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prime-subtraction-operation.cpp
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prime-subtraction-operation.cpp
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// Time: O(p + nlogp)
// Space: O(p)
// number theory, greedy, binary search
vector<int> linear_sieve_of_eratosthenes(int n) { // Time: O(n), Space: O(n)
vector<int> spf(n + 1, -1);
vector<int> primes;
for (int i = 2; i <= n; ++i) {
if (spf[i] == -1) {
spf[i] = i;
primes.emplace_back(i);
}
for (const auto& p : primes) {
if (i * p > n || p > spf[i]) {
break;
}
spf[i * p] = p;
}
}
return primes; // len(primes) = O(n/(logn-1)), reference: https://math.stackexchange.com/questions/264544/how-to-find-number-of-prime-numbers-up-to-to-n
}
const int MAX_N = 1000;
const auto& PRIMES = linear_sieve_of_eratosthenes(MAX_N - 1);
class Solution {
public:
bool primeSubOperation(vector<int>& nums) {
for (int i = 0; i < size(nums); ++i) {
const auto& it = lower_bound(cbegin(PRIMES), cend(PRIMES), i - 1 >= 0 ? nums[i] - nums[i - 1] : nums[i]);
if (it != cbegin(PRIMES)) {
nums[i] -= *prev(it);
}
if (i - 1 >= 0 && nums[i - 1] >= nums[i]) {
return false;
}
}
return true;
}
};