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My question sounds more general, but I have a specific example. I have a list of data in form:

plotDataAll={{DateList1, integerValue1}, {DateList2, integerValue2}...}

The dates are sorted chronologically, that is plotDataAll[[2,1]] is a more recent time then plotDataAll[[1,1]].

I want to create plots of specific periods, 24h ago, 1 week ago, etc. For that I need just a portion of data. Here's how I got what I wanted:

mostRecentDate=Max[Map[AbsoluteTime, plotDataAll[[All,1]]]];
plotDataLast24h=Select[plotDataAll,AbsoluteTime[#[[1]]]>(mostRecentDate-86400.)&];
plotDataLastWeek=Select[plotDataAll,AbsoluteTime[#[[1]]]>(mostRecentDate-604800.)&];
plotDataLastMonth=Select[plotDataAll,AbsoluteTime[#[[1]]]>(mostRecentDate-2.592*^6)&];
plotDataLast6M=Select[plotDataAll,AbsoluteTime[#[[1]]]>(mostRecentDate-1.5552*^7)&];

Then I used DateListPlot to plot the data. This becomes slow if you need to do this for many sets of data.
What comes to my mind, if I could find the index of first element in list that satisfies the date condition, because it's chronologically sorted, the rest of them should satisfy the condition as well. So I would have:

plotDataLast24h=plotDataAll[[beginningIndexThatSatisfiesLast24h;;Length[plotDataAll]]

But how do I get the index of the first element that satisfies the condition?

If you have a faster way to do this, please share your answer. Also, if you have a simple, faster, but sub-optimal solution, that's fine too.

EDIT:
Time data is not in regular intervals.

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2  
Can use Position[] with a setting to get only the first one. Also if you do this from longest sublist to shortest, you can truncate at each step so that subsequent ones work with smaller lists. –  Daniel Lichtblau Jan 20 '12 at 23:41
    
Could you please give me an example of this. I don't understand patterns well. –  enedene Jan 21 '12 at 16:46
    
@Daniel, Position[] can be made to return only the first position but I assume (based on timing results) it still checks the entire list. Is there a way to genuinly make MMA stop evaluation of inbuilt functions? The only example that comes to mind is If[] with a long list of && conditions which will terminate on the first False. –  Timo Jan 22 '12 at 19:48
1  
@enedene, a pattern based check would be _?(# > val&). E.g. Position[plotDataAll,_(AbsoluteTime[#[[1]]]>(mostRecentDate-86400.)&)] (I think). –  Timo Jan 22 '12 at 19:53
    
@Timo I did not consider that it might check the entire list (I've not tested it). I'd guess Scan with Return or Throw could be made to do a short-circuit if Position is reluctant to do so. –  Daniel Lichtblau Jan 22 '12 at 21:24

2 Answers 2

up vote 2 down vote accepted

If your data is at regular intervals you should be able to know how many elements constitute a day, week, etc. and use Part.

plotDataAll2[[knownIndex;;-1]]

or more specifically if the data was hourly:

plotDataAll2[[-25;;-1]]

would give you the last 24 hours. If the spacing is irregular then use Select or Pick. Date and time functions in Mma are horrendously slow unfortunately. If you are going to do a lot of date and time calculation better to do a conversion to AbsoluteTime just once and then work with that. You will also notice that your DateListPlots render much faster if you use AbsoluteTime.

plotDataAll2=plotDataAll;
plotDataAll2[[All,1]]=AbsoluteTime/@plotDataAll2[[All,1]];
mostRecentDate=plotDataAll2[[-1,1]]

On my computer Pick is about 3 times faster but there may be other improvements you can make to the code below:

selectInterval[data_, interval_] := (tmp = data[[-1, 1]] - interval; 
  Select[data, #[[1]] > tmp &])

pickInterval[data_, interval_] := (tmp = data[[-1, 1]] - interval; 
  Pick[data, Sign[data[[All, 1]] - tmp], 1])

So to find data within the last week:

Timing[selectInterval[plotDataAll2, 604800]]
Timing[pickInterval[plotDataAll2, 604800]]
share|improve this answer
    
Data is not in regular intervals and all sets of data have different time frames, I'll add that to the post. –  enedene Jan 21 '12 at 9:39
    
In that case Pick is your best option as above. –  Mike Honeychurch Jan 21 '12 at 22:09
    
Good points about AbsoluteTime, I was not aware that DateListPlot can plot from AbsoluteTime, that's why I haven't used it. I've used your pickInterval function, overall a great improvement, and I've also learned something new. Thank you. –  enedene Jan 22 '12 at 14:44
    
I should add that the advantages of using Pick would normally be even greater, at least another order of magnitude, but we don't get that because date lists are not packed. –  Mike Honeychurch Jan 22 '12 at 22:19
    
@enedene, yes one of the reasons DateListPlot is slow is that it converts date lists to absolute time so if you already have your data in absolute time the plots will render faster. –  Mike Honeychurch Jan 22 '12 at 22:21

The thing that you want to avoid is checking all the values in the data table. Since the data is sequential you can just start checking from the back and stop when you have found the correct index.

Schematically:

tab = {0, 1, 2, 3, 4, 5, 6, 7, 8, 9};
i = j = Length@tab;
While[tab[[i]] > 5, --i]; 
tab[[i ;; j]]
-> {5, 6, 7, 8, 9}

sustitute > 5 for whatever you want to check for. I didn't have time to test this right now but in your case, e.g.,

maxDate=AbsoluteTime@plotDataAll[[-1,1]]; (* no need to find Max if data is sequential*)

i24h = iWeek = iMonth = iMax = Length@plotDataAll;
While[AbsoluteTime@plotDataAll[[i24h,1]] > maxDate-86400.,--i24h];
While[AbsoluteTime@plotDataAll[[iWeek,1]] > maxDate-604800.,--iWeek];
While[AbsoluteTime@plotDataAll[[iMonth,1]] > maxDate-2.592*^6.,--iMonth];
While[AbsoluteTime@plotDataAll[[i6Month,1]] > maxDate-1.5552*^7.,--i6Month];

Then, e.g.,

DateListPlot@plotDataAll[[i24h;;iMax]]

If you want to start somewhere in the middle of plotDataAll just use a While to first find the starting point and set iMax and maxDate apropriately.

For large data sets this may be one of the few instances where a loop construct is better than MMA's inbuilt functions. That, however, may be my own ignorance and if anyone here knows of a MMA inbuilt function that does this sort of "stop when match found" comparison better than While.

EDIT: Timing comparisons

I played around a bit with Mike's and my solution and compared it to the OP's method. Here is the toy code I used for each solution

tab = Range@1000000;

(* My solution *)
i = j = tab[[-1]];
While[tab[[i]] > j - 24, --i];
tab[[i ;; j]]

(* Mike's solution *)
tmp = tab[[-1]] - 24;
Pick[tab, Sign[tab[[All]] - tmp], 1]

(* Enedene's solution *)
j = tab[[-1]];
Select[tab, # > (j - 24) &]

Here are the results (OS X, MMA 8.0.4, Core2Duo 2.0GHz)

Timing differences of solutions

As you can see, Mike's solution has a definite advantage over enedene's solution but, as I surmised originally, the downside of using inbuilt functions like Pick is that they still perform a comparative check on all the element in a list which is highly superfluous in this instance. My solution has constant time due to the fact that no unneccessary checks are made.

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Can you show this working on an actual DateList please. As it stands it is incomplete (plus it is has a syntax error). –  Mike Honeychurch Jan 22 '12 at 4:36
1  
ok I think I've figured out the typos. Should be plotDataAll[[iWeek, 1]]] etc. I tested this for some microsoft data list length 3000. While was faster than Pick if you only want the first ~60 points (2% of list) after that Pick was better. For list length 1000 Pickis faster to get >~25 points etc. So depends on list length and expected number of points in the sampling window. –  Mike Honeychurch Jan 22 '12 at 4:58
    
Your solution is also faster than my original code. Good point about no need for use of Max. Thank you. –  enedene Jan 22 '12 at 14:45
    
Although it will be interesting to compare the results when data sets become very large, for now I have only 2 months of data (about 1500 points per data set). –  enedene Jan 22 '12 at 15:01
    
Thanks Mike for the correction. This was just quickly fired off before heading out to a party so I didn't check that it woked. I believe the general idea of the solution to be sound though. –  Timo Jan 22 '12 at 18:19

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