"최소 신장 트리"의 두 판 사이의 차이

노트

• An algorithm to construct a Minimum Spanning Tree for a connected weighted graph.^[1]
• The Greedy Choice is to put the smallest weight edge that does not because a cycle in the MST constructed so far.^[1]
• If the graph is not linked, then it finds a Minimum Spanning Tree.^[1]
• For Example: Find the Minimum Spanning Tree of the following graph using Kruskal's algorithm.^[1]
• Find a minimum spanning tree for this graph.^[2]
• One possible minimum spanning tree for this graph are the edges AB,BE,BF,EC,CD.^[2]
• How can we be certain that that edge must be in the final minimum spanning tree?^[2]
• Let’s think about it by contradiction: suppose it wasn’t part of the minimum spanning tree.^[2]
• A minimum spanning tree is a special kind of tree that minimizes the lengths (or “weights”) of the edges of the tree.^[3]
• Initially our MST contains only vertices of given graph with no edges.^[3]
• In other words, initially MST has V connected components with each vertex acting as one connected component.^[3]
• We’ll find the minimum spanning tree of a graph using Prim’s algorithm.^[4]
• This plugin identifies the Minimum Spanning Tree (MST) of geographical inputs.^[5]
• The minimum spanning tree is built gradually by adding edges one at a time.^[6]
• A modification of Kruskal's Algorithm for the solution to the MST problem is presented and is compared with Prim's Algorithm.^[7]
• Minimum spanning trees can be a bit counter-intuitive.^[8]
• Minimum spanning trees are often used to visualize relationships between strains or isolates.^[8]
• The minimum spanning tree of a weighted graph is a set of edges of minimum total weight which form a spanning tree of the graph.^[9]
• The minimum spanning tree can be found in polynomial time.^[9]
• The paper presents a new algorithm based on the distance matrix to solve the LC-MST problem.^[10]
• The studied cases show that the presented algorithm is efficient to solve the LC-MST problem in less time.^[10]
• A minimum spanning tree (MST) can be defined on an undirected weighted graph.^[11]
• An MST follows the same definition of a spanning tree.^[11]
• Like a spanning tree, a minimum spanning tree will also contain all the vertices of the graph .^[11]
• Here, denotes the total number of edges in the minimum spanning tree .^[11]
• A minimum spanning tree, MST(S), of S is a planar straight line graph on S which is connected and has minimum total edge length.^[12]
• Spanning Tree (MST) of G is an ST of G that has the smallest total weight among the various STs.^[13]
• The output is either the actual MST of G (there can be several possible MSTs of G) or usually just the minimum total weight itself (unique).^[13]
• In a weighted graph, a minimum spanning tree is a spanning tree that has minimum weight than all other spanning trees of the same graph.^[14]
• A less obvious application is that the minimum spanning tree can be used to approximately solve the traveling salesman problem.^[15]
• For simplicity, we assume that there is a unique minimum spanning tree.^[15]
• Then e is part of the minimum spanning tree.^[15]
• Suppose you have a tree T not containing e; then I want to show that T is not the MST.^[15]
• Minimum spanning tree is the spanning tree where the cost is minimum among all the spanning trees.^[16]
• Minimum spanning tree has direct application in the design of networks.^[16]
• There are quite a few use cases for minimum spanning trees.^[17]
• This figure shows there may be more than one minimum spanning tree in a graph.^[17]
• As B is an MST, {e 1 } ∪ {\displaystyle \cup } B must contain a cycle C with e 1 .^[17]
• T is the only MST of the given graph.^[17]
• We have discussed Kruskal’s algorithm for Minimum Spanning Tree.^[18]
• The first set contains the vertices already included in the MST, the other set contains the vertices not yet included.^[18]
• Pick the vertex with minimum key value and not already included in MST (not in mstSET).^[18]
• The Greedy Choice is to pick the smallest weight edge that does not cause a cycle in the MST constructed so far.^[19]
• The spanning-tree condition in our definition implies that the graph must be connected for an MST to exist.^[20]
• If edges can have equal weights, the minimum spanning tree may not be unique.^[20]
• The cut property is the basis for the algorithms that we consider for the MST problem.^[20]
• Prim's algorithm computes the MST of any connected edge-weighted graph.^[20]

소스

메타데이터

위키데이터

• ID : Q240464

Spacy 패턴 목록

• [{'LOWER': 'minimum'}, {'LOWER': 'spanning'}, {'LEMMA': 'tree'}]
• [{'LEMMA': 'MST'}]
• [{'LOWER': 'shortest'}, {'LOWER': 'spanning'}, {'LEMMA': 'tree'}]
• [{'LEMMA': 'sst'}]