# selecting integer intervals with specific intra-inter length from random integer intervals

Here, I have a one-dimensional integer space (consist of random intervals defined by their begin and end). I would like to select consequent integer intervals with specific intra-inter length.

An integer interval means a set of consecutive increasing integers, defined by a begin integer and an end integer. Some intervals in the initial set are totally included in others or partially overlapped with others.

I describe my question using the following dummy.

(1) the data (integer space with integer intervals defined by their begin and end) I have,

``````integer.space <- data.frame(
begin=c(1,5,6,15,31,51,102),
end  =c(7,9,13,21,49,52,108)
)
``````

(2) what I want is to select the consequent integer intervals with intra-length of 3 and inter-length of 2. and output the selected intervals as begin and end. In this selection, I would like to select more integer intervals as most as it could be.

``````begin, end\n
1,3\n
6,8\n
11,13\n
16,18\n
31,33\n
36,38\n
41,43\n
46,48\n
102,104\n
``````
-
It is unclear to me what you exactly mean by intra en inter length. – Paul Hiemstra Dec 7 '11 at 11:02
my intention is to select integers from a specific integer space. The selection should obey several rule: (1) the selected integers would occurred as intervals (consequent integers); (2) the length of the selected integers is the intra-length, which would be 3. (3) the distance between two adjacent selected intervals is inter-length, which would be 2. (4) I want the integer selected be presented as intervals. – jianfeng.mao Dec 7 '11 at 11:14
Thanks so much to your reply, Dear Paul. – jianfeng.mao Dec 7 '11 at 11:15
By consequent you mean consecutive? – Paul Hiemstra Dec 7 '11 at 11:17
yes, it is. Thanks a lot for your kindness. – jianfeng.mao Dec 7 '11 at 11:27

I would do this in several steps:

1) Reduce the integer.space to nonoverlapping intervals.

2) Create a collection of intervals, and shift them so that they start at start points of the disjoint pieces of the integer space:

``````intra <- 3
inter <- 2
intervals <- data.frame(begin=seq(from=min(integer.space\$begin),to=max(integer.space\$end),by=intra+inter))
intervals\$end <- intervals\$begin + inter
for (k in 2:nrow(integer.space)) {
# overlaps the start of this component?
shift <- (intervals\$begin>integer.space\$end[k-1]) & (intervals\$begin<integer.space\$begin[k])
if (any(shift)) {
shift.ind <- min(which(shift))
intervals[shift.ind:nrow(intervals),] <- intervals[shift.ind:nrow(intervals),] + integer.space\$begin[k] - intervals\$begin[shift.ind]
}
}
``````

3) Remove those that lie outside the integer space

``````goodbegins <- sapply(intervals\$begin, function (x) {
any( (x>=integer.space\$begin) & (x<=integer.space\$end) )
} )
goodends <- sapply(intervals\$end, function (x) {
any( (x>=integer.space\$begin) & (x<=integer.space\$end) )
} )
intervals <- intervals[goodbegins&goodends,]

intervals
``````
-
Dear petrelharp, thanks a lot. you present an attractive solution. I am now thinking if it is the best one. I am wondering if it can select more integer intervals as most as it could be. – jianfeng.mao Dec 8 '11 at 7:26
I intend to receive this solution as the answer, I think it exactly solved my problem. Thanks a lot, petrelharp. – jianfeng.mao Dec 8 '11 at 10:03

Partial steps: I think you first want to define the continuous sequences. The one condition you did not put in your test case was a completely overlapped sequence.

``````> ints2 <- ints2[c(1:3,3,4:7),]
> ints2[4,] <- c(8,10)

require(IRanges) # from BioConductor repository
x <- IRanges(start = ints2\$begin, width=1+ints2\$end-ints2\$begin)
asNormalIRanges(x)
#--------------
NormalIRanges of length 5
start end width
[1]     1  13    13
[2]    15  21     7
[3]    31  49    19
[4]    51  52     2
[5]   102 108     7
``````

Further progress: To generate the sequence of 2,3,2,3,2,3... within overlapping ranges you can use:

``````# c(start, cumsum( rep(c(2,3), 1+(end-start)%/%5)
``````

But then you need to trim the sequence when it "overshoots the "end":

``````seqcand <- c(cumsum(c(31, rep(c(2,3), 1+(49-31)%/%5))), 49)
seqcand[ 1: (min(which(seqcand > 49, arr.ind=TRUE))-1)]
# [1] 31 33 36 38 41 43 46 48
``````
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Thanks, Dear DWin. I am still struggling with this problem. – jianfeng.mao Dec 7 '11 at 20:09
Dear DWin, Thanks for your updating and good point of IRanges package. – jianfeng.mao Dec 8 '11 at 9:57