from collections import deque def _input(message): return input(message).strip().split(" ") def initialize_unweighted_directed_graph( node_count: int, edge_count: int ) -> dict[int, list[int]]: graph: dict[int, list[int]] = {} for i in range(node_count): graph[i + 1] = [] for e in range(edge_count): x, y = (int(i) for i in _input(f"Edge {e + 1}: ")) graph[x].append(y) return graph def initialize_unweighted_undirected_graph( node_count: int, edge_count: int ) -> dict[int, list[int]]: graph: dict[int, list[int]] = {} for i in range(node_count): graph[i + 1] = [] for e in range(edge_count): x, y = (int(i) for i in _input(f"Edge {e + 1}: ")) graph[x].append(y) graph[y].append(x) return graph def initialize_weighted_undirected_graph( node_count: int, edge_count: int ) -> dict[int, list[tuple[int, int]]]: graph: dict[int, list[tuple[int, int]]] = {} for i in range(node_count): graph[i + 1] = [] for e in range(edge_count): x, y, w = (int(i) for i in _input(f"Edge {e + 1}: ")) graph[x].append((y, w)) graph[y].append((x, w)) return graph if __name__ == "__main__": n, m = (int(i) for i in _input("Number of nodes and edges: ")) graph_choice = int( _input( "Press 1 or 2 or 3 \n" "1. Unweighted directed \n" "2. Unweighted undirected \n" "3. Weighted undirected \n" )[0] ) g = { 1: initialize_unweighted_directed_graph, 2: initialize_unweighted_undirected_graph, 3: initialize_weighted_undirected_graph, }[graph_choice](n, m) """ -------------------------------------------------------------------------------- Depth First Search. Args : G - Dictionary of edges s - Starting Node Vars : vis - Set of visited nodes S - Traversal Stack -------------------------------------------------------------------------------- """ def dfs(g, s): vis, _s = {s}, [s] print(s) while _s: flag = 0 for i in g[_s[-1]]: if i not in vis: _s.append(i) vis.add(i) flag = 1 print(i) break if not flag: _s.pop() """ -------------------------------------------------------------------------------- Breadth First Search. Args : G - Dictionary of edges s - Starting Node Vars : vis - Set of visited nodes Q - Traversal Stack -------------------------------------------------------------------------------- """ def bfs(g, s): vis, q = {s}, deque([s]) print(s) while q: u = q.popleft() for v in g[u]: if v not in vis: vis.add(v) q.append(v) print(v) """ -------------------------------------------------------------------------------- Dijkstra's shortest path Algorithm Args : G - Dictionary of edges s - Starting Node Vars : dist - Dictionary storing shortest distance from s to every other node known - Set of knows nodes path - Preceding node in path -------------------------------------------------------------------------------- """ def dijk(g, s): dist, known, path = {s: 0}, set(), {s: 0} while True: if len(known) == len(g) - 1: break mini = 100000 for i in dist: if i not in known and dist[i] < mini: mini = dist[i] u = i known.add(u) for v in g[u]: if v[0] not in known and dist[u] + v[1] < dist.get(v[0], 100000): dist[v[0]] = dist[u] + v[1] path[v[0]] = u for i in dist: if i != s: print(dist[i]) """ -------------------------------------------------------------------------------- Topological Sort -------------------------------------------------------------------------------- """ def topo(g, ind=None, q=None): if q is None: q = [1] if ind is None: ind = [0] * (len(g) + 1) # SInce oth Index is ignored for u in g: for v in g[u]: ind[v] += 1 q = deque() for i in g: if ind[i] == 0: q.append(i) if len(q) == 0: return v = q.popleft() print(v) for w in g[v]: ind[w] -= 1 if ind[w] == 0: q.append(w) topo(g, ind, q) """ -------------------------------------------------------------------------------- Reading an Adjacency matrix -------------------------------------------------------------------------------- """ def adjm(): r""" Reading an Adjacency matrix Parameters: None Returns: tuple: A tuple containing a list of edges and number of edges Example: >>> # Simulate user input for 3 nodes >>> input_data = "4\n0 1 0 1\n1 0 1 0\n0 1 0 1\n1 0 1 0\n" >>> import sys,io >>> original_input = sys.stdin >>> sys.stdin = io.StringIO(input_data) # Redirect stdin for testing >>> adjm() ([(0, 1, 0, 1), (1, 0, 1, 0), (0, 1, 0, 1), (1, 0, 1, 0)], 4) >>> sys.stdin = original_input # Restore original stdin """ n = int(input().strip()) a = [] for _ in range(n): a.append(tuple(map(int, input().strip().split()))) return a, n """ -------------------------------------------------------------------------------- Floyd Warshall's algorithm Args : G - Dictionary of edges s - Starting Node Vars : dist - Dictionary storing shortest distance from s to every other node known - Set of knows nodes path - Preceding node in path -------------------------------------------------------------------------------- """ def floy(a_and_n): (a, n) = a_and_n dist = list(a) path = [[0] * n for i in range(n)] for k in range(n): for i in range(n): for j in range(n): if dist[i][j] > dist[i][k] + dist[k][j]: dist[i][j] = dist[i][k] + dist[k][j] path[i][k] = k print(dist) """ -------------------------------------------------------------------------------- Prim's MST Algorithm Args : G - Dictionary of edges s - Starting Node Vars : dist - Dictionary storing shortest distance from s to nearest node known - Set of knows nodes path - Preceding node in path -------------------------------------------------------------------------------- """ def prim(g, s): dist, known, path = {s: 0}, set(), {s: 0} while True: if len(known) == len(g) - 1: break mini = 100000 for i in dist: if i not in known and dist[i] < mini: mini = dist[i] u = i known.add(u) for v in g[u]: if v[0] not in known and v[1] < dist.get(v[0], 100000): dist[v[0]] = v[1] path[v[0]] = u return dist """ -------------------------------------------------------------------------------- Accepting Edge list Vars : n - Number of nodes m - Number of edges Returns : l - Edge list n - Number of Nodes -------------------------------------------------------------------------------- """ def edglist(): r""" Get the edges and number of edges from the user Parameters: None Returns: tuple: A tuple containing a list of edges and number of edges Example: >>> # Simulate user input for 3 edges and 4 vertices: (1, 2), (2, 3), (3, 4) >>> input_data = "4 3\n1 2\n2 3\n3 4\n" >>> import sys,io >>> original_input = sys.stdin >>> sys.stdin = io.StringIO(input_data) # Redirect stdin for testing >>> edglist() ([(1, 2), (2, 3), (3, 4)], 4) >>> sys.stdin = original_input # Restore original stdin """ n, m = tuple(map(int, input().split(" "))) edges = [] for _ in range(m): edges.append(tuple(map(int, input().split(" ")))) return edges, n """ -------------------------------------------------------------------------------- Kruskal's MST Algorithm Args : E - Edge list n - Number of Nodes Vars : s - Set of all nodes as unique disjoint sets (initially) -------------------------------------------------------------------------------- """ def krusk(e_and_n): """ Sort edges on the basis of distance """ (e, n) = e_and_n e.sort(reverse=True, key=lambda x: x[2]) s = [{i} for i in range(1, n + 1)] while True: if len(s) == 1: break print(s) x = e.pop() for i in range(len(s)): if x[0] in s[i]: break for j in range(len(s)): if x[1] in s[j]: if i == j: break s[j].update(s[i]) s.pop(i) break def find_isolated_nodes(graph): """ Find the isolated node in the graph Parameters: graph (dict): A dictionary representing a graph. Returns: list: A list of isolated nodes. Examples: >>> graph1 = {1: [2, 3], 2: [1, 3], 3: [1, 2], 4: []} >>> find_isolated_nodes(graph1) [4] >>> graph2 = {'A': ['B', 'C'], 'B': ['A'], 'C': ['A'], 'D': []} >>> find_isolated_nodes(graph2) ['D'] >>> graph3 = {'X': [], 'Y': [], 'Z': []} >>> find_isolated_nodes(graph3) ['X', 'Y', 'Z'] >>> graph4 = {1: [2, 3], 2: [1, 3], 3: [1, 2]} >>> find_isolated_nodes(graph4) [] >>> graph5 = {} >>> find_isolated_nodes(graph5) [] """ isolated = [] for node in graph: if not graph[node]: isolated.append(node) return isolated