# My FB HackerCup code too slow of large inputs

I was solving the `Find the min` problem on facebook hackercup using python, my code works fine for sample inputs but for large inputs(10^9) it is taking hours to complete.

So, is it possible that the solution of that problem can't be computed within 6 minutes using python? Or may be my approaches are too bad?

Problem statement:

After sending smileys, John decided to play with arrays. Did you know that hackers enjoy playing with arrays? John has a zero-based index array, `m`, which contains `n` non-negative integers. However, only the first `k` values of the array are known to him, and he wants to figure out the rest.

John knows the following: for each index `i`, where `k <= i < n`, `m[i]` is the minimum non-negative integer which is not contained in the previous `*k*` values of `m`.

For example, if `k = 3`, `n = 4` and the known values of `m` are `[2, 3, 0]`, he can figure out that `m[3] = 1`.

John is very busy making the world more open and connected, as such, he doesn't have time to figure out the rest of the array. It is your task to help him.

Given the first `k` values of `m`, calculate the nth value of this array. (i.e. `m[n - 1]`).

Because the values of `n` and `k` can be very large, we use a pseudo-random number generator to calculate the first `k` values of `m`. Given positive integers `a`, `b`, `c` and `r`, the known values of `m` can be calculated as follows:

``````m[0] = a
m[i] = (b * m[i - 1] + c) % r, 0 < i < k
``````

Input

• The first line contains an integer T (T <= 20), the number of test cases.

• This is followed by T test cases, consisting of 2 lines each.

• The first line of each test case contains 2 space separated integers, `n`, `k` (`1 <= k <= 10^5`, `k < n <= 10^9`).

• The second line of each test case contains 4 space separated integers `a`, `b`, `c`, `r` (0 <= a, b, c <= 10^9, 1 <= r <= 10^9).

I tried two approaches but both failed to return results in 6 minutes, Here's my two approaches:

first:

``````import sys
def func(line1,line2):
n,k=map(int,line1.split())
a,b,c,r =map(int,line2.split())
m=[None]*n                     #initialize the list
m[0]=a
for i in xrange(1,k):          #set the first k values using the formula
m[i]= (b * m[i - 1] + c) % r
#print m
for j in range(0,n-k):         #now set the value of m[k], m[k+1],.. upto m[n-1]

temp=set(m[j:k+j])     # create a set from the K values relative to current index
i=-1                   #start at 0, lowest +ve integer
while True:
i+=1
if i not in temp:  #if that +ve integer is not present in temp
m[k+j]=i
break

return m[-1]

for ind,case in enumerate(xrange(1,len(cases),2)):
ans=func(cases[case],cases[case+1])
print "Case #{0}: {1}".format(ind+1,ans)
``````

Second:

``````import sys
def func(line1,line2):
n,k=map(int,line1.split())
a,b,c,r =map(int,line2.split())
m=[None]*n                       #initialize
m[0]=a
for i in xrange(1,k):            #same as above
m[i]= (b * m[i - 1] + c) % r

#instead of generating a set in each iteration , I used a
# dictionary this time.
#Now, if the count of an item is 0 then it
#means the item is not present in the previous K items
#and can be added as the min value

temp={}
for x in m[0:k]:
temp[x]=temp.get(x,0)+1

i=-1
while True:
i+=1
if i not in temp:
m[k]=i          #set the value of m[k]
break
for j in range(1,n-k):      #now set the values of m[k+1] to m[n-1]
i=-1
temp[m[j-1]] -= 1       #decrement it's value, as it is now out of K items
temp[m[k+j-1]]=temp.get(m[k+j-1],0)+1   # new item added to the current K-1 items

while True:
i+=1
if i not in temp or temp[i]==0:  #if i not found in dict or it's val is 0
m[k+j]=i
break

return m[-1]

for ind,case in enumerate(xrange(1,len(cases),2)):
ans=func(cases[case],cases[case+1])
print "Case #{0}: {1}".format(ind+1,ans)
``````

The last for-loop in second approach can also be written as :

``````for j in range(1,n-k):
i=-1
temp[m[j-1]] -= 1
if temp[m[j-1]]==0:
temp.pop(m[j-1])      #same as above but pop the key this time
temp[m[k+j-1]]=temp.get(m[k+j-1],0)+1

while True:
i+=1
if i not in temp:
m[k+j]=i
break
``````

sample input :

``````5
97 39
34 37 656 97
186 75
68 16 539 186
137 49
48 17 461 137
98 59
6 30 524 98
46 18
7 11 9 46
``````

output:

``````Case #1: 8
Case #2: 38
Case #3: 41
Case #4: 40
Case #5: 12
``````

I already tried codereview, but no one replied there yet.

-
You should copy the problem statement into the question. – Alexey Frunze Jan 26 '13 at 11:16
Would you mind un-dumbing the problem algorithm description for us? :P – phant0m Jan 26 '13 at 11:27
Given the description of the input, how can there be large inputs of 10^9? – phant0m Jan 26 '13 at 11:40
Oh, so 109 is 10^9, and 105 is 10^5? Or are the others correct? You can use <sup>9</sup> btw – phant0m Jan 26 '13 at 11:41
You can rewrite your title as `Bad algorithm too slow for large inputs`. – mmgp Jan 26 '13 at 13:20

Here is my O(k) solution, which is based on the same idea as above, but runs much faster.

``````import os, sys

f = open(sys.argv[1], 'r')

def next(ary, start):
j = start
l = len(ary)
ret = start - 1
while j < l and ary[j]:
ret = j
j += 1
return ret

for t in range(T):
n, k = map(int, f.readline().strip().split(' '))
a, b, c, r = map(int, f.readline().strip().split(' '))

m = [0] * (4 * k)
s = [0] * (k+1)
m[0] = a
if m[0] <= k:
s[m[0]] = 1
for i in xrange(1, k):
m[i] = (b * m[i-1] + c) % r
if m[i] < k+1:
s[m[i]] += 1

p = next(s, 0)
m[k] = p + 1
p = next(s, p+2)

for i in xrange(k+1, n):
if m[i-k-1] > p or s[m[i-k-1]] > 1:
m[i] = p + 1
if m[i-k-1] <= k:
s[m[i-k-1]] -= 1
s[m[i]] += 1
p = next(s, p+2)
else:
m[i] = m[i-k-1]
if p == k:
break

if p != k:
print 'Case #%d: %d' % (t+1, m[n-1])
else:
print 'Case #%d: %d' % (t+1, m[i-k + (n-i+k+k) % (k+1)])
``````

The key point here is, m[i] will never exceeds k, and if we remember the consecutive numbers we can find in previous k numbers from 0 to p, then p will never reduce.

If number m[i-k-1] is larger than p, then it's obviously we should set m[i] to p+1, and p will increase at least 1.

If number m[i-k-1] is smaller or equal to p, then we should consider whether the same number exists in m[i-k:i], if not, m[i] should set equal to m[i-k-1], if yes, we should set m[i] to p+1 just as the "m[i-k-1]-larger-than-p" case.

Whenever p is equal to k, the loop begin, and the loop size is (k+1), so we can jump out of the calculation and print out the answer now.

-

After at most `k+1` steps, the last `k+1` numbers in the array will be `0...k` (in some order). Subsequently, the sequence is predictable: `m[i] = m[i-k-1]`. So the way to solve this problem is run your naive implementation for `k+1` steps. Then you've got an array with `2k+1` elements (the first `k` were generated from the random sequence, and the other `k+1` from iterating).

Now, the last k+1 elements are going to repeat infinitely. So you can just return the result for `m[n]` immediately: it's `m[k + (n-k-1) % (k+1)]`.

Here's some code that implements it.

``````import collections

def initial_seq(k, a, b, c, r):
v = a
for _ in xrange(k):
yield v
v = (b * v + c) % r

def find_min(n, k, a, b, c, r):
m = [0] * (2 * k + 1)
for i, v in enumerate(initial_seq(k, a, b, c, r)):
m[i] = v
ks = range(k+1)
s = collections.Counter(m[:k])
for i in xrange(k, len(m)):
m[i] = next(j for j in ks if not s[j])
ks.remove(m[i])
s[m[i-k]] -= 1
return m[k + (n - k - 1) % (k + 1)]

print find_min(97, 39, 34, 37, 656, 97)
print find_min(186, 75, 68, 16, 539, 186)
print find_min(137, 49, 48, 17, 461, 137)
print find_min(1000000000, 100000, 48, 17, 461, 137)
``````

The four cases run in 4 seconds on my machine, and the last case has the largest possible `n`.

-
Why should the last `k+1` numbers satisfy that criteria? – phant0m Jan 26 '13 at 13:10
Now try choosing random numbers between `1` and `10^9` for a, b, c and d and it shouldn't work. You're assuming that there is a number <= k in the first k elements. – phant0m Jan 26 '13 at 13:12
@phantom The smallest non-negative integer that's not in a list of k numbers is always between 0 and k. – Paul Hankin Jan 26 '13 at 13:13
Oh never mind, I was thinking of biggest lower bound instead of the smallest -.- – phant0m Jan 26 '13 at 13:17
This works fine, but for `print find_min(1000000000, 100000,99999, 1, 99999, 100000)` my system crashes. But this was surely very helpful. +1 – Ashwini Chaudhary Jan 27 '13 at 7:34

I enhanced the performance through adding map.

``````import sys, os
import collections

def min(str1, str2):
para1 = str1.split()
para2 = str2.split()

n = int(para1[0])
k = int(para1[1])
a = int(para2[0])
b = int(para2[1])
c = int(para2[2])
r = int(para2[3])

m = [0] * (2*k+1)
m[0] = a

s = collections.Counter()

s[a] += 1
rs = {}
for i in range(k+1):
rs[i] = 1

for i in xrange(1,k):
v = (b * m[i - 1] + c) % r
m[i] = v
s[v] += 1
if v < k:
if v in rs:
rs[v] -= 1
if rs[v] == 0:
del rs[v]

for j in xrange(0,k+1):
for t in rs:
if not s[t]:
m[k+j] = t
if m[j] < k:
if m[j] in rs:
rs[m[j]] += 1
else:
rs[m[j]] = 0

rs[t] -= 1
if rs[t] == 0:
del rs[t]

s[t] = 1
break

s[m[j]] -= 1

return m[k + ((n-k-1)%(k+1))]

if __name__=='__main__':
lines = []
user_input = raw_input()
num = int(user_input)

for i in xrange(num):
input1 = raw_input()
input2 = raw_input()
print "Case #%s: %s"%(i+1, min(input1, input2))
``````
-

## protected by Ashwini ChaudharyJan 29 '13 at 2:45

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