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I'm trying to drop some elements of a list of data in Mathematica, but I don't understand how Select and Union work. For example, suppose I have the following list

list = {{0.10,0.20},{1.10,0.20},{0.70,0.80},{0.20,1.10},

and only want elements in (0,1)x(0,1) considering that points within a distance radius of 0.05 are duplicates. In the example,

list1 ={{0.10,0.20},{0.70,0.80}}  

I don't care wich element represents the equivalence class. Im doing the following:

list1 = Select[list, 0 < Part[#,1] <1 &];Select[list,0 < Part[#,2] <1 &]

wich gives the points in (0,1)x(0,1), but if I try to use Union, such as

Union[list1, SameTest -> (Abs[#1-#2] < 0.05 &)]

I get slot errors.

Can someone explain to me how to do it neatly?



DeleteDuplicates[list1, Abs[Part[#1, 1] - Part[#2, 1]] < 10^-6 &]

does the trick, but I wonder why I cant work with a list of lists.

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1 Answer 1

up vote 4 down vote accepted

There are several ways of approaching this. One way to do it, that I think is the neatest, since you require your elements to be in certain intervals, is to use IntervalMemberQ with Select.

For example, to narrow down your list to those points in (0,1)x(0,1):

list01 = Select[list, And @@ IntervalMemberQ[Interval[{0, 1}], #] &]

Out[1]= {{0.1, 0.2}, {0.7, 0.8}, {0.12, 0.18}, {0.68, 0.76}}

Secondly, to eliminate duplicates, use DeleteDuplicates, which is the perfect tool for this task. You can use the same test using IntervalMemberQ:

 And @@ IntervalMemberQ[Interval[{0, 0.5}], Abs[#1 - #2]] &]

Out[2]= {{0.1, 0.2}, {0.7, 0.8}}
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Thank you very much. This solves the problem. What I don't understand is why in this case there are no slot errors, wich is the reason I use Part. –  Pragabhava Nov 7 '11 at 4:40
@Manuel DeleteDuplicates checks all pairs of elements, each "element" here being a sublist of list01. The slot #1 refers to the first of the pair and #2 refers to the second. –  r.m. Nov 7 '11 at 4:50
I like it. But sometimes is deceiving. Try for example list01 = Union[Tuples[{1, 0}, 2], {{1/2, 1/2}}]. It returns {0,0}, but {1,1} is outside its equivalence range. –  belisarius Nov 7 '11 at 5:22
@belisarius I see what you're saying, but from my understanding of the problem, {1,1} should be in the result. If you have {{0,0},{1/2,1/2},{1,1}}, according to the OP, either {{0,0},{1,1}} or {{1/2,1/2}} are acceptable answers. Or am I reading it wrong? –  r.m. Nov 7 '11 at 17:28
Both {{0,0},{1,1}} and {{1/2,1/2}} are acceptable, as I don't care for the equivalence class representative, because the interval of equivalence I'm using is very small, but in an abstract situation this problem should be addressed. –  Pragabhava Nov 7 '11 at 20:26

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