HIGHLIGHTS
- who: Jun He from the School of Mathematics, Zunyi, China have published the Article: New upper bounds for the dominant eigenvalue of a matrix with Perron-Frobenius property, in the Journal: (JOURNAL)
SUMMARY
Let R be the set of all real numbers and Rn×n be the set of n × n square matrices. Furthermore, √ app + rpS+ (A) - aqq + rqS̄+ (A) ≤ ε, √ aqq + rqS̄+ (A) - app + rpS+ (A) ≤ ε. The authors have app + rpS+ (A) ≤ √ app + rpS+ (A) + aqq + rqS̄+ (A) + ε 2 aqq + rqS̄+ (A) ≤ √ app + rpS+ (A) + aqq + rqS̄+ (A) + ε, 2 and which means that . . .
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