A Cohesive Structure Based Bipartite Graph Analytics System

The best lower bound known on the crossing number of the complete bipartite graph is : $$cr(K_{m,n}) \geq (1/5)(m)(m-1)\lfloor n/2 \rfloor \lfloor(n-1)/2\rfloor$$ In this paper we prove that: $$cr(K_{m,n}) \geq (1/5)m(m-1)\lfloor n/2 \rfloor \lfloor (n-1)/2 \rfloor + 9.9 \times 10^{-6} m^2n^2$$ for sufficiently large $m$ and $n$.

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Generalization of the Symmetric Starter of the Orthogonal Double Covers of the Complete Bipartite Graph

Menoufia Journal of Electronic Engineering Research ◽

10.21608/mjeer.2006.64856 ◽

2006 ◽

Vol 16 (2) ◽

pp. 171-177

Author(s):

S. A. El-Serafi ◽

R. A. El-Shanawany ◽

M. Sh. Higazy

Keyword(s):

Bipartite Graph ◽

Complete Bipartite Graph ◽

Double Covers

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Join Products K2,3 + Cn

Mathematics ◽

10.3390/math8060925 ◽

2020 ◽

Vol 8 (6) ◽

pp. 925

Author(s):

Michal Staš

Keyword(s):

Bipartite Graph ◽

Complete Bipartite Graph ◽

Crossing Number ◽

Arithmetic Means ◽

Minimum Number ◽

Edge Crossings

The crossing number cr ( G ) of a graph G is the minimum number of edge crossings over all drawings of G in the plane. The main goal of the paper is to state the crossing number of the join product K 2 , 3 + C n for the complete bipartite graph K 2 , 3 , where C n is the cycle on n vertices. In the proofs, the idea of a minimum number of crossings between two distinct configurations in the various forms of arithmetic means will be extended. Finally, adding one more edge to the graph K 2 , 3 , we also offer the crossing number of the join product of one other graph with the cycle C n .

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Spectral Gap of the Largest Eigenvalue of the Normalized Graph Laplacian

Communications in Mathematics and Statistics ◽

10.1007/s40304-020-00222-7 ◽

2021 ◽

Author(s):

Jürgen Jost ◽

Raffaella Mulas ◽

Florentin Münch

Keyword(s):

Lower Bound ◽

Bipartite Graph ◽

Spectral Gap ◽

Complete Bipartite Graph ◽

Graph Laplacian ◽

New Method ◽

Single Edge ◽

Largest Eigenvalue ◽

Complement Graph ◽

The Largest Eigenvalue

AbstractWe offer a new method for proving that the maxima eigenvalue of the normalized graph Laplacian of a graph with n vertices is at least $$\frac{n+1}{n-1}$$ n + 1 n - 1 provided the graph is not complete and that equality is attained if and only if the complement graph is a single edge or a complete bipartite graph with both parts of size $$\frac{n-1}{2}$$ n - 1 2 . With the same method, we also prove a new lower bound to the largest eigenvalue in terms of the minimum vertex degree, provided this is at most $$\frac{n-1}{2}$$ n - 1 2 .

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