# 1253_F. Cheap Robot ## Problem Description You're given a simple, undirected, connected, weighted graph with n nodes and m edges. Nodes are numbered from 1 to n. There are exactly k centrals (recharge points), which are nodes 1, 2, …, k. We consider a robot moving into this graph, with a battery of capacity c, not fixed by the constructor yet. At any time, the battery contains an integer amount x of energy between 0 and c inclusive. Traversing an edge of weight w_i is possible only if x ≥ w_i, and costs w_i energy points (x := x - w_i). Moreover, when the robot reaches a central, its battery is entirely recharged (x := c). You're given q independent missions, the i-th mission requires to move the robot from central a_i to central b_i. For each mission, you should tell the minimum capacity required to acheive it. Input The first line contains four integers n, m, k and q (2 ≤ k ≤ n ≤ 10^5 and 1 ≤ m, q ≤ 3 ⋅ 10^5). The i-th of the next m lines contains three integers u_i, v_i and w_i (1 ≤ u_i, v_i ≤ n, u_i ≠ v_i, 1 ≤ w_i ≤ 10^9), that mean that there's an edge between nodes u and v, with a weight w_i. It is guaranteed that the given graph is simple (there is no self-loop, and there is at most one edge between every pair of nodes) and connected. The i-th of the next q lines contains two integers a_i and b_i (1 ≤ a_i, b_i ≤ k, a_i ≠ b_i). Output You have to output q lines, where the i-th line contains a single integer : the minimum capacity required to acheive the i-th mission. Examples Input 10 9 3 1 10 9 11 9 2 37 2 4 4 4 1 8 1 5 2 5 7 3 7 3 2 3 8 4 8 6 13 2 3 Output 12 Input 9 11 3 2 1 3 99 1 4 5 4 5 3 5 6 3 6 4 11 6 7 21 7 2 6 7 8 4 8 9 3 9 2 57 9 3 2 3 1 2 3 Output 38 15 Note In the first example, the graph is the chain 10 - 9 - 2^C - 4 - 1^C - 5 - 7 - 3^C - 8 - 6, where centrals are nodes 1, 2 and 3. For the mission (2, 3), there is only one simple path possible. Here is a simulation of this mission when the capacity is 12. * The robot begins on the node 2, with c = 12 energy points. * The robot uses an edge of weight 4. * The robot reaches the node 4, with 12 - 4 = 8 energy points. * The robot uses an edge of weight 8. * The robot reaches the node 1 with 8 - 8 = 0 energy points. * The robot is on a central, so its battery is recharged. He has now c = 12 energy points. * The robot uses an edge of weight 2. * The robot is on the node 5, with 12 - 2 = 10 energy points. * The robot uses an edge of weight 3. * The robot is on the node 7, with 10 - 3 = 7 energy points. * The robot uses an edge of weight 2. * The robot is on the node 3, with 7 - 2 = 5 energy points. * The robot is on a central, so its battery is recharged. He has now c = 12 energy points. * End of the simulation. Note that if value of c was lower than 12, we would have less than 8 energy points on node 4, and we would be unable to use the edge 4 ↔ 1 of weight 8. Hence 12 is the minimum capacity required to acheive the mission. — The graph of the second example is described here (centrals are red nodes): The robot can acheive the mission (3, 1) with a battery of capacity c = 38, using the path 3 → 9 → 8 → 7 → 2 → 7 → 6 → 5 → 4 → 1 The robot can acheive the mission (2, 3) with a battery of capacity c = 15, using the path 2 → 7 → 8 → 9 → 3 ## Contest Information - **Contest ID**: 1253 - **Problem Index**: F - **Points**: 2750.0 - **Rating**: 2500 - **Tags**: binary search, dsu, graphs, shortest paths, trees - **Time Limit**: {'seconds': 3, 'nanos': 0} seconds - **Memory Limit**: 512000000 bytes ## Task Solve this competitive programming problem. Provide a complete solution that handles all the given constraints and edge cases.