2477. Minimum Fuel Cost to Report to the Capital
Problem Description
In this problem, we are presented with a country that has n
cities arranged in a tree structure, meaning all cities are connected by roads in such a way that there is exactly one unique path between any two cities, and there are no cycles. The cities are numbered from 0
to n - 1
, where city 0
is the capital. The connections between cities are described by the roads
array, where each element represents a bidirectional road between two cities.
A meeting is scheduled to take place in the capital city, and every city needs to send a representative to the meeting. Each city has one car with a certain number of seats
which can be used to travel to the meeting. When traveling from one city to another, it costs one liter of fuel. If necessary, representatives can switch cars by riding with another representative from a different city.
The goal is to calculate the minimum amount of fuel needed for all representatives to reach the capital city for the meeting.
Flowchart Walkthrough
Let's analyze the problem LeetCode 2477. Minimum Fuel Cost to Report to the Capital using the Flowchart. Here's a step-by-step walkthrough of determining the appropriate algorithm:
Is it a graph?
- Yes: Cities and roads between them constitute nodes and edges respectively, fitting the definition of a graph.
Is it a tree?
- Yes: From the problem description, each city can reach the capital by exactly one simple path, indicating a tree structure.
Since we have established it’s a graph and specifically a tree, let's proceed:
The flowchart leads us to the decision that using Depth-First Search (DFS) is a viable option for tree-based problems. DFS can track paths and manage aggregations of values up and down the tree structure efficiently, which is suitable for calculating cumulative properties like fuel costs in a tree.
Conclusion: The flowchart recommends using DFS for this tree-based problem, allowing efficient traversal and calculation of minimum fuel costs from various nodes (cities) to a specific node (the capital).
Intuition
To approach this problem, we have to recognize that because the cities are connected in a tree structure, there is only one path for each representative to take to the capital city, making the task of finding the path straightforward. The challenge is finding out the optimal arrangement of representatives and cars to minimize fuel consumption.
Since this is a tree structure, we can use the Depth First Search (DFS) algorithm. We start from the capital city and explore each branch, that is, each connected city recursively. At each city, we calculate the number of representatives that need to be transferred from that city to the capital city, including the representatives from its connected cities.
The key insight to minimize fuel is to fill each car to its maximum capacity before sending it to the capital. This ensures the least number of trips is made, and subsequently, the minimum amount of fuel is used.
The intuition behind the solution code is that we perform a DFS starting from the capital. During the DFS, we keep track of the total number of representatives that need to be moved from each branch (i.e., from each city and its descendants). As representatives are transported to the capital city, we calculate the number of cars needed to move them based on the capacity of each car (seats
). Each car that needs to move from a city to the capital city uses one liter of fuel, hence we increase the fuel count by the number of cars needed for that branch.
The dfs
function updates the total fuel cost (ans
) as it calculates the number of representatives that need to be moved from each city to its parent. The calculation for the number of cars needed is done by (t + seats - 1) // seats
, where t
is the number of representatives, accounting for the last car that may not be full.
Learn more about Tree, Depth-First Search, Breadth-First Search and Graph patterns.
Solution Approach
The implementation of the solution primarily relies on a recursive Depth-First Search (DFS) algorithm. The algorithm traverses the input tree, starting from the capital city (node 0
), going through each city and figuring out the number of seats required to transport the representatives from the subtree rooted at that city to the capital.
The code uses the following elements in its approach:
- A
defaultdict
from thecollections
module to represent the graph which describes the tree structure of the country. Keys are cities, and values are lists of neighboring cities effectively forming the adjacency list for each node. - A recursive
dfs
function, which serves as the DFS traversal method, taking two parameters: the current citya
, and its parent cityfa
. The parent city helps in avoiding traversing back on the path we came from. - A nonlocal variable
ans
, which keeps track of the total fuel cost calculated during the DFS traversal. The variable is defined asnonlocal
because it needs to be accessed and modified within the nesteddfs
function.
The dfs
function works as follows:
- For each city
a
, it initializes a local variablesize
to1
, which implicitly includes the city’s own representative. - It iterates over all connected cities
b
ing[a]
. Ifb
is not the city we just visited (fa
), it recursively callsdfs(b, a)
. - Within each recursive call, it computes the total number of representatives
t
(including those from the subtrees) that need to travel from cityb
through citya
toward the capital. - The fuel cost for the subtree rooted at
b
is then updated by adding(t + seats - 1) // seats
toans
. The expression(t + seats - 1) // seats
calculates the smallest number of cars needed to transportt
representatives given each car hasseats
number of seats. It uses integer division rounding up, which is achieved by addingseats - 1
before dividing. - The function then returns the size of the subtree rooted at the current city
a
to its parent call which aggregates sizes from all child calls.
After defining the dfs
and g
, the function calls dfs(0, -1)
to start the traversal from the capital city (which has no parent, hence -1
is used), and finally returns ans
.
This algorithm ensures that each representative is counted exactly once and the minimum number of cars needed to transport representatives from each subtree to the root (capital city) is calculated, thus leading to the calculation of the minimum fuel cost.
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Start EvaluatorExample Walkthrough
Let's illustrate the solution approach with a small example. Suppose we have a country with 5 cities (n = 5) arranged in a tree structure with the following connections and seats in cars:
- Roads: [(0, 1), (0, 2), (1, 3), (1, 4)]
- Seats: 4 for all cars (for simplicity)
The tree structure based on the roads array is as follows:
0 (capital) / \ 1 2 / \ 3 4
Each city except for the capital has one representative who needs to get to the capital. Now, let's walk through the DFS approach:
- We start the DFS from the capital city (0). City 0 has 2 neighbors: city 1 and city 2.
- We explore city 1 (which has not been visited). City 1 has 2 neighbors: city 3 and city 4.
- We go to city 3 (not visited), and it has no neighbors. We determine one representative needs to travel from city 3 to city 1. Since each car has 4 seats, only one car (and thus one liter of fuel) is used. The DFS function returns a subtree size for city 3 as 1 (just the representative from city 3).
- Back to city 1, we next explore city 4 with a similar process as city 3. One liter of fuel is used, and the subtree size is 1.
- Now back at city 1, we have collected the subtree sizes from city 3 and city 4. The total number of representatives at city 1 is 1 (its own) + 1 (from city 3) + 1 (from city 4) = 3. Only one car with 4 seats is needed, so one more liter of fuel is used to move these representatives to the capital.
- We go back to the capital and move to city 2. It has no neighbors to explore, so we use one car and one liter of fuel to transport the representative to the capital. The total size of city 2's subtree is 1.
- Finally, we collect the total fuel cost as the sum of the fuel needed for the subtrees: 1 (from city 3) + 1 (from city 4) + 1 (from city 1 to capital) + 1 (from city 2 to capital) = 4 liters.
The answer for our example is 4 liters as the minimum amount of fuel needed for all representatives to reach the capital.
Solution Implementation
1from collections import defaultdict
2
3class Solution:
4 def minimumFuelCost(self, roads, seats):
5 # Recursive function to perform depth-first search (DFS) on the graph.
6 def dfs(current, parent):
7 # Initialize the size of the current subtree, starting with 1 for the current node.
8 subtree_size = 1
9
10 # Iterate through adjacent nodes of the current node.
11 for next_node in graph[current]:
12 # Avoid traversing the edge leading back to the parent node.
13 if next_node != parent:
14 # Recursively call dfs for the adjacent node.
15 child_size = dfs(next_node, current)
16
17 # Update the total number of trips required to move people from the current subtree,
18 # ensuring each trip has no more people than the number of available seats.
19 self.total_trips += (child_size + seats - 1) // seats
20
21 # Update the size of the current subtree by adding the size of the child subtree.
22 subtree_size += child_size
23
24 # Return the size of the current subtree.
25 return subtree_size
26
27 # Initialize graph as an adjacency list representation.
28 graph = defaultdict(list)
29 # Build the graph using roads information.
30 for start, end in roads:
31 graph[start].append(end)
32 graph[end].append(start)
33
34 # The variable to store the total number of trips required.
35 self.total_trips = 0
36
37 # Start DFS from node 0 assuming 0 as the root with no parent (-1).
38 dfs(0, -1)
39
40 # Return the total number of trips calculated.
41 return self.total_trips
42
43# Example usage:
44# sol = Solution()
45# print(sol.minimumFuelCost([[0, 1], [1, 2]], 2)) # Example call to the method.
46
1import java.util.ArrayList;
2import java.util.Arrays;
3import java.util.List;
4
5class Solution {
6 private List<Integer>[] graph; // "g" is renamed to "graph" for clarity
7 private long totalFuelCost; // "ans" is renamed to "totalFuelCost" for clarity
8 private int maxSeats; // "seats" is renamed to "maxSeats" for clarity
9
10 // Function to calculate the minimum fuel cost
11 public long minimumFuelCost(int[][] roads, int seats) {
12 int nodeCount = roads.length + 1; // Calculate the number of nodes
13 graph = new List[nodeCount]; // Initialize the graph
14 Arrays.setAll(graph, k -> new ArrayList<>()); // Create a list for each node
15 maxSeats = seats; // Set the maximum number of seats
16 for (int[] edge : roads) { // Iterate over all roads
17 int from = edge[0], to = edge[1]; // Get the from and to nodes for each road
18 graph[from].add(to); // Add the to node into the from node's list
19 graph[to].add(from); // Add the from node into the to node's list
20 }
21 dfs(0, -1); // Perform a DFS traversal starting from node 0 with no parent (-1)
22 return totalFuelCost; // Return the total fuel cost
23 }
24
25 // Depth-First Search function to traverse the graph and calculate fuel cost
26 private int dfs(int node, int parent) {
27 int subtreeSize = 1; // Initialize the subtree size (1 for the current node)
28 for (int adjacent : graph[node]) { // Iterate over the adjacent nodes
29 if (adjacent != parent) { // Check if it's not coming back to the parent
30 int childTreeSize = dfs(adjacent, node); // Recursively call dfs for the child node
31 // Calculate and add fuel cost for reaching the child node's subtree
32 totalFuelCost += (long) Math.ceil((double) childTreeSize / maxSeats);
33 subtreeSize += childTreeSize; // Update the size of the current subtree
34 }
35 }
36 return subtreeSize; // Return the size of the subtree rooted at the current node
37 }
38}
39
1#include <vector>
2#include <functional>
3using namespace std;
4
5class Solution {
6public:
7 // Function to calculate the minimum fuel cost for a road network
8 // 'roads' represent connections where roads[i] = [a, b] is a road between a and b
9 // 'seats' represents the number of seats in the vehicle
10 long long minimumFuelCost(vector<vector<int>>& roads, int seats) {
11 // Number of stops in the network is one more than number of roads
12 int numStops = roads.size() + 1;
13
14 // Graph 'g' to represent the network connections
15 vector<vector<int>> graph(numStops);
16
17 // Building the adjacency list for the graph
18 for (auto& edge : roads) {
19 int from = edge[0], to = edge[1];
20 graph[from].emplace_back(to);
21 graph[to].emplace_back(from);
22 }
23
24 // Variable to store the total fuel cost
25 long long totalFuelCost = 0;
26
27 // Depth-first search function to calculate the size of each subtree and add fuel costs
28 function<int(int, int)> dfs = [&](int currentNode, int parentNode) -> int {
29 int subtreeSize = 1; // Each stop contributes size 1 to the subtree
30
31 // Traverse all the connected stops
32 for (int nextNode : graph[currentNode]) {
33 if (nextNode != parentNode) {
34 // Calculate the size of child subtree
35 int childSize = dfs(nextNode, currentNode);
36 // Add fuel cost for trips from this child
37 totalFuelCost += (childSize + seats - 1) / seats;
38 // Increment subtree size with the size of the child
39 subtreeSize += childSize;
40 }
41 }
42 return subtreeSize;
43 };
44
45 // Start DFS from stop 0, considering it as the root and no parent (-1)
46 dfs(0, -1);
47
48 // Return the total fuel cost after performing DFS
49 return totalFuelCost;
50 }
51};
52
1// Importing necessary functionalities from libraries
2import { Vector } from "prelude-ts";
3
4// Function to calculate the size of each subtree and add fuel costs using DFS
5function depthFirstSearch(currentNode: number, parentNode: number, graph: Vector<Vector<number>>, seats: number): number {
6 let subtreeSize: number = 1; // Each stop contributes size 1 to the subtree
7
8 // Get all the connected stops for the current node
9 const connectedStops: Vector<number> = graph.get(currentNode).getOrElse(Vector.empty());
10
11 // Traverse all the connected stops and avoid visiting the parent node again
12 connectedStops.forEach((nextNode: number) => {
13 if (nextNode !== parentNode) {
14 // Calculate the size of child subtree
15 const childSize: number = depthFirstSearch(nextNode, currentNode, graph, seats);
16 // Add fuel cost for trips from this child, round up trips given the number of seats
17 totalFuelCost += Math.ceil(childSize / seats);
18 // Increment subtree size with the size of the child
19 subtreeSize += childSize;
20 }
21 });
22
23 return subtreeSize;
24}
25
26// Function to calculate the minimum fuel cost for a road network
27function minimumFuelCost(roads: Vector<Vector<number>>, seats: number): number {
28 // Number of stops in the network is one more than the number of roads
29 const numStops: number = roads.length() + 1;
30
31 // Initialise a graph to represent the network connections as an adjacency list
32 let graph: Vector<Vector<number>> = Vector.fill(numStops, () => Vector.empty<number>());
33
34 // Building the adjacency list for the graph from the road connections provided
35 roads.forEach((edge: Vector<number>) => {
36 const from: number = edge.get(0).getOrElse(0);
37 const to: number = edge.get(1).getOrElse(0);
38 graph = graph.updateAt(from, (edges: Vector<number>) => edges.append(to));
39 graph = graph.updateAt(to, (edges: Vector<number>) => edges.append(from));
40 });
41
42 // Variable to store the total fuel cost, initialised to 0
43 totalFuelCost = 0;
44
45 // Start DFS from stop 0, considering it as the root with no parent (-1)
46 depthFirstSearch(0, -1, graph, seats);
47
48 // Return the total fuel cost after performing DFS
49 return totalFuelCost;
50}
51
52// Global variable to store the total fuel cost
53let totalFuelCost: number = 0;
54
Time and Space Complexity
The time complexity of the given Python code is O(N)
, where N
is the number of nodes (intersections) in the road network represented as a tree. This is because each node is visited exactly once thanks to the Depth-First Search (DFS) approach used in the function dfs
. In each call to dfs
, it goes through all the edges connected to a node exactly once to calculate the number of fuel stops needed for each subtree.
The space complexity of the code is O(N)
as well. The additional space used is for the recursive call stack of the dfs
function and the adjacency list g
that stores the tree. Since the tree is not heavily skewed, the height of the tree (which impacts the call stack size) will not be more than N
in the worst case (a straight line tree). Thus, the recursive call stack size is at most N
. The adjacency list also stores up to 2(N - 1)
edges (since every edge is stored twice, once for each node it connects), which is within a constant factor of the number of nodes.
So, the overall space complexity remains linear with the number of nodes O(N)
.
Learn more about how to find time and space complexity quickly using problem constraints.
In a binary min heap, the minimum element can be found in:
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