The first line contains four integers $$$n_1$$$, $$$n_2$$$, $$$n_3$$$ and $$$n_4$$$ ($$$1 \le n_i \le 150000$$$) — the number of types of first courses, second courses, drinks and desserts, respectively.

Then four lines follow. The first line contains $$$n_1$$$ integers $$$a_1, a_2, \dots, a_{n_1}$$$ ($$$1 \le a_i \le 10^8$$$), where $$$a_i$$$ is the cost of the $$$i$$$-th type of first course. Three next lines denote the costs of second courses, drinks, and desserts in the same way ($$$1 \le b_i, c_i, d_i \le 10^8$$$).

The next line contains one integer $$$m_1$$$ ($$$0 \le m_1 \le 200000$$$) — the number of pairs of first and second courses that don't go well with each other. Each of the next $$$m_1$$$ lines contains two integers $$$x_i$$$ and $$$y_i$$$ ($$$1 \le x_i \le n_1$$$; $$$1 \le y_i \le n_2$$$) denoting that the first course number $$$x_i$$$ doesn't go well with the second course number $$$y_i$$$. All these pairs are different.

The block of pairs of second dishes and drinks that don't go well with each other is given in the same format. The same for pairs of drinks and desserts that don't go well with each other ($$$0 \le m_2, m_3 \le 200000$$$).