Tandem Queueing Systems with Blocking |
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2.3 we know 3.3.1 Specific description 3.3.2 The content b₂ behavior of Y¸(t buffer in front buffer j-1 buffer sizes buffer space consider counterpart in system customer at station customer in buffer customer leaves customer n customers in front decrease the departure define the departure defined for system Definition of departure E-system equal to B+2 following corollary forms an irreducible front of station Hence Hildebrand 67 i=1 and j=m idle infinite capacity infinite supply initial isomorphism j-1 is never keMi last station Lavenberg 78 leaves station leaves the system Markov chain number of customers number of stations Output and departure P₂(n PE(n previous section probability 1/2 rate is undefined rate of system reduction method Sakasegawa station 2 station station j-1 station k station system supply of customers system E system F systems with blocking tandem queueing systems theorem 3.1 total content function Y₁(t Y₂(t Yamazaki G zero