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Office: Room 2605,
Department of Mathematics,
Shanghai Jiao Tong University
Mail: xiaodong@sjtu.edu.cn
Mailing-Address: No.800,
Dong Chuan Road, Shanghai, P.C: 200240
Telephone: 54743148-2605
Combinatorial matrix theory is concerned with the use of matrix theory and linear algebra (for example, the adjacency, Laplacian matrices of a graph and the incidence matrix of a combinatorial design, etc.) in proving combinatorial theorems and describing and classifying combinatorial constructions. It is also concerned with the use of combinatorial ideas and reasoning in the finer analysis of matrices and with intrinsic combinatorial properties of matrix arrays. While combinatorial matrix theory has emerged as a vital area of research over the last few decades, research in combinatorial matrix proceeds in a number of diverse directions simultaneously.
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------最新论文------

Complete multipartite graphs are determined by their distancespectra...........
The inertia of weighted unicyclic graphs...........
A NEW ENTANGLEMENT MEASURE_D-CONCURRENCE...........
The signless Laplacian coefficients and incidence energy of bicyclic graphs.......3/3
Sharp bounds for the signless Laplacian spectral radius in terms of clique number.......3/1

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