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\(2^{nd}\) round, November \(10^{th}\), 2012
Mirko was bored, so he took a piece of paper and wrote down a sequence A of length N, which
contains each positive integer between 1 and N, inclusive, exactly once. After that, he took another
piece of paper and wrote down M descriptions of the sequence A.
Each description has one of the following formats:
1 x y v – the largest number in positions between x and y (inclusive) equals v
2 x y v – the smallest number in positions between x and y (inclusive) equals v
Then Slavko came, saw, and stole the first paper. Mirko is desperate and has asked you to find some
sequence matching the descriptions, not necessarily equal to the original sequence.
The first line of input contains two positive integers, N (\(1 \le N \le 200\)), the length of the sequence, and
M (\(0 \le M \le 40\,000\)), the number of descriptions.
Each of the following M lines contains a description as described above.
The first and only line of output must contain a sequence of N spa\(ce-se\)parated positive integers
(matching the descriptions and containing all positive integers from 1 to N), \(or -1\) if no such sequence
exists.
3 2
1 1 1 1
2 2 2 21 2 34 2
1 1 1 1
2 3 4 1-15 2
1 2 3 3
2 4 5 41 2 3 4 5평가 및 의견
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