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I have a list of pairs of values in mathematica, for example List= {{3,1},{5,4}}.

How do I change the first element (3 & 5) if the second element does not reach a threshold. For example, if the second parts are below 2 then i wish the first parts to go to zero. so that list then = {{0,1},{5,4}}. Some of these lists are extremely long so manually doing it is not an option, unfortunately.

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up vote 9 down vote accepted

Conceptually, the general way is to use Map. In your case, the code would be

In[13]:= lst = {{3, 1}, {5, 4}}

Out[13]= {{3, 1}, {5, 4}}

In[14]:= thr = 2

Out[14]= 2

In[15]:= Map[{If[#[[2]] < thr, 0, #[[1]]], #[[2]]} &, lst]

Out[15]= {{0, 1}, {5, 4}}

The # symbol here stands for the function argument. You can read more on pure functions here. Double square brackets stand for the Part extraction. You can make it a bit more concise by using Apply on level 1, which is abbreviated by @@@:

In[27]:= {If[#2 < thr, 0, #], #2} & @@@ lst

Out[27]= {{0, 1}, {5, 4}}

Note however that the first method is several times faster for large numerical lists. An even faster, but somewhat more obscure method is this:

In[29]:= Transpose[{#[[All, 1]]*UnitStep[#[[All, 2]] - thr], #[[All, 2]]}] &[lst]

Out[29]= {{0, 1}, {5, 4}}

It is faster because it uses very optimized vectorized operations which apply to all sub-lists at once. Finally, if you want the ultimate performance, this procedural compiled to C version will be another factor of 2 faster:

fn = Compile[{{lst, _Integer, 2}, {threshold, _Real}},
  Module[{copy = lst, i = 1},
    For[i = 1, i <= Length[lst], i++,
      If[copy[[i, 2]] < threshold, copy[[i, 1]] = 0]];
    copy], CompilationTarget -> "C", RuntimeOptions -> "Speed"] 

You use it as

In[32]:= fn[lst, 2] 

Out[32]= {{0, 1}, {5, 4}}

For this last one, you need a C compiler installed on your machine.

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Perfect, Thank you!! Using Map works great.. very very much appreciated... a lot of time saved.. – Mary Mar 27 '11 at 12:50
@Mary Well, great! B.t.w., welcome to Stack Overflow. – Leonid Shifrin Mar 27 '11 at 12:52
@Leonid. Thank you. Currently wishing i'd stumbled across it a while ago! – Mary Mar 27 '11 at 13:01
@Leonid I have learned that it is advantageous to read your replies very carefully :-) Purely for my own information, is there any advantage in {If[#[[2]] < 2, 0, #[[1]]], #[[2]]} & /@ lst (your method) over If[#[[2]] < 2, {0, #[[2]]}, #] & /@ lst ? – TomD Mar 27 '11 at 15:12
@TomD I think the code you suggest is better than mine. It is more direct and it is also about 20 % faster.What IMO is important is to use Compile-able functions in Map if you want speed. Map attempts to auto - compile the function to be mapped, if the length of the list exceeds the setting SystemOptions["CompileOptions" -> "MapCompileLength"], which defaults to 100. Both our functions can be Compiled, and so are fast. But if you define the same function with patterns and try using it in Map, you immediately have an order of magnitude slowdown on packed lists. Can be a surprise :) – Leonid Shifrin Mar 27 '11 at 16:00

Another alternative: Apply (@@@, Apply at level 1) and Boole (turns logical values in 1's and 0's):

lst = {{3, 1}, {5, 4}};
{#1 Boole[#2 >= 2], #2} & @@@ lst
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+1 for elegance. One problem (of which I became aware relatively recently) with level-1 Apply-based solutions when used with pure functions and packed arrays is that Apply can not utilize auto-compilation (which I mentioned in a comment below my answer). This results in an order of magnitude slowdown w.r.t. the method based on Map for really large packed lists, and may look puzzling at first. Of course, all this is only relevant if efficiency is important. – Leonid Shifrin Mar 27 '11 at 16:15
@Leonid I didn't know that. Any idea why only Map autocompiles and not Apply? – Sjoerd C. de Vries Mar 27 '11 at 20:21
Forget it. I see it's far down in the comments. – Sjoerd C. de Vries Mar 27 '11 at 20:22

An alternative approach might be to use substitution rules, and attach a condition (/;)

lst = {{3, 1}, {5, 4}};

lst /. {x_, y_ /; y < 2} -> {0, y}


{{0, 1}, {5, 4}}

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It would be better to use RuleDelayed :> in this application. – Mr.Wizard Mar 27 '11 at 17:50
@Mr.Wizard. Thanks for pointing that out. Can you provide a brief explanation? – TomD Mar 28 '11 at 14:51
Sure: try setting y = $Failed; before running your code above. Most any time that you use named patterns like y_ in a replacement, you want :> to keep the symbols local. Also, you do not need to name x_, as a simple _ will do. Naming is only necessary to define a pattern as the same as another, such as {x_, _, x_} to match {1, 6, 1} but not {1, 2, 3}, or of course when referencing it by name. – Mr.Wizard Mar 28 '11 at 15:26

Assuming that your matrix is 2x2 and by second elemnt you mean the second row: This should work:

If[A[[2, 1]] < 2 || A[[2, 2]] < 2, A[[2,1]] = 0 ]; A

You may have to change the variables, since your questions is kind of confusing. But that's the idea ;-)

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thanks for this. Also works great. Appreciate all your time, guys. thanks! – Mary Mar 27 '11 at 13:03
No problem, but you should definitely go with Leonid's answer, it's by far the fastest when your dealing with big matrices! (my solution was just a dirty-and-quick approach). – PingLu Mar 27 '11 at 15:45

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