spectral radius造句1. Estimate for the spectral radius of iterative matrices.
2. By computing the spectral radius of matrix exponent, it is very easy to evaluate the asymptotical stabilization.
3. In chapter 5, we mainly study the distance spectral radius.
4. Spectral radius is an important global characteristics of an irreducible Markov chain.
5. It is proved in this paper that the minimal characterizing number of a matrix is equal to the spectral radius of the corresponding non-negative matrix.
6. In this paper, we give an estimate of the upper and lower hounds on the spectral radius of a nonnegative matrix and compare the bounds with related those in other literatures.
7. Conclusion Norm of operator is very important to estimate the spectral radius of operator.
8. It is well known that, for nonsingular systems where $A$ is invertible, the iterative method converges if and only if the spectral radius of the iteration matrix is strictly less than 1.
9. Firstly, we present some sharp upper bounds on the adjacency spectral radius of graphs, and show that these bounds are somewhat better than the known ones.
10. We give a proof of some upper bounds for the spectral radius of graphs.
11. We have obtained some sharp upper and lower bounds of the spectral radius of a Q-spectrum, corresponding to the Q-matrix.
12. For solving the linear system with the iterative method, it is very important to estimate the spectral radius of the iterative matrices and give the convergence analysis.
13. In this paper, some multiple positive solutions theorems of a class of operator equation are established by using fixed po int index and the spectral radius of the relative linear operator.
14. In this paper, the author obtains an upper bound of the spectral radius of oriented graphs by letting D be an oriented graph with n vertices.
15. They are important theoretical foundation of the study about nonnegative matrices spectral radius.
16. Second, a method to determine the stability of transfer matrix , using a sufficient condition based on spectral radius, is discussed.