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Consider a binary sequence b of length N. Initially, all the bits are set to 0. We define a flip operation with 2 arguments, flip(L,R), such that:
All bits with indices between L and R are "flipped", meaning a bit with value 1 becomes a bit with value 0 and vice-versa. More exactly, for all i in range [L,R]: b[i] = !b[i].
Nothing happens to bits outside the specified range.
You are asked to determine the number of possible different sequences that can be obtained using exactly K flip operations modulo an arbitrary given number, let's call it MOD.
More specifically, each test contains on the first line a number T, the number of queries to be given. Then there are T queries, each one being of the form N, K, MOD with the meaning from above.
1 ≤ N, K ≤ 300 000
T ≤ 250
2 ≤ MOD ≤ 1 000 000 007
Sum of all N-s in a test is ≤ 600 000
time limit: 2 seconds
memory limit: 65536 kbytes
Example :
Input :
1
2 1 1000
Output :
3
Explanation :
There is a single query. The initial sequence is 00. We can do the following operations :
flip(1,1) ⇒ 10
flip(2,2) ⇒ 01
flip(1,2) ⇒ 11
So there are 3 possible sequences that can be generated using exactly 1 flip.
Some quick observations that I've made, although I'm not sure they are totally correct :
If K is big enough, that is if we have a big enough number of flips at our disposal, we should be able to obtain 2n sequences.
If K=1, then the result we're looking for is N(N+1)/2. It's also C(n,1)+C(n,2), where C is the binomial coefficient.
Currently trying a brute force approach to see if I can spot a rule of some kind. I think this is a sum of some binomial coefficients, but I'm not sure.
I've also come across a somewhat simpler variant of this problem, where the flip operation only flips a single specified bit. In that case, the result is
C(n,k)+C(n,k-2)+C(n,k-4)+...+C(n,(1 or 0)). Of course, there's the special case where k > n, but it's not a huge difference. Anyway, it's pretty easy to understand why that happens.I guess it's worth noting.
Here are a few ideas:
We may assume that no flip operation occurs twice (otherwise, we can assume that it did not happen). It does affect the number of operations, but I'll talk about it later.
We may assume that no two segments intersect. Indeed, if L1 < L2 < R1 < R2, we can just do the (L1, L2 - 1) and (R1 + 1, R2) flips instead. The case when one segment is inside the other is handled similarly.
We may also assume that no two segments touch each other. Otherwise, we can glue them together and reduce the number of operations.
These observations give the following formula for the number of different sequences one can obtain by flipping exactly k segments without "redundant" flips: C(n + 1, 2 * k) (we choose 2 * k ends of segments. They are always different. The left end is exclusive).
If we had perform no more than K flips, the answer would be sum for k = 0...K of C(n + 1, 2 * k)
Intuitively, it seems that its possible to transform the sequence of no more than K flips into a sequence of exactly K flips (for instance, we can flip the same segment two more times and add 2 operations. We can also split a segment of more than two elements into two segments and add one operation).
By running the brute force search (I know that it's not a real proof, but looks correct combined with the observations mentioned above) that the answer this sum minus 1 if n or k is equal to 1 and exactly the sum otherwise.
That is, the result is C(n + 1, 0) + C(n + 1, 2) + ... + C(n + 1, 2 * K) - d, where d = 1 if n = 1 or k = 1 and 0 otherwise.
Here is code I used to look for patterns running a brute force search and to verify that the formula is correct for small n and k:
reachable = set()
was = set()
def other(c):
"""
returns '1' if c == '0' and '0' otherwise
"""
return '0' if c == '1' else '1'
def flipped(s, l, r):
"""
Flips the [l, r] segment of the string s and returns the result
"""
res = s[:l]
for i in range(l, r + 1):
res += other(s[i])
res += s[r + 1:]
return res
def go(xs, k):
"""
Exhaustive search. was is used to speed up the search to avoid checking the
same string with the same number of remaining operations twice.
"""
p = (xs, k)
if p in was:
return
was.add(p)
if k == 0:
reachable.add(xs)
return
for l in range(len(xs)):
for r in range(l, len(xs)):
go(flipped(xs, l, r), k - 1)
def calc_naive(n, k):
"""
Counts the number of reachable sequences by running an exhaustive search
"""
xs = '0' * n
global reachable
global was
was = set()
reachable = set()
go(xs, k)
return len(reachable)
def fact(n):
return 1 if n == 0 else n * fact(n - 1)
def cnk(n, k):
if k > n:
return 0
return fact(n) // fact(k) // fact(n - k)
def solve(n, k):
"""
Uses the formula shown above to compute the answer
"""
res = 0
for i in range(k + 1):
res += cnk(n + 1, 2 * i)
if k == 1 or n == 1:
res -= 1
return res
if __name__ == '__main__':
# Checks that the formula gives the right answer for small values of n and k
for n in range(1, 11):
for k in range(1, 11):
assert calc_naive(n, k) == solve(n, k)
This solution is much better than the exhaustive search. For instance, it can run in O(N * K) time per test case if we compute the coefficients using Pascal's triangle. Unfortunately, it is not fast enough. I know how to solve it more efficiently for prime MOD (using Lucas' theorem), but O do not have a solution in general case.
Multiplicative modular inverses can't solve this problem immediately as k! or (n - k)! may not have an inverse modulo MOD.
Note: I assumed that C(n, m) is defined for all non-negative n and m and is equal to 0 if n < m.
I think I know how to solve it for an arbitrary MOD now.
Let's factorize the MOD into prime factors p1^a1 * p2^a2 * ... * pn^an. Now can solve this problem for each prime factor independently and combine the result using the Chinese remainder theorem.
Let's fix a prime p. Let's assume that p^a|MOD (that is, we need to get the result modulo p^a). We can precompute all p-free parts of the factorial and the maximum power of p that divides the factorial for all 0 <= n <= N in linear time using something like this:
powers = [0] * (N + 1)
p_free = [i for i in range(N + 1)]
p_free[0] = 1
for cur_p in powers of p <= N:
i = cur_p
while i < N:
powers[i] += 1
p_free[i] /= p
i += cur_p
Now the p-free part of the factorial is the product of p_free[i] for all i <= n and the power of p that divides n! is the prefix sum of the powers.
Now we can divide two factorials: the p-free part is coprime with p^a so it always has an inverse. The powers of p are just subtracted.
We're almost there. One more observation: we can precompute the inverses of p-free parts in linear time. Let's compute the inverse for the p-free part of N! using Euclid's algorithm. Now we can iterate over all i from N to 0. The inverse of the p-free part of i! is the inverse for i + 1 times p_free[i] (it's easy to prove it if we rewrite the inverse of the p-free part as a product using the fact that elements coprime with p^a form an abelian group under multiplication).
This algorithm runs in O(N * number_of_prime_factors + the time to solve the system using the Chinese remainder theorem + sqrt(MOD)) time per test case. Now it looks good enough.
You're on a good path with binomial-coefficients already. There are several factors to consider:
Think of your number as a binary-string of length n. Now we can create another array counting the number of times a bit will be flipped:
[0, 1, 0, 0, 1] number
[a, b, c, d, e] number of flips.
But even numbers of flips all lead to the same result and so do all odd numbers of flips. So basically the relevant part of the distribution can be represented %2
Logical next question: How many different combinations of even and odd values are available. We'll take care of the ordering later on, for now just assume the flipping-array is ordered descending for simplicity. We start of with k as the only flipping-number in the array. Now we want to add a flip. Since the whole flipping-array is used %2, we need to remove two from the value of k to achieve this and insert them into the array separately. E.g.:
[5, 0, 0, 0] mod 2 [1, 0, 0, 0]
[3, 1, 1, 0] [1, 1, 1, 0]
[4, 1, 0, 0] [0, 1, 0, 0]
As the last example shows (remember we're operating modulo 2 in the final result), moving a single 1 doesn't change the number of flips in the final outcome. Thus we always have to flip an even number bits in the flipping-array. If k is even, so will the number of flipped bits be and same applies vice versa, no matter what the value of n is.
So now the question is of course how many different ways of filling the array are available? For simplicity we'll start with mod 2 right away.
Obviously we start with 1 flipped bit, if k is odd, otherwise with 1. And we always add 2 flipped bits. We can continue with this until we either have flipped all n bits (or at least as many as we can flip)
v = (k % 2 == n % 2) ? n : n - 1
or we can't spread k further over the array.
v = k
Putting this together:
noOfAvailableFlips:
if k < n:
return k
else:
return (k % 2 == n % 2) ? n : n - 1
So far so well, there are always v / 2 flipping-arrays (mod 2) that differ by the number of flipped bits. Now we come to the next part permuting these arrays. This is just a simple permutation-function (permutation with repetition to be precise):
flipArrayNo(flippedbits):
return factorial(n) / (factorial(flippedbits) * factorial(n - flippedbits)
Putting it all together:
solutionsByFlipping(n, k):
res = 0
for i in [k % 2, noOfAvailableFlips(), step=2]:
res += flipArrayNo(i)
return res
This also shows that for sufficiently large numbers we can't obtain 2^n sequences for the simply reason that we can not arrange operations as we please. The number of flips that actually affect the outcome will always be either even or odd depending upon k. There's no way around this. The best result one can get is 2^(n-1) sequences.
For completeness, here's a dynamic program. It can deal easily with arbitrary modulo since it is based on sums, but unfortunately I haven't found a way to speed it beyond O(n * k).
Let a[n][k] be the number of binary strings of length n with k non-adjacent blocks of contiguous 1s that end in 1. Let b[n][k] be the number of binary strings of length n with k non-adjacent blocks of contiguous 1s that end in 0.
Then:
# we can append 1 to any arrangement of k non-adjacent blocks of contiguous 1's
# that ends in 1, or to any arrangement of (k-1) non-adjacent blocks of contiguous
# 1's that ends in 0:
a[n][k] = a[n - 1][k] + b[n - 1][k - 1]
# we can append 0 to any arrangement of k non-adjacent blocks of contiguous 1's
# that ends in either 0 or 1:
b[n][k] = b[n - 1][k] + a[n - 1][k]
# complete answer would be sum (a[n][i] + b[n][i]) for i = 0 to k
I wonder if the following observations might be useful: (1) a[n][k] and b[n][k] are zero when n < 2*k - 1, and (2) on the flip side, for values of k greater than ⌊(n + 1) / 2⌋ the overall answer seems to be identical.
Python code (full matrices are defined for simplicity, but I think only one row of each would actually be needed, space-wise, for a bottom-up method):
a = [[0] * 11 for i in range(0,11)]
b = [([1] + [0] * 10) for i in range(0,11)]
def f(n,k):
return fa(n,k) + fb(n,k)
def fa(n,k):
global a
if a[n][k] or n == 0 or k == 0:
return a[n][k]
elif n == 2*k - 1:
a[n][k] = 1
return 1
else:
a[n][k] = fb(n-1,k-1) + fa(n-1,k)
return a[n][k]
def fb(n,k):
global b
if b[n][k] or n == 0 or n == 2*k - 1:
return b[n][k]
else:
b[n][k] = fb(n-1,k) + fa(n-1,k)
return b[n][k]
def g(n,k):
return sum([f(n,i) for i in range(0,k+1)])
# example
print(g(10,10))
for i in range(0,11):
print(a[i])
print()
for i in range(0,11):
print(b[i])
You are given N total number of item, P group in which you have to divide the N items.
Condition is the product of number of item held by each group should be max.
example N=10 and P=3 you can divide the 10 item in {3,4,3} since 3x3x4=36 max possible product.
You will want to form P groups of roughly N / P elements. However, this will not always be possible, as N might not be divisible by P, as is the case for your example.
So form groups of floor(N / P) elements initially. For your example, you'd form:
floor(10 / 3) = 3
=> groups = {3, 3, 3}
Now, take the remainder of the division of N by P:
10 mod 3 = 1
This means you have to distribute 1 more item to your groups (you can have up to P - 1 items left to distribute in general):
for i = 0 up to (N mod P) - 1:
groups[i]++
=> groups = {4, 3, 3} for your example
Which is also a valid solution.
For fun I worked out a proof of the fact that it in an optimal solution either all numbers = N/P or the numbers are some combination of floor(N/P) and ceiling(N/P). The proof is somewhat long, but proving optimality in a discrete context is seldom trivial. I would be interested if anybody can shorten the proof.
Lemma: For P = 2 the optimal way to divide N is into {N/2, N/2} if N is even and {floor(N/2), ceiling(N/2)} if N is odd.
This follows since the constraint that the two numbers sum to N means that the two numbers are of the form x, N-x.
The resulting product is (N-x)x = Nx - x^2. This is a parabola that opens down. Its max is at its vertex at x = N/2. If N is even this max is an integer. If N is odd, then x = N/2 is a fraction, but such parabolas are strictly unimodal, so the closer x gets to N/2 the larger the product. x = floor(N/2) (or ceiling, it doesn't matter by symmetry) is the closest an integer can get to N/2, hence {floor(N/2),ceiling(N/2)} is optimal for integers.
General case: First of all, a global max exists since there are only finitely many integer partitions and a finite list of numbers always has a max. Suppose that {x_1, x_2, ..., x_P} is globally optimal. Claim: given and i,j we have
|x_i - x_ j| <= 1
In other words: any two numbers in an optimal solution differ by at most 1. This follows immediately from the P = 2 lemma (applied to N = x_i + x_ j).
From this claim it follows that there are at most two distinct numbers among the x_i. If there is only 1 number, that number is clearly N/P. If there are two numbers, they are of the form a and a+1. Let k = the number of x_i which equal a+1, hence P-k of the x_i = a. Hence
(P-k)a + k(a+1) = N, where k is an integer with 1 <= k < P
But simple algebra yields that a = (N-k)/P = N/P - k/P.
Hence -- a is an integer < N/P which differs from N/P by less than 1 (k/P < 1)
Thus a = floor(N/P) and a+1 = ceiling(N/P).
QED
I'm looking to construct an algorithm which gives the arrangements with repetition of n sequences of a given step S (which can be a positive real number), under the constraint that the sum of all combinations is k, with k a positive integer.
My problem is thus to find the solutions to the equation:
x 1 + x 2 + ⋯ + x n = k
where
0 ≤ x i ≤ b i
and S (the step) a real number with finite decimal.
For instance, if 0≤xi≤50, and S=2.5 then xi = {0, 2.5 , 5,..., 47.5, 50}.
The point here is to look only through the combinations having a sum=k because if n is big it is not possible to generate all the arrangements, so I would like to bypass this to generate only the combinations that match the constraint.
I was thinking to start with n=2 for instance, and find all linear combinations that match the constraint.
ex: if xi = {0, 2.5 , 5,..., 47.5, 50} and k=100, then we only have one combination={50,50}
For n=3, we have the combination for n=2 times 3, i.e. {50,50,0},{50,0,50} and {0,50,50} plus the combinations {50,47.5,2.5} * 3! etc...
If xi = {0, 2.5 , 5,..., 37.5, 40} and k=100, then we have 0 combinations for n=2 because 2*40<100, and we have {40,40,20} times 3 for n=3... (if I'm not mistaken)
I'm a bit lost as I can't seem to find a proper way to start the algorithm, knowing that I should have the step S and b as inputs.
Do you have any suggestions?
Thanks
You can transform your problem into an integer problem by dividing everything by S: We want to find all integer sequences y1, ..., yn with:
(1) 0 ≤ yi ≤ ⌊b / S⌋
(2) y1 + ... + yn = k / S
We can see that there is no solution if k is not a multiple of S. Once we have reduced the problem, I would suggest using a pseudopolynomial dynamic programming algorithm to solve the subset sum problem and then reconstruct the solution from it. Let f(i, j) be the number of ways to make sum j with i elements. We have the following recurrence:
f(0,0) = 1
f(0,j) = 0 forall j > 0
f(i,j) = sum_{m = 0}^{min(floor(b / S), j)} f(i - 1, j - m)
We can solve f in O(n * k / S) time by filling it row by row. Now we want to reconstruct the solution. I'm using Python-style pseudocode to illustrate the concept:
def reconstruct(i, j):
if f(i,j) == 0:
return
if i == 0:
yield []
return
for m := 0 to min(floor(b / S), j):
for rest in reconstruct(i - 1, j - m):
yield [m] + rest
result = reconstruct(n, k / S)
result will be a list of all possible combinations.
What you are describing sounds like a special case of the subset sum problem. Once you put it in those terms, you'll find that Pisinger apparently has a linear time algorithm for solving a more general version of your problem, since your weights are bounded. If you're interested in designing your own algorithm, you might start by reading Pisinger's thesis to get some ideas.
Since you are looking for all possible solutions and not just a single solution, the dynamic programming approach is probably your best bet.
The question is Number of solutions to a1 x1+a2 x2+....+an xn=k with constraints: 1)ai>0 and ai<=15 2)n>0 and n<=15 3)xi>=0 I was able to formulate a Dynamic programming solution but it is running too long for n>10^10. Please guide me to get a more efficient soution.
The code
int dp[]=new int[16];
dp[0]=1;
BigInteger seen=new BigInteger("0");
while(true)
{
for(int i=0;i<arr[0];i++)
{
if(dp[0]==0)
break;
dp[arr[i+1]]=(dp[arr[i+1]]+dp[0])%1000000007;
}
for(int i=1;i<15;i++)
dp[i-1]=dp[i];
seen=seen.add(new BigInteger("1"));
if(seen.compareTo(n)==0)
break;
}
System.out.println(dp[0]);
arr is the array containing coefficients and answer should be mod 1000000007 as the number of ways donot fit into an int.
Update for real problem:
The actual problem is much simpler. However, it's hard to be helpful without spoiling it entirely.
Stripping it down to the bare essentials, the problem is
Given k distinct positive integers L1, ... , Lk and a nonnegative integer n, how many different finite sequences (a1, ..., ar) are there such that 1. for all i (1 <= i <= r), ai is one of the Lj, and 2. a1 + ... + ar = n. (In other words, the number of compositions of n using only the given Lj.)
For convenience, you are also told that all the Lj are <= 15 (and hence k <= 15), and n <= 10^18. And, so that the entire computation can be carried out using 64-bit integers (the number of sequences grows exponentially with n, you wouldn't have enough memory to store the exact number for large n), you should only calculate the remainder of the sequence count modulo 1000000007.
To solve such a problem, start by looking at the simplest cases first. The very simplest cases are when only one L is given, then evidently there is one admissible sequence if n is a multiple of L and no admissible sequence if n mod L != 0. That doesn't help yet. So consider the next simplest cases, two L values given. Suppose those are 1 and 2.
0 has one composition, the empty sequence: N(0) = 1
1 has one composition, (1): N(1) = 1
2 has two compositions, (1,1); (2): N(2) = 2
3 has three compositions, (1,1,1);(1,2);(2,1): N(3) = 3
4 has five compositions, (1,1,1,1);(1,1,2);(1,2,1);(2,1,1);(2,2): N(4) = 5
5 has eight compositions, (1,1,1,1,1);(1,1,1,2);(1,1,2,1);(1,2,1,1);(2,1,1,1);(1,2,2);(2,1,2);(2,2,1): N(5) = 8
You may see it now, or need a few more terms, but you'll notice that you get the Fibonacci sequence (shifted by one), N(n) = F(n+1), thus the sequence N(n) satisfies the recurrence relation
N(n) = N(n-1) + N(n-2) (for n >= 2; we have not yet proved that, so far it's a hypothesis based on pattern-spotting). Now, can we see that without calculating many values? Of course, there are two types of admissible sequences, those ending with 1 and those ending with 2. Since that partitioning of the admissible sequences restricts only the last element, the number of ad. seq. summing to n and ending with 1 is N(n-1) and the number of ad. seq. summing to n and ending with 2 is N(n-2).
That reasoning immediately generalises, given L1 < L2 < ... < Lk, for all n >= Lk, we have
N(n) = N(n-L1) + N(n-L2) + ... + N(n-Lk)
with the obvious interpretation if we're only interested in N(n) % m.
Umm, that linear recurrence still leaves calculating N(n) as an O(n) task?
Yes, but researching a few of the mentioned keywords quickly leads to an algorithm needing only O(log n) steps ;)
Algorithm for misinterpreted problem, no longer relevant, but may still be interesting:
The question looks a little SPOJish, so I won't give a complete algorithm (at least, not before I've googled around a bit to check if it's a contest question). I hope no restriction has been omitted in the description, such as that permutations of such representations should only contribute one to the count, that would considerably complicate the matter. So I count 1*3 + 2*4 = 11 and 2*4 + 1*3 = 11 as two different solutions.
Some notations first. For m-tuples of numbers, let < | > denote the canonical bilinear pairing, i.e.
<a|x> = a_1*x_1 + ... + a_m*x_m. For a positive integer B, let A_B = {1, 2, ..., B} be the set of positive integers not exceeding B. Let N denote the set of natural numbers, i.e. of nonnegative integers.
For 0 <= m, k and B > 0, let C(B,m,k) = card { (a,x) \in A_B^m × N^m : <a|x> = k }.
Your problem is then to find \sum_{m = 1}^15 C(15,m,k) (modulo 1000000007).
For completeness, let us mention that C(B,0,k) = if k == 0 then 1 else 0, which can be helpful in theoretical considerations. For the case of a positive number of summands, we easily find the recursion formula
C(B,m+1,k) = \sum_{j = 0}^k C(B,1,j) * C(B,m,k-j)
By induction, C(B,m,_) is the convolution¹ of m factors C(B,1,_). Calculating the convolution of two known functions up to k is O(k^2), so if C(B,1,_) is known, that gives an O(n*k^2) algorithm to compute C(B,m,k), 1 <= m <= n. Okay for small k, but our galaxy won't live to see you calculating C(15,15,10^18) that way. So, can we do better? Well, if you're familiar with the Laplace-transformation, you'll know that an analogous transformation will convert the convolution product to a pointwise product, which is much easier to calculate. However, although the transformation is in this case easy to compute, the inverse is not. Any other idea? Why, yes, let's take a closer look at C(B,1,_).
C(B,1,k) = card { a \in A_B : (k/a) is an integer }
In other words, C(B,1,k) is the number of divisors of k not exceeding B. Let us denote that by d_B(k). It is immediately clear that 1 <= d_B(k) <= B. For B = 2, evidently d_2(k) = 1 if k is odd, 2 if k is even. d_3(k) = 3 if and only if k is divisible by 2 and by 3, hence iff k is a multiple of 6, d_3(k) = 2 if and only if one of 2, 3 divides k but not the other, that is, iff k % 6 \in {2,3,4} and finally, d_3(k) = 1 iff neither 2 nor 3 divides k, i.e. iff gcd(k,6) = 1, iff k % 6 \in {1,5}. So we've seen that d_2 is periodic with period 2, d_3 is periodic with period 6. Generally, like reasoning shows that d_B is periodic for all B, and the minimal positive period divides B!.
Given any positive period P of C(B,1,_) = d_B, we can split the sum in the convolution (k = q*P+r, 0 <= r < P):
C(B,m+1, q*P+r) = \sum_{c = 0}^{q-1} (\sum_{j = 0}^{P-1} d_B(j)*C(B,m,(q-c)*P + (r-j)))
+ \sum_{j = 0}^r d_B(j)*C(B,m,r-j)
The functions C(B,m,_) are no longer periodic for m >= 2, but there are simple formulae to obtain C(B,m,q*P+r) from C(B,m,r). Thus, with C(B,1,_) = d_B and C(B,m,_) known up to P, calculating C(B,m+1,_) up to P is an O(P^2) task², getting the data necessary for calculating C(B,m+1,k) for arbitrarily large k, needs m such convolutions, hence that's O(m*P^2).
Then finding C(B,m,k) for 1 <= m <= n and arbitrarily large k is O(n^2*P^2), in time and O(n^2*P) in space.
For B = 15, we have 15! = 1.307674368 * 10^12, so using that for P isn't feasible. Fortunately, the smallest positive period of d_15 is much smaller, so you get something workable. From a rough estimate, I would still expect the calculation of C(15,15,k) to take time more appropriately measured in hours than seconds, but it's an improvement over O(k) which would take years (for k in the region of 10^18).
¹ The convolution used here is (f \ast g)(k) = \sum_{j = 0}^k f(j)*g(k-j).
² Assuming all arithmetic operations are O(1); if, as in the OP, only the residue modulo some M > 0 is desired, that holds if all intermediate calculations are done modulo M.
I was wondering how to solve such a problem using DP.
Given n balls and m bins, each bin having max. capacity c1, c2,...cm. What is the total number of ways of distributing these n balls into these m bins.
The problem I face is
How to find a recurrence relation (I could when the capacities were all a single constant c).
There will be several test cases, each having its own set of c1,c2....cm. So how would the DP actually apply for all these test cases because the answer explicitly depends on present c1,c2....cm, and I can't store (or pre-compute) the answer for all combinations of c1,c2....cm.
Also, I could not come up with any direct combinatoric formula for this problem too, and I don't think one exists too.
You can define your function assuming the limits c[0], c[1], ... c[m-1] as fixed and then writing the recursive formula that returns the number of ways you can distribute n balls into bins starting at index k. With this approach a basic formula is simply
def solutions(n, k):
if n == 0:
return 1 # Out of balls, there's only one solution (0, 0, 0, 0 ... 0)
if k == m:
return 0 # Out of bins... no solutions
total = 0
for h in xrange(0, min(n, c[k])+1): # from 0 to c[k] (included) into bin k
total += solutions(n - h, k + 1)
return total
then you need to add memoization (this will be equivalent to a DP approach) and some other optimizations like e.g. that if n > c[k] + c[k+1] + c[k+2] + ... then you know there are no solutions without the need to search (and you can precompute the partial sums).
There exists a combinatoric formula for this problem. The problem of finding the solutions to your problem is equivalent to finding the number of solutions of the equation
x1 + x2 + x3 + ... + xm = n
where xi < ci
Which is equivalent to finding the cofficient of x^n in the following equation
(1+x+..x^c1)(1+x+..+x^c2)...(1+x+...+x^cm)
The recursion for this equation is pretty simple
M(i,j) = summation(M(i-1, j-k)) where 0<= k <= cj
M(i,j) = 0 j <= 0
M(i,1) = i given for every 1= 1
M(i,j) is the number of ways of distributing the j balls in first i bins.
For the Dynamic Programming part Solve this recursion by Memoization, You will get your DP Solution automatically.