Converting Mathematica list of values into boolean list

First of all, sorry for the confused title.

What I want to do is to convert `{1, 4, 9}` to:

``````{True, False, False, True, False, False, False, False, True}
``````

That is, only the indexes from the first list will have value `True`, the rest will be `False`.

I sense there is some really simple solution, but I am quite new to both Mathematica and functional programming. I could do it iteratively, in a loop, but there has to be something that works with the list as a whole. Right? :)

EDIT: to show that I tried to do something before I asked, here's my progress so far:

``````first={1,4,9}
ReplacePart[Table[False, {x, Max[first]}], {1} -> True]
(* gives {True, False, False, False, False, False, False, False, False} *)
``````

Unfortunately, it doesn't work with `{1,4,9} -> True`, but would work with `{1 -> True, 4 -> True, 9 -> True}`. But I don't know how to get to that...

EDIT 2: got it.

``````ReplacePart[Table[False, {x, Max[first]}], Table[x -> True, {x, first}]]
``````

I'd still love to see your solutions! This one seems like an ugly hack to me ... :)

Here's a simple approach:

``````first = {1, 4, 9};
list = ConstantArray[False, Max@first];
list[[first]] = True;

list
Out[1]= {True, False, False, True, False, False, False, False, True}
``````

Here's the above solution written as a convenient function:

``````Clear[convertIndices]
convertIndices[index_List] :=
Module[{list = ConstantArray[False, Max@index]},
list[[index]] = True; list]
``````

Usage:

``````convertIndices@{1, 4, 9}
Out[2]= {True, False, False, True, False, False, False, False, True}
``````
• `list[[first]] = True` never occured to me. That's the thing I've been looking for. :) Simple, beautiful. Thanks! – Martin Janiczek Nov 5 '11 at 21:58
• I've written it above as a convenient function so that all you need to do is pass a list to it. Please see my edit. – abcd Nov 5 '11 at 22:01
• +1, certain modes of thought are persistent, and I never would have considered `list[[first]]=True` as I don't think about setting individual elements of a `List`. – rcollyer Nov 8 '11 at 3:31
• And, of course, there goes any chance of me ever catching up. :P – rcollyer Nov 8 '11 at 3:32
• Now all I need to do is get rid of Mr.Wizard and I'll be at the top of the tag for this month :D – abcd Nov 8 '11 at 4:42

I would use `SparseArray` for this operation. In my opinion it is very easy to understand, and it is also efficient, especially when a low percentage of indices are True.

``````true = {1, 4, 9};
SparseArray[(List /@ true) -> True, Automatic, False]
``````

Alternatively with `Transpose` (which looks better when pasted into Mathematica):

``````SparseArray[{true}\[Transpose] -> True, Automatic, False]
``````

You can use `Normal` if you must convert the output to a normal array, but most operations will not require that.

Also, sacrificing practicality for terseness:

``````#==1 & /@ SparseArray[List /@ true -> 1]
``````

Actually, I would have used Yoda's answer myself, but here's an alternative:

``````first = {1, 4, 9};
MemberQ[first, #] & /@ Range[Max[first]]

(* ===> {True, False, False, True, False, False, False, False, True}*)
``````

Or this one:

``````Or @@@ Outer[Equal, Range[Max[first]], first]

(* ===> {True, False, False, True, False, False, False, False, True}*)
``````

Both have the advantage that they skip Yoda's `ConstantArray` initialization step.

• I wouldn't actually call it an advantage. Try `first = {1,4,10^6}`. On my machine, your solutions take ~2s and ~1.5s respectively, whereas mine takes only ~0.035s. – abcd Nov 5 '11 at 22:28
• @Yoda I wasn't referring to execution speed but to typing effort ;-) – Sjoerd C. de Vries Nov 5 '11 at 22:31