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Formatted question description: https://leetcode.ca/all/2508.html
2508. Add Edges to Make Degrees of All Nodes Even
Description
There is an undirected graph consisting of n
nodes numbered from 1
to n
. You are given the integer n
and a 2D array edges
where edges[i] = [ai, bi]
indicates that there is an edge between nodes ai
and bi
. The graph can be disconnected.
You can add at most two additional edges (possibly none) to this graph so that there are no repeated edges and no self-loops.
Return true
if it is possible to make the degree of each node in the graph even, otherwise return false
.
The degree of a node is the number of edges connected to it.
Example 1:
Input: n = 5, edges = [[1,2],[2,3],[3,4],[4,2],[1,4],[2,5]] Output: true Explanation: The above diagram shows a valid way of adding an edge. Every node in the resulting graph is connected to an even number of edges.
Example 2:
Input: n = 4, edges = [[1,2],[3,4]] Output: true Explanation: The above diagram shows a valid way of adding two edges.
Example 3:
Input: n = 4, edges = [[1,2],[1,3],[1,4]] Output: false Explanation: It is not possible to obtain a valid graph with adding at most 2 edges.
Constraints:
3 <= n <= 105
2 <= edges.length <= 105
edges[i].length == 2
1 <= ai, bi <= n
ai != bi
- There are no repeated edges.
Solutions
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class Solution { public boolean isPossible(int n, List<List<Integer>> edges) { Set<Integer>[] g = new Set[n + 1]; Arrays.setAll(g, k -> new HashSet<>()); for (var e : edges) { int a = e.get(0), b = e.get(1); g[a].add(b); g[b].add(a); } List<Integer> vs = new ArrayList<>(); for (int i = 1; i <= n; ++i) { if (g[i].size() % 2 == 1) { vs.add(i); } } if (vs.size() == 0) { return true; } if (vs.size() == 2) { int a = vs.get(0), b = vs.get(1); if (!g[a].contains(b)) { return true; } for (int c = 1; c <= n; ++c) { if (a != c && b != c && !g[a].contains(c) && !g[c].contains(b)) { return true; } } return false; } if (vs.size() == 4) { int a = vs.get(0), b = vs.get(1), c = vs.get(2), d = vs.get(3); if (!g[a].contains(b) && !g[c].contains(d)) { return true; } if (!g[a].contains(c) && !g[b].contains(d)) { return true; } if (!g[a].contains(d) && !g[b].contains(c)) { return true; } return false; } return false; } }
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class Solution { public: bool isPossible(int n, vector<vector<int>>& edges) { vector<unordered_set<int>> g(n + 1); for (auto& e : edges) { int a = e[0], b = e[1]; g[a].insert(b); g[b].insert(a); } vector<int> vs; for (int i = 1; i <= n; ++i) { if (g[i].size() % 2) { vs.emplace_back(i); } } if (vs.size() == 0) { return true; } if (vs.size() == 2) { int a = vs[0], b = vs[1]; if (!g[a].count(b)) return true; for (int c = 1; c <= n; ++c) { if (a != b && b != c && !g[a].count(c) && !g[c].count(b)) { return true; } } return false; } if (vs.size() == 4) { int a = vs[0], b = vs[1], c = vs[2], d = vs[3]; if (!g[a].count(b) && !g[c].count(d)) return true; if (!g[a].count(c) && !g[b].count(d)) return true; if (!g[a].count(d) && !g[b].count(c)) return true; return false; } return false; } };
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class Solution: def isPossible(self, n: int, edges: List[List[int]]) -> bool: g = defaultdict(set) for a, b in edges: g[a].add(b) g[b].add(a) vs = [i for i, v in g.items() if len(v) & 1] if len(vs) == 0: return True if len(vs) == 2: a, b = vs if a not in g[b]: return True return any(a not in g[c] and c not in g[b] for c in range(1, n + 1)) if len(vs) == 4: a, b, c, d = vs if a not in g[b] and c not in g[d]: return True if a not in g[c] and b not in g[d]: return True if a not in g[d] and b not in g[c]: return True return False return False
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func isPossible(n int, edges [][]int) bool { g := make([]map[int]bool, n+1) for _, e := range edges { a, b := e[0], e[1] if g[a] == nil { g[a] = map[int]bool{} } if g[b] == nil { g[b] = map[int]bool{} } g[a][b], g[b][a] = true, true } vs := []int{} for i := 1; i <= n; i++ { if len(g[i])%2 == 1 { vs = append(vs, i) } } if len(vs) == 0 { return true } if len(vs) == 2 { a, b := vs[0], vs[1] if !g[a][b] { return true } for c := 1; c <= n; c++ { if a != c && b != c && !g[a][c] && !g[c][b] { return true } } return false } if len(vs) == 4 { a, b, c, d := vs[0], vs[1], vs[2], vs[3] if !g[a][b] && !g[c][d] { return true } if !g[a][c] && !g[b][d] { return true } if !g[a][d] && !g[b][c] { return true } return false } return false }