Description#
You are given a directed graph of n
nodes numbered from 0
to n - 1
, where each node has at most one outgoing edge.
The graph is represented with a given 0-indexed array edges
of size n
, indicating that there is a directed edge from node i
to node edges[i]
. If there is no outgoing edge from i
, then edges[i] == -1
.
You are also given two integers node1
and node2
.
Return the index of the node that can be reached from both node1
and node2
, such that the maximum between the distance from node1
to that node, and from node2
to that node is minimized. If there are multiple answers, return the node with the smallest index, and if no possible answer exists, return -1
.
Note that edges
may contain cycles.
Example 1:
Input: edges = [2,2,3,-1], node1 = 0, node2 = 1
Output: 2
Explanation: The distance from node 0 to node 2 is 1, and the distance from node 1 to node 2 is 1.
The maximum of those two distances is 1. It can be proven that we cannot get a node with a smaller maximum distance than 1, so we return node 2.
Example 2:
Input: edges = [1,2,-1], node1 = 0, node2 = 2
Output: 2
Explanation: The distance from node 0 to node 2 is 2, and the distance from node 2 to itself is 0.
The maximum of those two distances is 2. It can be proven that we cannot get a node with a smaller maximum distance than 2, so we return node 2.
Constraints:
n == edges.length
2 <= n <= 105
-1 <= edges[i] < n
edges[i] != i
0 <= node1, node2 < n
Solutions#
Solution 1#
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| class Solution:
def closestMeetingNode(self, edges: List[int], node1: int, node2: int) -> int:
def dijkstra(i):
dist = [inf] * n
dist[i] = 0
q = [(0, i)]
while q:
i = heappop(q)[1]
for j in g[i]:
if dist[j] > dist[i] + 1:
dist[j] = dist[i] + 1
heappush(q, (dist[j], j))
return dist
g = defaultdict(list)
for i, j in enumerate(edges):
if j != -1:
g[i].append(j)
n = len(edges)
d1 = dijkstra(node1)
d2 = dijkstra(node2)
ans, d = -1, inf
for i, (a, b) in enumerate(zip(d1, d2)):
if (t := max(a, b)) < d:
d = t
ans = i
return ans
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| class Solution {
private int n;
private List<Integer>[] g;
public int closestMeetingNode(int[] edges, int node1, int node2) {
n = edges.length;
g = new List[n];
Arrays.setAll(g, k -> new ArrayList<>());
for (int i = 0; i < n; ++i) {
if (edges[i] != -1) {
g[i].add(edges[i]);
}
}
int[] d1 = dijkstra(node1);
int[] d2 = dijkstra(node2);
int d = 1 << 30;
int ans = -1;
for (int i = 0; i < n; ++i) {
int t = Math.max(d1[i], d2[i]);
if (t < d) {
d = t;
ans = i;
}
}
return ans;
}
private int[] dijkstra(int i) {
int[] dist = new int[n];
Arrays.fill(dist, 1 << 30);
dist[i] = 0;
PriorityQueue<int[]> q = new PriorityQueue<>((a, b) -> a[0] - b[0]);
q.offer(new int[] {0, i});
while (!q.isEmpty()) {
var p = q.poll();
i = p[1];
for (int j : g[i]) {
if (dist[j] > dist[i] + 1) {
dist[j] = dist[i] + 1;
q.offer(new int[] {dist[j], j});
}
}
}
return dist;
}
}
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| class Solution {
public:
int closestMeetingNode(vector<int>& edges, int node1, int node2) {
int n = edges.size();
vector<vector<int>> g(n);
for (int i = 0; i < n; ++i) {
if (edges[i] != -1) {
g[i].push_back(edges[i]);
}
}
const int inf = 1 << 30;
using pii = pair<int, int>;
auto dijkstra = [&](int i) {
vector<int> dist(n, inf);
dist[i] = 0;
priority_queue<pii, vector<pii>, greater<pii>> q;
q.emplace(0, i);
while (!q.empty()) {
auto p = q.top();
q.pop();
i = p.second;
for (int j : g[i]) {
if (dist[j] > dist[i] + 1) {
dist[j] = dist[i] + 1;
q.emplace(dist[j], j);
}
}
}
return dist;
};
vector<int> d1 = dijkstra(node1);
vector<int> d2 = dijkstra(node2);
int ans = -1, d = inf;
for (int i = 0; i < n; ++i) {
int t = max(d1[i], d2[i]);
if (t < d) {
d = t;
ans = i;
}
}
return ans;
}
};
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| func closestMeetingNode(edges []int, node1 int, node2 int) int {
n := len(edges)
g := make([][]int, n)
for i, j := range edges {
if j != -1 {
g[i] = append(g[i], j)
}
}
const inf int = 1 << 30
dijkstra := func(i int) []int {
dist := make([]int, n)
for j := range dist {
dist[j] = inf
}
dist[i] = 0
q := hp{}
heap.Push(&q, pair{0, i})
for len(q) > 0 {
i := heap.Pop(&q).(pair).i
for _, j := range g[i] {
if dist[j] > dist[i]+1 {
dist[j] = dist[i] + 1
heap.Push(&q, pair{dist[j], j})
}
}
}
return dist
}
d1 := dijkstra(node1)
d2 := dijkstra(node2)
ans, d := -1, inf
for i, a := range d1 {
b := d2[i]
t := max(a, b)
if t < d {
d = t
ans = i
}
}
return ans
}
type pair struct{ d, i int }
type hp []pair
func (h hp) Len() int { return len(h) }
func (h hp) Less(i, j int) bool { return h[i].d < h[j].d }
func (h hp) Swap(i, j int) { h[i], h[j] = h[j], h[i] }
func (h *hp) Push(v any) { *h = append(*h, v.(pair)) }
func (h *hp) Pop() any { a := *h; v := a[len(a)-1]; *h = a[:len(a)-1]; return v }
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| function closestMeetingNode(edges: number[], node1: number, node2: number): number {
const n = edges.length;
const g = Array.from({ length: n }, () => []);
for (let i = 0; i < n; ++i) {
if (edges[i] != -1) {
g[i].push(edges[i]);
}
}
const inf = 1 << 30;
const f = (i: number) => {
const dist = new Array(n).fill(inf);
dist[i] = 0;
const q: number[] = [i];
while (q.length) {
i = q.shift();
for (const j of g[i]) {
if (dist[j] == inf) {
dist[j] = dist[i] + 1;
q.push(j);
}
}
}
return dist;
};
const d1 = f(node1);
const d2 = f(node2);
let ans = -1;
let d = inf;
for (let i = 0; i < n; ++i) {
const t = Math.max(d1[i], d2[i]);
if (t < d) {
d = t;
ans = i;
}
}
return ans;
}
|
Solution 2#
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| class Solution:
def closestMeetingNode(self, edges: List[int], node1: int, node2: int) -> int:
def f(i):
dist = [inf] * n
dist[i] = 0
q = deque([i])
while q:
i = q.popleft()
for j in g[i]:
if dist[j] == inf:
dist[j] = dist[i] + 1
q.append(j)
return dist
g = defaultdict(list)
for i, j in enumerate(edges):
if j != -1:
g[i].append(j)
n = len(edges)
d1 = f(node1)
d2 = f(node2)
ans, d = -1, inf
for i, (a, b) in enumerate(zip(d1, d2)):
if (t := max(a, b)) < d:
d = t
ans = i
return ans
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| class Solution {
private int n;
private List<Integer>[] g;
public int closestMeetingNode(int[] edges, int node1, int node2) {
n = edges.length;
g = new List[n];
Arrays.setAll(g, k -> new ArrayList<>());
for (int i = 0; i < n; ++i) {
if (edges[i] != -1) {
g[i].add(edges[i]);
}
}
int[] d1 = f(node1);
int[] d2 = f(node2);
int d = 1 << 30;
int ans = -1;
for (int i = 0; i < n; ++i) {
int t = Math.max(d1[i], d2[i]);
if (t < d) {
d = t;
ans = i;
}
}
return ans;
}
private int[] f(int i) {
int[] dist = new int[n];
Arrays.fill(dist, 1 << 30);
dist[i] = 0;
Deque<Integer> q = new ArrayDeque<>();
q.offer(i);
while (!q.isEmpty()) {
i = q.poll();
for (int j : g[i]) {
if (dist[j] == 1 << 30) {
dist[j] = dist[i] + 1;
q.offer(j);
}
}
}
return dist;
}
}
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| class Solution {
public:
int closestMeetingNode(vector<int>& edges, int node1, int node2) {
int n = edges.size();
vector<vector<int>> g(n);
for (int i = 0; i < n; ++i) {
if (edges[i] != -1) {
g[i].push_back(edges[i]);
}
}
const int inf = 1 << 30;
using pii = pair<int, int>;
auto f = [&](int i) {
vector<int> dist(n, inf);
dist[i] = 0;
queue<int> q{{i}};
while (!q.empty()) {
i = q.front();
q.pop();
for (int j : g[i]) {
if (dist[j] == inf) {
dist[j] = dist[i] + 1;
q.push(j);
}
}
}
return dist;
};
vector<int> d1 = f(node1);
vector<int> d2 = f(node2);
int ans = -1, d = inf;
for (int i = 0; i < n; ++i) {
int t = max(d1[i], d2[i]);
if (t < d) {
d = t;
ans = i;
}
}
return ans;
}
};
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| func closestMeetingNode(edges []int, node1 int, node2 int) int {
n := len(edges)
g := make([][]int, n)
for i, j := range edges {
if j != -1 {
g[i] = append(g[i], j)
}
}
const inf int = 1 << 30
f := func(i int) []int {
dist := make([]int, n)
for j := range dist {
dist[j] = inf
}
dist[i] = 0
q := []int{i}
for len(q) > 0 {
i = q[0]
q = q[1:]
for _, j := range g[i] {
if dist[j] == inf {
dist[j] = dist[i] + 1
q = append(q, j)
}
}
}
return dist
}
d1 := f(node1)
d2 := f(node2)
ans, d := -1, inf
for i, a := range d1 {
b := d2[i]
t := max(a, b)
if t < d {
d = t
ans = i
}
}
return ans
}
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