What I'm trying to achieve is continuously add more values to a set and keep them as far apart from each other as possible. I'm sure there must be several algorithms out there to solve this problem, but I'm probably just not searching with the right terms. If someone could point me to a solution (doesn't need to be a particularly efficient one) that would be great.
Effectively, given an set of values S, within a range Min-Max, I need to calculate a new value V, within the same range, such that the sum of distances between V and all values in S gets maximized.
It's easy to show that possible candidates for V are either an already existing value of S or the minimum/maximum. Proof: Let S_1, S_2, ..., S_n be the sorted sequence of S, including min and max. If you choose S_i < V < S_{i+1}, then the sum sum of distances can be achieved with either V = S_i or V = S_{i+1}, depending on the number of points on the left and the right.
This observation yields an O(n^2) algorithm that just checks every potential candidate in S. It can be improved to O(n) by computing prefix sums upfront to compute the sum of distances in O(1) per element.
In general, since each element contributes two linear cost functions to the domain of possible values, this problem can be solved in O(log n) per query. You just need a data structure that can maintain a list of linear function segments and returns the point with maximum sum. A balanced binary search tree with some clever augmentation and lazy updates can solve this. Whether this is necessary or not of course depends on the number of elements and the number of queries you expect to perform.
I don't think there is a silver bullet solution to your problem, but this is how I would go about solving it generally. First, you need to define a function sumDistance() which takes in a new value V along with all the values in the current set, and outputs the sum of the distances between V and each value in the set.
Next, you can iterate over the domain d of sumDistance(), where Min <= d <= Max, and keep track of the sums for each value V in the domain. When you encounter a new largest sum, then record it. The V value which gave you the largest sum is the value you retain and add to your set.
This algorithm can be repeated for each new value you wish to add. Note that because this is essentially a one dimensional optimization problem, the running time should not be too bad so your first attempt might be good enough.
Assuming the distance d(a,b) = |a-b| then one of min and max will always yield a maximum.
Proof:
Let's assume you have V that is not at an end point. You then have n1 values that are lower and n2 values that are higher. The total distance at the minimum will be at least (n1 - n2) * (max - V) bigger and the total distance at the maximum will be at least (n2 - n1) * (V - min) bigger.
Since at least one of n1 - n2 and n2 - n1 must be non-negative, a maximum can always be found at one of the end points.
Related
I'm working on a problem that requires an array (dA[j], j=-N..N) to be calculated from the values of another array (A[i], i=-N..N) based on a conservation of momentum rule (x+y=z+j). This means that for a given index j for all the valid combinations of (x,y,z) I calculate A[x]A[y]A[z]. dA[j] is equal to the sum of these values.
I'm currently precomputing the valid indices for each dA[j] by looping x=-N...+N,y=-N...+N and calculating z=x+y-j and storing the indices if abs(z) <= N.
Is there a more efficient method of computing this?
The reason I ask is that in future I'd like to also be able to efficiently find for each dA[j] all the terms that have a specific A[i]. Essentially to be able to compute the Jacobian of dA[j] with respect to dA[i].
Update
For the sake of completeness I figured out a way of doing this without any if statements: if you parametrize the equation x+y=z+j given that j is a constant you get the equation for a plane. The constraint that x,y,z need to be integers between -N..N create boundaries on this plane. The points that define this boundary are functions of N and j. So all you have to do is loop over your parametrized variables (s,t) within these boundaries and you'll generate all the valid points by using the vectors defined by the plane (s*u + t*v + j*[0,0,1]).
For example, if you choose u=[1,0,-1] and v=[0,1,1] all the valid solutions for every value of j are bounded by a 6 sided polygon with points (-N,-N),(-N,-j),(j,N),(N,N),(N,-j), and (j,-N).
So for each j, you go through all (2N)^2 combinations to find the correct x's and y's such that x+y= z+j; the running time of your application (per j) is O(N^2). I don't think your current idea is bad (and after playing with some pseudocode for this, I couldn't improve it significantly). I would like to note that once you've picked a j and a z, there is at most 2N choices for x's and y's. So overall, the best algorithm would still complete in O(N^2).
But consider the following improvement by a factor of 2 (for the overall program, not per j): if z+j= x+y, then (-z)+(-j)= (-x)+(-y) also.
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Given a polygon with N vertexes and N edges. There is an int number(could be negative) on every vertex and an operation in set (*,+) on every edge. Every time, we remove an edge E from the polygon, merge the two vertexes linked by the edge (V1,V2) to a new vertex with value: V1 op(E) V2. The last case would be two vertexes with two edges, the result is the bigger one.
Return the max result value can be gotten from a given polygon.
For the last case we might not need two merge as the other number could be negative, so in that case we would just return the larger number.
How I am approaching the problem:
p[i,j] denotes the maximum value we can obtain by merging nodes from labelled i to j.
p[i,i] = v[i] -- base case
p[i,j] = p[i,k] operator in between p[k+1,j] , for k between i to j-1.
and then p[0,n] will be my answer.
Second point , i will have to start from all the vertices and do the same as above as this will be cyclic n vertices n edges.
The time complexity for this is n^3 *n i.e n^4 .
Can i do better then this ?
As you have identified (tagged) correctly, this indeed is very similar to the matrix multiplication problem (in what order do I multiply matrixes in order to do it quickly).
This can be solved polynomially using a dynamic algorithm.
I'm going to instead solve a similar, more classic (and identical) problem, given a formula with numbers, addition and multiplications, what way of parenthesizing it gives the maximal value, for example
6+1 * 2 becomes (6+1)*2 which is more than 6+(1*2).
Let us denote our input a1 to an real numbers and o(1),...o(n-1) either * or +. Our approach will work as follows, we will observe the subproblem F(i,j) which represents the maximal formula (after parenthasizing) for a1,...aj. We will create a table of such subproblems and observe that F(1,n) is exactly the result we were looking for.
Define
F(i,j)
- If i>j return 0 //no sub-formula of negative length
- If i=j return ai // the maximal formula for one number is the number
- If i<j return the maximal value for all m between i (including) and j (not included) of:
F(i,m) (o(m)) F(m+1,j) //check all places for possible parenthasis insertion
This goes through all possible options. TProof of correctness is done by induction on the size n=j-i and is pretty trivial.
Lets go through runtime analysis:
If we do not save the values dynamically for smaller subproblems this runs pretty slow, however we can make this algorithm perform relatively fast in O(n^3)
We create a n*n table T in which the cell at index i,j contains F(i,j) filling F(i,i) and F(i,j) for j smaller than i is done in O(1) for each cell since we can calculate these values directly, then we go diagonally and fill F(i+1,i+1) (which we can do quickly since we already know all the previous values in the recursive formula), we repeat this n times for n diagonals (all the diagonals in the table really) and filling each cell takes (O(n)), since each cell has O(n) cells we fill each diagonals in O(n^2) meaning we fill all the table in O(n^3). After filling the table we obviously know F(1,n) which is the solution to your problem.
Now back to your problem
If you translate the polygon into n different formulas (one for starting at each vertex) and run the algorithm for formula values on it, you get exactly the value you want.
I think you can reduce the need for a brute force search. For example: if there is a chain of
x + y + z
You can replace it with a single vertex whose value is the sum, you can't do better than that. You need to do the multiplying after the addition when you're dealing with +ve integers. So if it's all positive then simply reduce all + chains and then mutliply.
So that leaves the cases where there are -ve numbers. Seems to me that the strategy for a single -ve number is pretty obvious, for two -ve numbers there are a few cases (remembering that - x - is positive) and for more than 2 -ve numbers it seems to get tricky :-)
You have a set of n objects for which integer positions are given. A group of objects is a set of objects at the same position (not necessarily all the objects at that position: there might be multiple groups at a single position). The objects can be moved to the left or right, and the goal is to move these objects so as to form k groups, and to do so with the minimum distance moved.
For example:
With initial positions at [4,4,7], and k = 3: the minimum cost is 0.
[4,4,7] and k = 2: minimum cost is 0
[1,2,5,7] and k = 2: minimum cost is 1 + 2 = 3
I've been trying to use a greedy approach (by calculating which move would be shortest) but that wouldn't work because every move involves two elements which could be moved either way. I haven't been able to formulate a dynamic programming approach as yet but I'm working on it.
This problem is a one-dimensional instance of the k-medians problem, which can be stated as follows. Given a set of points x_1...x_n, partition these points into k sets S_1...S_k and choose k locations y_1...y_k in a way that minimizes the sum over all x_i of |x_i - y_f(i)|, where y_f(i) is the location corresponding of the set to which x_i is assigned.
Due to the fact that the median is the population minimizer for absolute distance (i.e. L_1 norm), it follows that each location y_j will be the median of the elements x in the corresponding set S_j (hence the name k-medians). Since you are looking at integer values, there is the technicality that if S_j contains an even number of elements, the median might not be an integer, but in such cases choosing either the next integer above or below the median will give the same sum of absolute distances.
The standard heuristic for solving k-medians (and the related and more common k-means problem) is iterative, but this is not guaranteed to produce an optimal or even good solution. Solving the k-medians problem for general metric spaces is NP-hard, and finding efficient approximations for k-medians is an open research problem. Googling "k-medians approximation", for example, will lead to a bunch of papers giving approximation schemes.
http://www.cis.upenn.edu/~sudipto/mypapers/kmedian_jcss.pdf
http://graphics.stanford.edu/courses/cs468-06-winter/Papers/arr-clustering.pdf
In one dimension things become easier, and you can use a dynamic programming approach. A DP solution to the related one-dimensional k-means problem is described in this paper, and the source code in R is available here. See the paper for details, but the idea is essentially the same as what #SajalJain proposed, and can easily be adapted to solve the k-medians problem rather than k-means. For j<=k and m<=n let D(j,m) denote the cost of an optimal j-medians solution to x_1...x_m, where the x_i are assumed to be in sorted order. We have the recurrence
D(j,m) = min (D(j-1,q) + Cost(x_{q+1},...,x_m)
where q ranges from j-1 to m-1 and Cost is equal to the sum of absolute distances from the median. With a naive O(n) implementation of Cost, this would yield an O(n^3k) DP solution to the whole problem. However, this can be improved to O(n^2k) due to the fact that the Cost can be updated in constant time rather than computed from scratch every time, using the fact that, for a sorted sequence:
Cost(x_1,...,x_h) = Cost(x_2,...,x_h) + median(x_1...x_h)-x_1 if h is odd
Cost(x_1,...,x_h) = Cost(x_2,...,x_h) + median(x_2...x_h)-x_1 if h is even
See the writeup for more details. Except for the fact that the update of the Cost function is different, the implementation will be the same for k-medians as for k-means.
http://journal.r-project.org/archive/2011-2/RJournal_2011-2_Wang+Song.pdf
as I understand, the problems is:
we have n points on a line.
we want to place k position on the line. I call them destinations.
move each of n points to one of the k destinations so the sum of distances is minimum. I call this sum, total cost.
destinations can overlap.
An obvious fact is that for each point we should look for the nearest destinations on the left and the nearest destinations on the right and choose the nearest.
Another important fact is all destinations should be on the points. because we can move them on the line to right or to left to reach a point without increasing total distance.
By these facts consider following DP solution:
DP[i][j] means the minimum total cost needed for the first i point, when we can use only j destinations, and have to put a destination on the i-th point.
to calculate DP[i][j] fix the destination before the i-th point (we have i choice), and for each choice (for example k-th point) calculate the distance needed for points between the i-th point and the new point added (k-th point). add this with DP[k][j - 1] and find the minimum for all k.
the calculation of initial states (e.g. j = 1) and final answer is left as an exercise!
Task 0 - sort the position of the objects in non-decreasing order
Let us define 'center' as the position of the object where it is shifted to.
Now we have two observations;
For N positions the 'center' would be the position which is nearest to the mean of these N positions. Example, let 1,3,6,10 be the positions. Then mean = 5. Nearest position is 6. Hence the center for these elements is 6. This gives us the position with minimum cost of moving when all elements need to be grouped into 1 group.
Let N positions be grouped into K groups "optimally". When N+1 th object is added, then it will disturb only the K th group, i.e, first K-1 groups will remain unchanged.
From these observations, we build a dynamic programming approach.
Let Cost[i][k] and Center[i][k] be two 2D arrays.
Cost[i][k] = minimum cost when first 'i' objects are partitioned into 'k' groups
Center[i][k] stores the center of the 'i-th' object when Cost[i][k] is computed.
Let {L} be the elements from i-L,i-L+1,..i-1 which have the same center.
(Center[i-L][k] = Center[i-L+1][k] = ... = Center[i-1][k]) These are the only objects that need to be considered in the computation for i-th element (from observation 2)
Now
Cost[i][k] will be
min(Cost[i-1][k-1] , Cost[i-L-1][k-1] + computecost(i-L, i-L+1, ... ,i))
Update Center[i-L ... i][k]
computecost() can be found trivially by finding the center (from observation 1)
Time Complexity:
Sorting O(NlogN)
Total Cost Computation Matrix = Total elements * Computecost = O(NK * N)
Total = O(NlogN + N*NK) = O(N*NK)
Let's look at k=1.
For k=1 and n odd, all points should move to the center point. For k=1 and n even, all points should move to either of the center points or any spot between them. By 'center' I mean in terms of number of points to either side, i.e. the median.
You can see this because if you select a target spot, x, with more points to its right than it's left, then a new target 1 to the right of x would result in a cost reduction (unless there is exactly one more point to the right than the left and the target spot is a point, in which case n is even and the target is on/between the two center points).
If your points are already sorted, this is an O(1) operation. If not, I believe it's O(n) (via an order statistic algorithm).
Once you've found the spot that all points are moving to, it's O(n) to find the cost.
Thus regardless of whether the points are sorted or not, this is O(n).
So, this is a common interview question. There's already a topic up, which I have read, but it's dead, and no answer was ever accepted. On top of that, my interests lie in a slightly more constrained form of the question, with a couple practical applications.
Given a two dimensional array such that:
Elements are unique.
Elements are sorted along the x-axis and the y-axis.
Neither sort predominates, so neither sort is a secondary sorting parameter.
As a result, the diagonal is also sorted.
All of the sorts can be thought of as moving in the same direction. That is to say that they are all ascending, or that they are all descending.
Technically, I think as long as you have a >/=/< comparator, any total ordering should work.
Elements are numeric types, with a single-cycle comparator.
Thus, memory operations are the dominating factor in a big-O analysis.
How do you find an element? Only worst case analysis matters.
Solutions I am aware of:
A variety of approaches that are:
O(nlog(n)), where you approach each row separately.
O(nlog(n)) with strong best and average performance.
One that is O(n+m):
Start in a non-extreme corner, which we will assume is the bottom right.
Let the target be J. Cur Pos is M.
If M is greater than J, move left.
If M is less than J, move up.
If you can do neither, you are done, and J is not present.
If M is equal to J, you are done.
Originally found elsewhere, most recently stolen from here.
And I believe I've seen one with a worst-case O(n+m) but a optimal case of nearly O(log(n)).
What I am curious about:
Right now, I have proved to my satisfaction that naive partitioning attack always devolves to nlog(n). Partitioning attacks in general appear to have a optimal worst-case of O(n+m), and most do not terminate early in cases of absence. I was also wondering, as a result, if an interpolation probe might not be better than a binary probe, and thus it occurred to me that one might think of this as a set intersection problem with a weak interaction between sets. My mind cast immediately towards Baeza-Yates intersection, but I haven't had time to draft an adaptation of that approach. However, given my suspicions that optimality of a O(N+M) worst case is provable, I thought I'd just go ahead and ask here, to see if anyone could bash together a counter-argument, or pull together a recurrence relation for interpolation search.
Here's a proof that it has to be at least Omega(min(n,m)). Let n >= m. Then consider the matrix which has all 0s at (i,j) where i+j < m, all 2s where i+j >= m, except for a single (i,j) with i+j = m which has a 1. This is a valid input matrix, and there are m possible placements for the 1. No query into the array (other than the actual location of the 1) can distinguish among those m possible placements. So you'll have to check all m locations in the worst case, and at least m/2 expected locations for any randomized algorithm.
One of your assumptions was that matrix elements have to be unique, and I didn't do that. It is easy to fix, however, because you just pick a big number X=n*m, replace all 0s with unique numbers less than X, all 2s with unique numbers greater than X, and 1 with X.
And because it is also Omega(lg n) (counting argument), it is Omega(m + lg n) where n>=m.
An optimal O(m+n) solution is to start at the top-left corner, that has minimal value. Move diagonally downwards to the right until you hit an element whose value >= value of the given element. If the element's value is equal to that of the given element, return found as true.
Otherwise, from here we can proceed in two ways.
Strategy 1:
Move up in the column and search for the given element until we reach the end. If found, return found as true
Move left in the row and search for the given element until we reach the end. If found, return found as true
return found as false
Strategy 2:
Let i denote the row index and j denote the column index of the diagonal element we have stopped at. (Here, we have i = j, BTW). Let k = 1.
Repeat the below steps until i-k >= 0
Search if a[i-k][j] is equal to the given element. if yes, return found as true.
Search if a[i][j-k] is equal to the given element. if yes, return found as true.
Increment k
1 2 4 5 6
2 3 5 7 8
4 6 8 9 10
5 8 9 10 11
Is there a way to generate all of the subset sums s1, s2, ..., sk that fall in a range [A,B] faster than O((k+N)*2N/2), where k is the number of sums there are in [A,B]? Note that k is only known after we have enumerated all subset sums within [A,B].
I'm currently using a modified Horowitz-Sahni algorithm. For example, I first call it to for the smallest sum greater than or equal to A, giving me s1. Then I call it again for the next smallest sum greater than s1, giving me s2. Repeat this until we find a sum sk+1 greater than B. There is a lot of computation repeated between each iteration, even without rebuilding the initial two 2N/2 lists, so is there a way to do better?
In my problem, N is about 15, and the magnitude of the numbers is on the order of millions, so I haven't considered the dynamic programming route.
Check the subset sum on Wikipedia. As far as I know, it's the fastest known algorithm, which operates in O(2^(N/2)) time.
Edit:
If you're looking for multiple possible sums, instead of just 0, you can save the end arrays and just iterate through them again (which is roughly an O(2^(n/2) operation) and save re-computing them. The value of all the possible subsets is doesn't change with the target.
Edit again:
I'm not wholly sure what you want. Are we running K searches for one independent value each, or looking for any subset that has a value in a specific range that is K wide? Or are you trying to approximate the second by using the first?
Edit in response:
Yes, you do get a lot of duplicate work even without rebuilding the list. But if you don't rebuild the list, that's not O(k * N * 2^(N/2)). Building the list is O(N * 2^(N/2)).
If you know A and B right now, you could begin iteration, and then simply not stop when you find the right answer (the bottom bound), but keep going until it goes out of range. That should be roughly the same as solving subset sum for just one solution, involving only +k more ops, and when you're done, you can ditch the list.
More edit:
You have a range of sums, from A to B. First, you solve subset sum problem for A. Then, you just keep iterating and storing the results, until you find the solution for B, at which point you stop. Now you have every sum between A and B in a single run, and it will only cost you one subset sum problem solve plus K operations for K values in the range A to B, which is linear and nice and fast.
s = *i + *j; if s > B then ++i; else if s < A then ++j; else { print s; ... what_goes_here? ... }
No, no, no. I get the source of your confusion now (I misread something), but it's still not as complex as what you had originally. If you want to find ALL combinations within the range, instead of one, you will just have to iterate over all combinations of both lists, which isn't too bad.
Excuse my use of auto. C++0x compiler.
std::vector<int> sums;
std::vector<int> firstlist;
std::vector<int> secondlist;
// Fill in first/secondlist.
std::sort(firstlist.begin(), firstlist.end());
std::sort(secondlist.begin(), secondlist.end());
auto firstit = firstlist.begin();
auto secondit = secondlist.begin();
// Since we want all in a range, rather than just the first, we need to check all combinations. Horowitz/Sahni is only designed to find one.
for(; firstit != firstlist.end(); firstit++) {
for(; secondit = secondlist.end(); secondit++) {
int sum = *firstit + *secondit;
if (sum > A && sum < B)
sums.push_back(sum);
}
}
It's still not great. But it could be optimized if you know in advance that N is very large, for example, mapping or hashmapping sums to iterators, so that any given firstit can find any suitable partners in secondit, reducing the running time.
It is possible to do this in O(N*2^(N/2)), using ideas similar to Horowitz Sahni, but we try and do some optimizations to reduce the constants in the BigOh.
We do the following
Step 1: Split into sets of N/2, and generate all possible 2^(N/2) sets for each split. Call them S1 and S2. This we can do in O(2^(N/2)) (note: the N factor is missing here, due to an optimization we can do).
Step 2: Next sort the larger of S1 and S2 (say S1) in O(N*2^(N/2)) time (we optimize here by not sorting both).
Step 3: Find Subset sums in range [A,B] in S1 using binary search (as it is sorted).
Step 4: Next, for each sum in S2, find using binary search the sets in S1 whose union with this gives sum in range [A,B]. This is O(N*2^(N/2)). At the same time, find if that corresponding set in S2 is in the range [A,B]. The optimization here is to combine loops. Note: This gives you a representation of the sets (in terms of two indexes in S2), not the sets themselves. If you want all the sets, this becomes O(K + N*2^(N/2)), where K is the number of sets.
Further optimizations might be possible, for instance when sum from S2, is negative, we don't consider sums < A etc.
Since Steps 2,3,4 should be pretty clear, I will elaborate further on how to get Step 1 done in O(2^(N/2)) time.
For this, we use the concept of Gray Codes. Gray codes are a sequence of binary bit patterns in which each pattern differs from the previous pattern in exactly one bit.
Example: 00 -> 01 -> 11 -> 10 is a gray code with 2 bits.
There are gray codes which go through all possible N/2 bit numbers and these can be generated iteratively (see the wiki page I linked to), in O(1) time for each step (total O(2^(N/2)) steps), given the previous bit pattern, i.e. given current bit pattern, we can generate the next bit pattern in O(1) time.
This enables us to form all the subset sums, by using the previous sum and changing that by just adding or subtracting one number (corresponding to the differing bit position) to get the next sum.
If you modify the Horowitz-Sahni algorithm in the right way, then it's hardly slower than original Horowitz-Sahni. Recall that Horowitz-Sahni works two lists of subset sums: Sums of subsets in the left half of the original list, and sums of subsets in the right half. Call these two lists of sums L and R. To obtain subsets that sum to some fixed value A, you can sort R, and then look up a number in R that matches each number in L using a binary search. However, the algorithm is asymmetric only to save a constant factor in space and time. It's a good idea for this problem to sort both L and R.
In my code below I also reverse L. Then you can keep two pointers into R, updated for each entry in L: A pointer to the last entry in R that's too low, and a pointer to the first entry in R that's too high. When you advance to the next entry in L, each pointer might either move forward or stay put, but they won't have to move backwards. Thus, the second stage of the Horowitz-Sahni algorithm only takes linear time in the data generated in the first stage, plus linear time in the length of the output. Up to a constant factor, you can't do better than that (once you have committed to this meet-in-the-middle algorithm).
Here is a Python code with example input:
# Input
terms = [29371, 108810, 124019, 267363, 298330, 368607,
438140, 453243, 515250, 575143, 695146, 840979, 868052, 999760]
(A,B) = (500000,600000)
# Subset iterator stolen from Sage
def subsets(X):
yield []; pairs = []
for x in X:
pairs.append((2**len(pairs),x))
for w in xrange(2**(len(pairs)-1), 2**(len(pairs))):
yield [x for m, x in pairs if m & w]
# Modified Horowitz-Sahni with toolow and toohigh indices
L = sorted([(sum(S),S) for S in subsets(terms[:len(terms)/2])])
R = sorted([(sum(S),S) for S in subsets(terms[len(terms)/2:])])
(toolow,toohigh) = (-1,0)
for (Lsum,S) in reversed(L):
while R[toolow+1][0] < A-Lsum and toolow < len(R)-1: toolow += 1
while R[toohigh][0] <= B-Lsum and toohigh < len(R): toohigh += 1
for n in xrange(toolow+1,toohigh):
print '+'.join(map(str,S+R[n][1])),'=',sum(S+R[n][1])
"Moron" (I think he should change his user name) raises the reasonable issue of optimizing the algorithm a little further by skipping one of the sorts. Actually, because each list L and R is a list of sizes of subsets, you can do a combined generate and sort of each one in linear time! (That is, linear in the lengths of the lists.) L is the union of two lists of sums, those that include the first term, term[0], and those that don't. So actually you should just make one of these halves in sorted form, add a constant, and then do a merge of the two sorted lists. If you apply this idea recursively, you save a logarithmic factor in the time to make a sorted L, i.e., a factor of N in the original variable of the problem. This gives a good reason to sort both lists as you generate them. If you only sort one list, you have some binary searches that could reintroduce that factor of N; at best you have to optimize them somehow.
At first glance, a factor of O(N) could still be there for a different reason: If you want not just the subset sum, but the subset that makes the sum, then it looks like O(N) time and space to store each subset in L and in R. However, there is a data-sharing trick that also gets rid of that factor of O(N). The first step of the trick is to store each subset of the left or right half as a linked list of bits (1 if a term is included, 0 if it is not included). Then, when the list L is doubled in size as in the previous paragraph, the two linked lists for a subset and its partner can be shared, except at the head:
0
|
v
1 -> 1 -> 0 -> ...
Actually, this linked list trick is an artifact of the cost model and never truly helpful. Because, in order to have pointers in a RAM architecture with O(1) cost, you have to define data words with O(log(memory)) bits. But if you have data words of this size, you might as well store each word as a single bit vector rather than with this pointer structure. I.e., if you need less than a gigaword of memory, then you can store each subset in a 32-bit word. If you need more than a gigaword, then you have a 64-bit architecture or an emulation of it (or maybe 48 bits), and you can still store each subset in one word. If you patch the RAM cost model to take account of word size, then this factor of N was never really there anyway.
So, interestingly, the time complexity for the original Horowitz-Sahni algorithm isn't O(N*2^(N/2)), it's O(2^(N/2)). Likewise the time complexity for this problem is O(K+2^(N/2)), where K is the length of the output.