Student Time scheduling algorithm

I need to find an algorithm to find the best time to meet up for lets say a study group. The system has information about a group of students and their class schedules. The system should give a time for meetup, where there is no conflict with anyone's class schedules. what would be the best way attack this problem. I was looking for any scheduling algorithm, but didnt find anyone that fits.

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Interesting question.

This is what I would do:

1. First, align all timescheduals, for all students (e.g. starting on Mondays, every day devided by 24 hours). You can use a boolean or an integer for each period and store them in an array.
2. Then perform an addition operation on all scheduals together.

Which then looks like this, for example:

``````Student A: 11100000111111100000
Student B: 00000011111000010001
Student C: 00000000111111110001
_______________________________+
11100022333222220002
^^^          ^^^
``````

Then you'd need to find all gaps in the array (areas with zeros) by using a simple loop which keeps track of the current zero-length. Memoize the start and end index and translate it back (reverse of step 1) to a time region.

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thanks, i was looking for more of algorithmic approach. – user171034 Jan 18 '10 at 16:05
+1 for simplicity. The size of a atudy group and the number of occupation slots in a day are small enough that most brute force approach to this NP problem is an option. An impovement to the above solution is to use arrays of integers (one array per student, one integer per timeslot) and to SUM the timeslot values rather rather than than to OR them, boolean fashion. This system allows the SUM array to provide better guidance for picking "second choices", i.e. meeting possibilities when some of the students are not available. – mjv Jan 18 '10 at 16:16
Thanks, updated the example. – Pindatjuh Jan 18 '10 at 16:30
What's an 'algorithmic approach'? This is a very nice algorithm. – gary Jan 18 '10 at 16:42
"An algorithm is an effective method for solving a problem using a finite sequence of instructions" -Wikipedia. Check... Check... Algorithm. – Jeff B Jan 18 '10 at 18:56

There are `24*60 = 1440` minutes per day. So you could easily brute force it, since you don't need to get more than on a minute basis accuracy. However I'm gonna describe a simple DP.

You can create a boolean array that stores whether that minute has a class in it by one of the students in the group. You also have a second array. This array stores the number of open spaces in this block and to the left. So what you can do is traverse the boolean array from right to left and if the block has a class in it you make the number 0, otherwise you make it 1 plus the number in the minute prior.

However, I feel my explanation lacking, so here is pseudo code:

``````blocked = <boolean array>;
numtoleft = <array containing the counts>;
if blocked[0]:
numtoleft[0] = 0;
else:
numtoleft[0] = 1;

for i = 1 to 1440-1:
if blocked[i]:
numtoleft[i] = 0;
else:
numtoleft[i] = numtoleft[i-1];
``````

Then you can easily find the biggest open slot by finding the maximum number in the 'numtoleft' array and you can add restrictions to the times you are looking at.

EDIT:

Here's the algorithm in python:

``````def largestslot(blocked, startminute, endminute):
numtoleft = [0]*1440
numtoleft[startminute] = 0 if blocked[startminute] else 1
for i in xrange(startminute+1, endminute+1):
numtoleft[i] = 0 if blocked[i] else 1
ansmax = max(numtoleft[startminute:endminute+1)
ansi = numtoleft.index(ansmax)
return (ansi-ansmax, ansi)
``````
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i don't think this is an elegant solution. – user171034 Jan 18 '10 at 16:10

this is a matching problem and can be solve by maximum flow algorithm

each student and study group is a node on a directional graph and input for each student have one flow unit as input and is connected to all study groups node. each study node group has unlimited output capacity , when the flow in the network is maximal you have your correct combination

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+1 for proper identification of a research operation problem. For more related material, look up en.wikipedia.org/wiki/Linear_Programming – Agos Jan 18 '10 at 16:20
Max flow is far from simple to code, using a minute resolution you could easily use some type of brute force. – JPvdMerwe Jan 18 '10 at 16:29

I'd set a duration for the meeting and a valid time range when the meeting can occur, i.e. 45 minute duration starting on or after 8:00 AM but not after 9:30 PM. Then it should be a simple matter of intersecting the group member's free time and finding a block that fits. You'll want to include tolerances for overlap, i.e. if 75% of the group can meet then it's viable.

You might also want to include buffers for start/end times to allow for travel, etc. and include those buffers in your search criteria. The one thing I hate about most meetings is that they don't take into account travel/setup time and instead book one meeting right on top of another.

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Every students has a range of available hours. And everyone has to meet(meaning there is at least one hour where they are all free). You simply start with the first student and intersect its range of available hours with the next student and do that(keep narrowing the original range) for every student and you should be left with a range that fits every student.

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• sort all scheduled time blocks from all members of the group into one list, ordered by the start time of a block
• go through the list and merge adjacent items, if they overlap (endTime of n is grater than start time of n+1)

Now your list contains time blocks where all of the group members have other activities. So you need to check the list for free time slots and check, if the slot is large enough for the desired meeting.

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As I remember the best solutions for this problem are solutions generated by genetic algorithms

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I don't think GAs will be of much help for this question, as there is no fitness criteria to evaluate a solution. There ether is a free time slot or there is none. – Frank Bollack Jan 18 '10 at 16:16
since there is an optimal solution that can be found in less than exponential time, GA are really not needed! – Agos Jan 18 '10 at 16:17
No, you're thinking about setting up a timetable, which is an NP-Complete problem. This problem is a lot simpler. :) – JPvdMerwe Jan 18 '10 at 16:20