3, {a, b}}

x matches 5

y matches {c, d}

So you end up with (5 + {c , d}) ^ {3, {a, b}} which evaluates to the result you see.

There are a few ways to fix this. First, you can change the pattern so that it does not match the outermost list. For example, if the n values are always integers you could use:

ReplaceAll[polesList, {n_Integer, {x_, y_}} :> (x + y)^n]

Or, you could use Replace instead of ReplaceAll, and restrict the pattern matching the first level only:

Replace[polesList, {n_, {x_, y_}} :> (x + y)^n, {1}]

I find that applying replacement rules to the first level of a list is very common. It so happens that Cases, by default, only operates on that level. So I find myself frequently using Cases for level one replacements when I know that all elements will match the pattern:

Cases[polesList, {n_, {x_, y_}} :> (x + y)^n]

This last expression is how I would probably write the desired replacement. Keep in mind, though, that if all elements do not match the pattern, then the Cases approach will drop the mismatches from the result.

share|improve this answer
1  
+1 for Cases with a :>. It's a good construct that I only started using in the last year. –  Simon Aug 1 '11 at 2:36
    
Thanks. may be I should think of using Replace instead of ReplaceAll and specify the level I want. It is more explicit this way. I forgot about Replace with levels, was just using ReplaceAll. –  Nasser Aug 1 '11 at 2:39
    
I find the Cases construct dangerous. I enjoy terse code, and I am aware of this method, however, I believe that code should be logical, and Cases is a filtering function; further, it silently fails (if you are expecting it to match all elements in a list) and that is reason enough for me to avoid using it in regular code. If Replace and ReplaceAll are unpalatable for whatever reason, I would use: f[{n_, {x_, y_}}] := (x + y)^n; f /@ polesList or similar. –  Mr.Wizard Aug 16 '11 at 1:32

The problem is that ReplaceAll looks at all levels in the expression and the first match to the pattern

{n_, {x_, y_}}

in the expression {{3, {a, b}}, {5, {c, d}}} is

{ n=={3, {a, b}}, {x==5, y=={c, d}}}

(if that notation is clear)

So you got the "strange" result

(5 + {c,d})^{3, {a, b}} == {5+c, 5+d}^{3, {a, b}} 
== {(5+c)^3, (5+d)^{a, b}} == {(5+c)^3, {(5+d)^a,(5+d)^b}}

The easiest fix, if n is always numeric, is

In[2]:= {{3, {a, b}}, {5, {c, d}}} /. {n_?NumericQ, {x_, y_}} :> (x + y)^n
Out[2]= {(a + b)^3, (c + d)^5}

Where I used the shorthand /. for ReplaceAll.


It might be that using Replace at level 1 is the best option

In[3]:= Replace[{{3, {a, b}}, {5, {c, d}}}, {n_,{x_,y_}}:>(x+y)^n, {1}]
Out[3]= {(a+b)^3,(c+d)^5}

which should be compared with the default replace that works at the top level {0}

In[4]:= Replace[{{3, {a, b}}, {5, {c, d}}}, {n_,{x_,y_}}:>(x+y)^n]
Out[4]= {(5+c)^3,{(5+d)^a,(5+d)^b}}
share|improve this answer
    
Plus@@@polesList[[All, 2]]^polesList[[All, 1]] == {(a + b)^3, (c + d)^5} –  Simon Aug 1 '11 at 2:26
    
+1, Just saw your answer, thanks. I see I can use Replace with {1} works, but wanted to see if I can use ReplaceAll. I guess I have to use your solution with NumericQ added to make ReplaceAll work. –  Nasser Aug 1 '11 at 2:29
    
+1, with some minor quibbles... the default level spec for Replace is {0}, the entire expression. A level spec of 2 tries replacements on both level 1 and level 2, whereas {1} operates only upon level 1 which is what is wanted here –  WReach Aug 1 '11 at 2:34
    
@WReach: Yeah - I fixed that just before you posted your comment! –  Simon Aug 1 '11 at 2:37

You could also use ReplaceAll[ ] with Map:

Map[ReplaceAll[#, {n_, {x_, y_}} :> (x + y)^n] &, polesList]

or (using shorthands increasingly)

ReplaceAll[#, {n_, {x_, y_}} :> (x + y)^n] & /@ polesList

or

# /. {n_, {x_, y_}} :> (x + y)^n & /@ polesList
share|improve this answer

Your Answer

 
discard

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.