| # 1269_E. K Integers |
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| ## Problem Description |
| You are given a permutation p_1, p_2, …, p_n. |
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| In one move you can swap two adjacent values. |
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| You want to perform a minimum number of moves, such that in the end there will exist a subsegment 1,2,…, k, in other words in the end there should be an integer i, 1 ≤ i ≤ n-k+1 such that p_i = 1, p_{i+1} = 2, …, p_{i+k-1}=k. |
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| Let f(k) be the minimum number of moves that you need to make a subsegment with values 1,2,…,k appear in the permutation. |
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| You need to find f(1), f(2), …, f(n). |
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| Input |
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| The first line of input contains one integer n (1 ≤ n ≤ 200 000): the number of elements in the permutation. |
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| The next line of input contains n integers p_1, p_2, …, p_n: given permutation (1 ≤ p_i ≤ n). |
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| Output |
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| Print n integers, the minimum number of moves that you need to make a subsegment with values 1,2,…,k appear in the permutation, for k=1, 2, …, n. |
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| Examples |
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| Input |
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| 5 |
| 5 4 3 2 1 |
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| Output |
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| 0 1 3 6 10 |
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| Input |
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| 3 |
| 1 2 3 |
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| Output |
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| 0 0 0 |
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| ## Contest Information |
| - **Contest ID**: 1269 |
| - **Problem Index**: E |
| - **Points**: 1500.0 |
| - **Rating**: 2300 |
| - **Tags**: binary search, data structures |
| - **Time Limit**: {'seconds': 3, 'nanos': 0} seconds |
| - **Memory Limit**: 256000000 bytes |
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| ## Task |
| Solve this competitive programming problem. Provide a complete solution that handles all the given constraints and edge cases. |
