NOI '22 Multi-Provincial Team Selection P5 - Bracket

View as PDF

Submit solution

All submissions

Best submissions

Points: 35 (partial)

Time limit: 1.0s

Memory limit: 512M

Problem type

Tommy has a balanced bracket sequence $s$ ~s~ of length $2n$ ~2n~, and a weight associated with each opening bracket.

Tommy desires to convert $s$ ~s~ into a string that does not contain any sequence of the form $(A)(B)$ ~(A)(B)~, where $A$ ~A~ and $B$ ~B~ are and hereinafter are any balanced bracket sequence. To do this, he can do two operations an arbitrary amount of times:

Change the string from $p(A)(B)q$ ~p(A)(B)q~ to $p(A()B)q$ ~p(A()B)q~, where $p$ ~p~ and $q$ ~q~ are and hereinafter are any (possibly unbalanced) bracket sequence. This incurs a cost of $x$ ~x~ times the weight of the first opening bracket plus $y$ ~y~ times the weight of the second opening bracket, where $x$ ~x~ and $y$ ~y~ are integers given in the input in $\{0, 1\}$ ~\{0, 1\}~.
Change the string from $pABq$ ~pABq~ to $pBAq$ ~pBAq~. This incurs no cost. Note that the weights of the opening brackets are changed as they are moved around.

Find the minimum possible cost incurred to convert $s$ ~s~ into a string that does not contain any substring of the form $(A)(B)$ ~(A)(B)~, where $A$ ~A~ and $B$ ~B~ are any balanced bracket sequence.

Constraints

$2 \le n \le 4 \times 10^5$ ~2 \le n \le 4 \times 10^5~

$0 \le x, y \le 1$ ~0 \le x, y \le 1~

$1 \le w_i \le 10^7$ ~1 \le w_i \le 10^7~

Test	Other restrictions
1 - 3	$n \le 8$ ~n \le 8~
4 - 5	All weights are equal.
6 - 8	$n \le 20$ ~n \le 20~
9 - 12	$x = 0$ ~x = 0~, $y = 1$ ~y = 1~
13 - 16	$n \le 2000$ ~n \le 2000~
17 - 25	None.

Input Specification

The first line contains three non-negative integers $n$ ~n~, $x$ ~x~, and $y$ ~y~.

The second line contains a balanced bracket sequence $s$ ~s~ of length $2n$ ~2n~.

The third line contains $n$ ~n~ positive integers $w_1, w_2, \dots, w_n$ ~w_1, w_2, \dots, w_n~.

Output Specification

Output the answer.

Sample Input 1

2 0 1
()()
1 3

Sample Output 1

Sample Explanation 1

The optimal solution is to first use operation 2 to exchange the first and second pair of parentheses. Then, use operation 1 to exchange the inner pair of parentheses, where $A$ ~A~, $B$ ~B~, $p$ ~p~, and $q$ ~q~ are all empty, incurring a cost of $3 \times 0 + 1 \times 1 = 1$ ~3 \times 0 + 1 \times 1 = 1~.

Sample Input 2

2 1 0
()()
1 3

Sample Output 2

Sample Explanation 2

We may use operation 1 directly, incurring a cost of $1 \times 1 + 3 \times 0 = 1$ ~1 \times 1 + 3 \times 0 = 1~.

Attachments

Attachments can be found here.

Comments

There are no comments at the moment.