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Application of Tree-like Structure of Graph to Matrix Analysis. / Buslov, V.A.
11 стр. 2000.Результаты исследований: Иные виды публикаций › иная › научная
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TY - GEN
T1 - Application of Tree-like Structure of Graph to Matrix Analysis
AU - Buslov, V.A.
PY - 2000
Y1 - 2000
N2 - Formulas for matrix determinants, algebraic adjunctions, characteristic polynomial coefficients, components of eigenvectors are obtained in the form of signless sums of matrix elements products taking by special graphs. Signless formulas are very important for singular and stochastic problems. They are also useful for spectral analysis of large very sparse matrices.
AB - Formulas for matrix determinants, algebraic adjunctions, characteristic polynomial coefficients, components of eigenvectors are obtained in the form of signless sums of matrix elements products taking by special graphs. Signless formulas are very important for singular and stochastic problems. They are also useful for spectral analysis of large very sparse matrices.
UR - https://www.semanticscholar.org/paper/Application-of-Tree-like-Structure-of-Graph-to-V.A.Buslov/c02cc2b35575966dd0eb71bfd975f893ebc228bb
UR - https://arxiv.org/abs/math/0001163
M3 - Other contribution
ER -
ID: 9072958