ROOF
发表于 2025-3-30 12:13:00
Flows, importance, we shall discuss network flows in considerable depth. In particular, we will give detailed presentations of four of the most important algorithms solving this problem, namely the labelling algorithm of Ford and Fulkerson, the algorithm of Dinic, the MKM-algorithm, and the preflow-push algorithm of Goldberg and Tarjan.
爱了吗
发表于 2025-3-30 16:26:51
Combinatorial Applications,l alternative approach of taking Philip Hall’s marriage theorem—which we will treat in Sect. .—as the starting point of transversal theory, this way of proceeding has a distinct advantage: it also yields algorithms allowing explicit constructions for the objects in question.
crutch
发表于 2025-3-30 16:57:00
Matchings,n in the bipartite case. We shall also present the most important theoretical results on matchings in general graphs: the 1-factor theorem of Tutte characterizing the graphs with a prefect matching, the more general Berge-Tutte formula giving the size of a maximal matching, and the Gallai-Edmonds structure theory.
Vaginismus
发表于 2025-3-31 00:40:07
https://doi.org/10.1007/978-3-531-91853-2c digraphs. At the end of the chapter we consider a class of apparently very difficult problems (the so-called NP-complete problems) which plays a central role in complexity theory; we will meet this type of problem over and over again in this book.
怎样才咆哮
发表于 2025-3-31 04:53:28
Mädchenfreundschaften in der AdoleszenzBFS), namely depth first search—which may also be thought of as a strategy for traversing a maze. In addition, we present various theoretical results, such as characterizations of 2-connected graphs and of edge connectivity.
SPER
发表于 2025-3-31 07:31:40
Algorithms and Complexity,c digraphs. At the end of the chapter we consider a class of apparently very difficult problems (the so-called NP-complete problems) which plays a central role in complexity theory; we will meet this type of problem over and over again in this book.
novelty
发表于 2025-3-31 11:09:16
Connectivity and Depth First Search,BFS), namely depth first search—which may also be thought of as a strategy for traversing a maze. In addition, we present various theoretical results, such as characterizations of 2-connected graphs and of edge connectivity.