I'm looking for a way to make the best possible combination of people in groups. Let me sketch the situation.
Say we have persons A, B, C and D. Furthermore we have groups 1, 2, 3, 4 and 5. Both are examples and can be less or more. Each person gives a rating to each other person. So for example A rates B a 3, C a 2, and so on. Each person also rates each group. (Say ratings are 0-5). Now I need some sort of algorithm to distribute these people evenly over the groups while keeping them as happy as possible (as in: They should be in a highrated group, with highrated people). Now I know it's not possible for the people to be in the best group (the one they rated a 5) but I need them to be in the best possible solution for the entire group.
I think this is a difficult question, and I would be happy if someone could direct me to some more information about this types of problems, or help me with the algo I'm looking for.
Thanks!
EDIT:
I see a lot of great answers but this problem is too great for me too solve correctly. However, the answers posted so far give me a great starting point too look further into the subject. Thanks a lot already!
after establishing this is NP-Hard problem, I would suggest as a heuristical solution: Artificial Intelligence tools.
A possible approach is steepest ascent hill climbing [SAHC]
first, we will define our utility function (let it be u). It can be the sum of total happiness in all groups.
next,we define our 'world': S is the group of all possible partitions.
for each legal partition s of S, we define:
next(s)={all possibilities moving one person to a different group}
all we have to do now is run SAHC with random restarts:
1. best<- -INFINITY
2. while there is more time
3. choose a random partition as starting point, denote it as s.
4. NEXT <- next(s)
5. if max{ U(NEXT) } < u(s): //s is the top of the hill
5.1. if u(s) > best: best <- u(s) //if s is better then the previous result - store it.
5.2. go to 2. //restart the hill climbing from a different random point.
6. else:
6.1. s <- max{ NEXT }
6.2. goto 4.
7. return best //when out of time, return the best solution found so far.
It is anytime algorithm, meaning it will get a better result as you give it more time to run, and eventually [at time infinity] it will find the optimal result.
The problem is NP-hard: you can reduce from Maximum Triangle Packing, that is, finding at least k vertex-disjoint triangles in a graph, to the version where there are k groups of size 3, no one cares about which group he is in, and likes everyone for 0 or for 1. So even this very special case is hard.
To solve it, I would try using an ILP: have binary variables g_ik indicating that person i is in group k, with constraints to ensure a person is only in one group and a group has an appropriate size. Further, binary variables t_ijk that indicate that persons i and j are together in group k (ensured by t_ijk <= 0.5 g_ik + 0.5 g_jk) and binary variables t_ij that indicate that i and j are together in any group (ensured by t_ij <= sum_k t_ijk). You can then maximize the happiness function under these constraints.
This ILP has very many variables, but modern solvers are pretty good and this approach is very easy to implement.
This is an example of an optimization problem. It is a very well
studied type of problems with very good methods to solve them. Read
Programming Collective Intelligence which explains it much better
than me.
Basically, there are three parts to any kind of optimization problem.
The input to the problem solving function.
The solution outputted by the problem solving function.
A scoring function that evaluates how optimal the solution is by
scoring it.
Now the problem can be stated as finding the solution that produces
the highest score. To do that, you first need to come up with a format
to represent a possible solution that the scoring function can then
score. Assuming 6 persons (0-5) and 3 groups (0-2), this python data structure
would work and would be a possible solution:
output = [
[0, 1],
[2, 3],
[4, 5]
]
Person 0 and 1 is put in group 0, person 2 and 3 in group 1 and so
on. To score this solution, we need to know the input and the rules for
calculating the output. The input could be represented by this data
structure:
input = [
[0, 4, 1, 3, 4, 1, 3, 1, 3],
[5, 0, 1, 2, 1, 5, 5, 2, 4],
[4, 1, 0, 1, 3, 2, 1, 1, 1],
[2, 4, 1, 0, 5, 4, 2, 3, 4],
[5, 5, 5, 5, 0, 5, 5, 5, 5],
[1, 2, 1, 4, 3, 0, 4, 5, 1]
]
Each list in the list represents the rating the person gave. For
example, in the first row, the person 0 gave rating 0 to person 0 (you
can't rate yourself), 4 to person 1, 1 to person 2, 3 to 3, 4 to 4 and
1 to person 5. Then he or she rated the groups 0-2 3, 1 and 3
respectively.
So above is an example of a valid solution to the given input. How do
we score it? That's not specified in the question, only that the
"best" combination is desired therefore I'll arbitrarily decide that
the score for a solution is the sum of each persons happiness. Each
persons happiness is determined by adding his or her rating of the
group with the average of the rating for each person in the group,
excluding the person itself.
Here is the scoring function:
N_GROUPS = 3
N_PERSONS = 6
def score_solution(input, output):
tot_score = 0
for person, ratings in enumerate(input):
# Check what group the person is a member of.
for group, members in enumerate(output):
if person in members:
# Check what rating person gave the group.
group_rating = ratings[N_PERSONS + group]
# Check what rating the person gave the others.
others = list(members)
others.remove(person)
if not others:
# protect against zero division
person_rating = 0
else:
person_ratings = [ratings[o] for o in others]
person_rating = sum(person_ratings) / float(len(person_ratings))
tot_score += group_rating + person_rating
return tot_score
It should return a score of 37.0 for the given solution. Now what
we'll do is to generate valid outputs while keeping track of which one
is best until we are satisfied:
from random import choice
def gen_solution():
groups = [[] for x in range(N_GROUPS)]
for person in range(N_PERSONS):
choice(groups).append(person)
return groups
# Generate 10000 solutions
solutions = [gen_solution() for x in range(10000)]
# Score them
solutions = [(score_solution(input, sol), sol) for sol in solutions]
# Sort by score, take the best.
best_score, best_solution = sorted(solutions)[-1]
print 'The best solution is %s with score %.2f' % (best_solution, best_score)
Running this on my computer produces:
The best solution is [[0, 1], [3, 5], [2, 4]] with score 47.00
Obviously, you may think it is a really stupid idea to randomly just
generate solutions to throw at the problem, and it is. There are much
more sophisticated methods to generate solutions such as simulated
annealing or genetic optimization. But they all build upon the same
framework as given above.
Related
There are N Buildings on the site ranging from 0 to N-1. Every employee has an office space in one of the buildings. A new employee may make request to move from current building X to another building Y. A moving request is noted by
class Request {
String employeeName;
int fromBuilding;
int toBuilding;
}
Initially all buildings are full. A request from building X to building Y is achievable only if someone in Building Y makes an achievable request to move therefore creating a vacancy. Given a wishlist of requests help us plan for the best way of building swaps. A plan that fulfills maximum number of requests is considered the best.
Example 1:
Input:
["Alex", 1, 2]
["Ben", 2, 1]
["Chris", 1, 2]
["David", 2, 3]
["Ellen", 3, 1]
["Frank", 4, 5]
Output: [["Alex", "Bem"], ["Chris", "David", "Ellen"]]
Example 2:
Input:
["Adam", 1, 2]
["Brian", 2, 1]
["Carl", 4, 5]
["Dan", 5, 1]
["Eric", 2, 3]
["Fred", 3, 4]
Output: [["Adam", "Eric", "Fred", "Carl", "Dan"]]
This question was taken from leet code here:
https://leetcode.com/discuss/interview-question/325840/amazon-phone-screen-moving-requests
I am trying to do this in python and I figured that creating a dictionary that represents the graph would be a good start but not sure what to do next.
```
def findMovers(buildReqs):
graph={}
for i in buildReqs:
if i[1] not in graph:
graph[i[1]]=[i[2]]
else:
graph[i[1]].append(i[2])
```
Make a bipartite graph with current offices on one side and future offices on the other.
Draw edges with score 0 for people staying in their current office, and edges with score 1 for people moving into any desired new office.
Find the maximum weight bipartite matching: https://en.wikipedia.org/wiki/Assignment_problem
When playing trading card games, I frequently wonder what would be the most efficient data structure to deal with the following problem.
In such games, I face an opponent with a deck that contains N cards (N ~ 30..60..100), each of them is chosen out of possible M card types (M ~ typically 1000..10000s). Cards are generally not required to be unique, i.e. there can be repeated card types. The contents of opponent's deck are unknown before the game.
As the game starts and progresses, I slowly learn card-by-card, which cards an opponent uses. There is a dataset that includes full contents of K (K ~ typically 100000..100000s) of the decks seen previously. I want to query this dataset using progressively increasing sample I've obtained in a certain game to make a ranked list of possible decks an opponent uses.
What would be the most efficient data structure to do such querying, given mentioned limits on reasonably modern hardware (i.e. several gigabytes of RAM available)?
A very small example
possible card types = [1..10]
known K decks:
d1 = [1, 4, 6, 3, 4]
d2 = [5, 3, 3, 9, 5]
d3 = [5, 10, 4, 10, 1]
d4 = [3, 7, 1, 8, 5]
on turn 1, I reveal that an opponent uses card #5; thus, my list of candidates is reduced to:
d2 = [5, 3, 3, 9, 5] - score 2
d3 = [5, 10, 4, 10, 1] - score 1
d4 = [3, 7, 1, 8, 5] - score 1
d2 is ranked higher than the rest in the results, because there are double 5s in that deck, so it's probably more likely that it is
on turn 2, I reveal that an opponent uses card #1; list of candidates is reduced to:
d3 = [5, 10, 4, 10, 1]
d4 = [3, 7, 1, 8, 5]
My ideas on solution
The trivial solution is, of course, to store K decks as an arrays of N integers. Getting match score for a given query of p cards revealed for one deck thus takes O(N*p) checks. Each time we see a match, we just increase the score by 1. Thereby, checking all K known decks against a query of p cards would take O(KNp), that is roughly 100000 * 100 * 100 operations in worst case => 1e9, that's lots of work.
We can set up an index that will hold a list of pointers to decks that card is encountered in for every known card type — however, it doesn't solve the problem of intersecting all these lists (and they are going to be huge, there might be cards that are found in 90..95% of known decks). For a given p card lookup, it boils down to intersecting p lists of K decks pointers, calculating intersection scores in process. Roughly, that is O(Kp), but with a fairly large constant. It's still 1e7 operations in late stages.
However, if we'll use the fact that every next turn in fact restricts our dataset further, we can reapply filtering to whatever came up on previous query. This way, it would be O(K) every turn => 1e5 operations.
Is there a way to perform better, ideally, not depending on value of K?
There are two things you can do to speed this up. First, create an inverted index that tells you which decks contain each card. So in your example decks above:
d1 = [1, 4, 6, 3, 4]
d2 = [5, 3, 3, 9, 5]
d3 = [5, 10, 4, 10, 1]
d4 = [3, 7, 1, 8, 5]
Your index is:
1: d1, d3, d4
3: d1, d2, d4
4: d1(2), d3
5: d2(2), d3, d4
6: d1
7: d4
8: d4
9: d2
10: d3(2)
It should be clear that this takes the about the same amount of memory as the decks themselves. That is, rather than having N decks of K cards, you have up to M cards, each of which has up to N deck references.
When the user turns over the first card, 5, you quickly look up 5 in your index and you get the candidate lists [d2,d3,d4].
Here's the second optimization: you keep that list of candidates around. You're no longer interested in the rest of the decks; they have been eliminated from the list of candidates. When the next card, 1, is revealed, you look up 1 in your index and you get [d1,d3,d4]. You intersect that with the first list of candidates to produce [d3,d4].
In the worst possible case, you'd end up doing N intersections (one per card) of K items each (if the decks are all very similar). But in most cases the number of decks that a card is in will be much smaller than K, so your candidate list length will likely shrink very quickly.
Finally, if you store the deck references as hash maps then the intersection goes very quickly because you only have to look for items from the (usually small) existing candidate list in the large list of items for the next card turned over. Those lookups are O(1).
This is the basic idea of how a search engine works. You have a list of words, each of which contains references to the documents the word appears in. You can very quickly narrow a list of documents from hundreds of millions to just a handful in short order.
Your idea with intersecting p lists of deck pointers is good, but you're missing some optimizations.
Sort the decks by some criteria (i.e. deck index) and use binary search to advance through the lists (take the smallest deck id using a heap and advance it to match or exceed to current largest deck id). This way you get through them faster, especially if you don't have a lot of decks in the intersection.
Also store the previous intersection so that for the next move you only need to intersect 2 lists (previous result and the new card).
Finally you can simply ignore cards that are too popular and just check for them in the final result.
I would suggest you implement a solution like this and run some benchmarks. It will be faster than O(K).
I'm doing some programming "kata" which are skill building exercises for programming (and martial arts). I want to learn how to solve for algorithms like these in shorter amounts of time, so I need to develop my knowledge of the patterns. Eventually I want to solve in increasingly efficient time complexities (O(n), O(n^2), etc), but for now I'm fine with figuring out the solution with any efficiency to start.
The problem:
Given arr[10] = [4, 5, 0, 2, 5, 6, 4, 0, 3, 5]
Given various segment lengths, for example one 3-length segment, and two 2-length segments, find the optimal position of (or maximum sum contained by) the segments without overlapping the segments.
For example, solution to this array and these segments is 2, because:
{4 5} 0 2 {5 6 4} 0 {3 5}
What I have tried before posting on stackoverflow.com:
I've read through:
Algorithm to find maximum coverage of non-overlapping sequences. (I.e., the Weighted Interval Scheduling Prob.)
algorithm to find longest non-overlapping sequences
and I've watched MIT opencourseware and read about general steps for solving complex problems with dynamic programming, and completed a dynamic programming tutorial for finding Fibonacci numbers with memoization. I thought I could apply memoization to this problem, but I haven't found a way yet.
The theme of dynamic programming is to break the problem down into sub-problems which can be iterated to find the optimal solution.
What I have come up with (in an OO way) is
foreach (segment) {
- find the greatest sum interval with length of this segment
This produces incorrect results, because not always will the segments fit with this approach. For example:
Given arr[7] = [0, 3, 5, 5, 5, 1, 0] and two 3-length segments,
The first segment will take 5, 5, 5, leaving no room for the second segment. Ideally I should memoize this scenario and try the algorithm again, this time avoiding 5, 5, 5, as a first pick. Is this the right path?
How can I approach this in a "dynamic programming" way?
If you place the first segment, you get two smaller sub-arrays: placing one or both of the two remaining segments into one of these sub-arrays is a sub-problem of just the same form as the original one.
So this suggests a recursion: you place the first segment, then try out the various combinations of assigning remaining segments to sub-arrays, and maximize over those combinations. Then you memoize: the sub-problems all take an array and a list of segment sizes, just like the original problem.
I'm not sure this is the best algorithm but it is the one suggested by a "direct" dynamic programming approach.
EDIT: In more detail:
The arguments to the valuation function should have two parts: one is a pair of numbers which represent the sub-array being analysed (initially [0,6] in this example) and the second is a multi-set of numbers representing the lengths of the segments to be allocated ({3,3} in this example). Then in pseudo-code you do something like this:
valuation( array_ends, the_segments):
if sum of the_segments > array_ends[1] - array_ends[0]:
return -infinity
segment_length = length of chosen segment from the_segments
remaining_segments = the_segments with chosen segment removed
best_option = 0
for segment_placement = array_ends[0] to array_ends[1] - segment_length:
value1 = value of placing the chosen segment at segment_placement
new_array1 = [array_ends[0],segment_placement]
new_array2 = [segment_placement + segment_length,array_ends[1]]
for each partition of remaining segments into seg1 and seg2:
sub_value1 = valuation( new_array1, seg1)
sub_value2 = valuation( new_array2, seg2)
if value1 + sub_value1 + sub_value2 > best_option:
best_option = value1 + sub_value1 + sub_value2
return best_option
This code (modulo off by one errors and typos) calculates the valuation but it calls the valuation function more than once with the same arguments. So the idea of the memoization is to cache those results and avoid re-traversing equivalent parts of the tree. So we can do this just by wrapping the valuation function:
memoized_valuation(args):
if args in memo_dictionary:
return memo_dictionary[args]
else:
result = valuation(args)
memo_dictionary[args] = result
return result
Of course, you need to change the recursive call now to call memoized_valuation.
I'm programming a Killer Sudoku Solver in Ruby and I try to take human strategies and put them into code. I have implemented about 10 strategies but I have a problem on this one.
In killer sudoku, we have "zones" of cells and we know the sum of these cells and we know possibilities for each cell.
Example :
Cell 1 can be 1, 3, 4 or 9
Cell 2 can be 2, 4 or 5
Cell 3 can be 3, 4 or 9
The sum of all cells must be 12
I want my program to try all possibilities to eliminate possibilities. For instance, here, cell 1 can't be 9 because you can't make 3 by adding two numbers possible in cells 2 and 3.
So I want that for any number of cells, it removes the ones that are impossible by trying them and seeing it doesn't work.
How can I get this working ?
There's multiple ways to approach the general problem of game solving, and emulating human strategies is not always the best way. That said, here's how you can solve your question:
1st way, brute-forcy
Basically, we want to try all possibilities of the combinations of the cells, and pick the ones that have the correct sum.
cell_1 = [1,3,4,9]
cell_2 = [2,4,5]
cell_3 = [3,4,9]
all_valid_combinations = cell_1.product(cell_2,cell_3).select {|combo| combo.sum == 12}
# => [[1, 2, 9], [3, 5, 4], [4, 4, 4], [4, 5, 3]]
#.sum isn't a built-in function, it's just used here for convenience
to pare this down to individual cells, you could do:
cell_1 = all_valid_combinations.map {|combo| combo[0]}.uniq
# => [1, 3, 4]
cell_2 = all_valid_combinations.map {|combo| combo[1]}.uniq
# => [2, 5, 4]
. . .
if you don't have a huge large set of cells, this way is easier to code. it can get a bit inefficienct though. For small problems, this is the way I'd use.
2nd way, backtracking search
Another well known technique takes the problem from the other approach. Basically, for each cell, ask "Can this cell be this number, given the other cells?"
so, starting with cell 1, can the number be 1? to check, we see if cells 2 and 3 can sum to 11. (12-1)
* can cell 2 have the value 2? to check, can cell 3 sum to 9 (11-1)
and so on. In very large cases, where you could have many many valid combinations, this will be slightly faster, as you can return 'true' on the first time you find a valid number for a cell. Some people find recursive algorithms a bit harder to grok, though, so your mileage may vary.
I've been working on a genetic algorithm where there is a population consisting of individuals with a color, and a preference. Preference and color are from a small number of finite states, probably around 4 or 5. (example: 1|1, 5|2, 3|3 etc)
Every individual casts a "vote" for their preference, which assists those individuals with that vote as their color.
My current idea is to cycle through every individual, and calculate the chance that they should survive, based on number of votes, etc. and then roll a die to see if they live.
I'm currently doing it so that if v[x] represents the percent of votes for color x, individual k with color c has v[c] chance of surviving. However, this means that if there are equal numbers of all 5 types of (a|a) individuals, 4/5 of them perish, and that's not good.
Does anyone have any idea of a method of randomness I could use to determine the chance an individual has to survive? For instance, an algorithm that for v votes for c, v individuals with color c survive (on statistical average).
Assign your fitness (likelyness of survival in your case) to each individual as is, then sort them on descending fitness and use binary tournament selection or something similar to sample another population of your chosen size.
Well, you can weight the probabilities according to the value returned by passing each
member of the population to the cost function.
That seems to me the most straightforward way, consistent with the genetic
meta-heuristic.
More common though, is to divide the current population into segments, based on
the value returned from passing them to the cost function.
So for instance,
if each generation consists of 100 members, then the top N (N is just a user-defined
parameter, often something like 5-10% of the total) members w/ the lowest cost
function result) are carried forward to the next generation just as they are (elitism).
Perhaps this is what you mean by 'survive.' If so, then again, these 'survivors'
are determined by ranking the members of the population according to the cost function
value and selecting those members above your defined elitism fraction constant.
The rest (the majority) of the next generation are created either by
mutation or cross-over.
mutation:
# one member of the current population:
[4, 5, 1, 7, 4, 2, 8, 9]
# small random change in one member of prior generation, to create mutant that is
# a member of the next generation
[4, 9, 1, 7, 4, 2, 8, 9]
crossover:
# two of the 'top' members of the current generation
[4, 5, 1, 7, 4, 2, 8, 9]
[2, 3, 6, 9, 2, 1, 6, 4]
# offpsring is a member of the next generation
[4, 5, 1, 7, 2, 1, 6, 4]