Here's an approach that relies on Transpose
:
maxBy = #1[[Position[t = Transpose[#1][[#2]], Max[t]][[All, 1]]]] &;
For example:
list = {{4, 3}, {5, 10}, {20, 1}, {3, 7}};
maxBy[list, 1]
(* {{20, 1}} *)
maxBy[list, 2]
(* {{5, 10}} *)
It can handle more than two elements per sublist, provided that the sublists are all the same length.
r:=RandomInteger[{-10^5,10^5}];
list3=Table[{r,r,r},{j,10^2}]; (* 3 numbers in each sublist *)
list9=Table[{r,r,r,r,r,r,r,r,r},{j,10^2}]; (* 9 numbers *)
maxBy[list3, 2] (* Find max in position 2 of list3 *)
(* {{-93332, 99582, 4324}} *)
maxBy[list9, 5] (* Find max in position 5 of list9 *)
(* {{7680, 85508, 51915, -58282, 94679, 50968, -12664, 75246, -82903}} *)
Of course, the results will vary according to the random numbers you have generated.
Edit
Here's some timing data for large lists. SortBy
is clearly slower. but doesn't seem as influenced by the number of elements in each sublist. First, my maxBy
code followed by SortBy
:
Using the same list2, here's some timing data for Yoda's code. Although his routine is also called maxBy, it is his that produced the output that follows:
Again, with the same list2, some data for Belisarius' code:
His second suggestion is the fastest of all tested.