J. Zahorjan et al., #Balanced job bound analysis of queueuing networks," Comm. ACM,vol. 25, Feb. 1982, pp. 134#141.  Home/Search   Document Not in Database   Summary   Related Articles   Check

....Q m (S) n (m n Gamma 1)S I(S) n=S Table 2.1: Service rates of basic building blocks The service rate for a block of m equivalent queueing centres Q m needs some explanation. The given rate can be derived using aggregation as described in section 2. 2 (a similar derivation is presented in [21]) Given a short circuited system of m identical queueing centres, each with a service demand D i = S (1 i m) With a population of n jobs, the job response time at every centre is R i = 1 Q i (n Gamma 1) S. Because the centres are identical, the n jobs will be distributed evenly over the ....

J. Zahorjan et al., "Balanced job bound analysis of queueuing networks," Communications of the ACM, vol. 25, Feb. 1982, pp. 134--141.

....block Service rate (n) Q(S) 1=S Qk (S) min(n; k) S Q m (S) n (m n Gamma 1)S I(S) n=S The service rate for a block of m equivalent queueing centres Q m needs some explanation. The given rate can be derived using aggregation as described in Sect. 2. 1 (a similar derivation is presented in [30]) Given a short circuited system of m identical queueing centres, each with a service demand D i = S (1 i m) With a population of n jobs, the job response time at every centre is R i = 1 Q i (n Gamma 1) S. Because the centres are identical, the n jobs will be distributed evenly over the ....

J. Zahorjan et al., "Balanced job bound analysis of queueuing networks," Comm. ACM, vol. 25, Feb. 1982, pp. 134--141.

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J. Zahorjan et al., #Balanced job bound analysis of queueuing networks," Comm. ACM,vol. 25, Feb. 1982, pp. 134#141.

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