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CS SOR: Polling models. Vacation models Multi type branching processes Polling systems (cycle times, queue lengths, waiting times, conservation laws, service policies, visit orders). Richard J. Boucherie department of Applied Mathematics University of Twente. Polling models.
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CS SOR: Polling models • Vacation models • Multi type branching processes • Polling systems (cycle times, queue lengths, waiting times, conservation laws, service policies, visit orders) Richard J. Boucheriedepartment of Applied Mathematics University of Twente
Polling models • N infinite buffer queues, Q1, …, QN • Service time distribution at queue j: Bj(.), mean βj, LST βj(.) • Poisson arrivals to queue j at rate λj • Single server in cyclic order • Switch over times: random variable Sj, mean σ j, LST σj(.) • This week:vacation queues • Next week…..Multi-type branching processes (Resing) • In two weeks: polling • Then: 3 presentations by you
Polling modelsToday: Vacation models • S.C. Borst. Polling Systems, CWI: Tract, chapters 1 – 3. • S.W. Fuhrmann, R.B. Cooper. Operations Research, Sep/Oct 1985, Vol. 33 Issue 5, p1117-1129 • J.A.C. Resing. Polling systems and multitype branching processes, Queueing Systems, 13, p 409 – 426 • I. Adan: Queueing Systems, lecture notes • M/G/1 queue, PK formula • M/G/1 queue with vacations • M/G/1 queue with Generalized vacations
M/G/1 queue • Poisson arrival process rate λ, single server, General service times, mean 1/μ=E(B) • Service time distribution FB(.), density fB(.), LST B • state: pair (n,x), n=#customer, x= received service time • Pollaczek-Khintchine formulafor queue length
Polling modelsToday: Vacation models • S.C. Borst. Polling Systems, CWI: Tract, chapters 1 – 3. • S.W. Fuhrmann, R.B. Cooper. Operations Research, Sep/Oct 1985, Vol. 33 Issue 5, p1117-1129 • J.A.C. Resing. Polling systems and multitype branching processes, Queueing Systems, 13, p 409 – 426 • I. Adan: Queueing Systems, lecture notes • M/G/1 queue, PK formula • M/G/1 queue with vacations • M/G/1 queue with Generalized vacations
Ancestral line • I0 group of customers • I1 set of customers who arrive while members of I0 are being served: first generation offspring of I0 • Ik, k>1 set of customers who arrive while members of Ik-1 are being served: k-th generation offspring of I0 • ancestral line of I0 • For us: I0 single customer, or set of customers arriving during some vacation • Vacation customer: arrive while server is on vacation • To each customer, C, corresponds a unique vacation customer, A, such that C is in ancestral line of A: A is ancestor of C.
Vacation queue: exhaustive service • Consider M/G/1 queue • Server takes a vacation (general distribution) when the system becomes idle • Upon return from vacation, if system idle new vacationotherwise serve until system idle: exhaustive service • No preemption • Theorem: Queue length decomposition N=NM/G/1 + NIwhere equality is in distribution, and N:= queue length at arbitrary epochNM/G/1 := queue length at arbitrary epoch in corresponding M/G/1NI := queue length at arbitrary epoch in vacation periodNM/G/1 and NI are independent r.v.
Vacation queue: Exhaustive service • Alternative formulation: • ψ(.) = p.g.f. stat distrib # cust random time • π(.) = p.g.f. idem in corresp M/G/1 queue • α(.) = p.g.f. # arrivals during vacation period = Vac(λ-λz) • π(z)=
Polling modelsToday: Vacation models • S.C. Borst. Polling Systems, CWI: Tract, chapters 1 – 3. • S.W. Fuhrmann, R.B. Cooper. Operations Research, Sep/Oct 1985, Vol. 33 Issue 5, p1117-1129 • J.A.C. Resing. Polling systems and multitype branching processes, Queueing Systems, 13, p 409 – 426 • I. Adan: Queueing Systems, lecture notes • M/G/1 queue, PK formula • M/G/1 queue with vacations • M/G/1 queue with Generalized vacations
Generalized vacations: assumptions • Server can take vacation at any time: vacation = server unavailable • Service time independent of sequence of vacation periods preceding that service time. • Order of service independent of service times. • Service non-preemptive • Rules that govern when server begins and ends vacations do not anticipate future jumps of the arrival process.
Generalized vacations: examples • Standard vacation model: vacation upon idling • N-policy: server waits until exactly N customers present before starting service, then work continues until system empty • M/G/1 with gated vacations: when server returns from vacation, he accepts only those customers waiting upon return, service of other customers deferred to next visit • Limited service: serve at most k customers • Polling model • Priority system
Generalized vacations • Decomposition property holds for any vacation system under assumptions stated. • Theorem: Consider a random (tagged) customer C. Let A the ancestor, I0 the set of vacation customers who arrived during the same vacation to which A arrived. Let I the ancestral line of I0, and let X the number of members of I present in system when C departs. X has p.g.f. • Proof: there may have been other customers in system at start of vacation. Due to LIFO these will remain in system, rest as proof last time
Generalized vacations • Assume that the number of customers that arrive during a vacation is independent of the number of customers present in the system when vacation began. • Theorem: Under this assumption • Proof: LIFO, p.g.f. of number of customers already present at beginning of vacation. Independence yields product.
Generalised vacations • Theorem: Queue length decomposition N=NM/G/1 + NIwhere equality is in distribution, and N:= queue length at arbitrary epochNM/G/1 := queue length at arbitrary epoch in corresponding M/G/1NI := queue length at arbitrary epoch in vacation periodNM/G/1 and NI are independent r.v. • Theorem: Work decomposition V=VM/G/1 + VIwhere equality is in distribution, and V:= work at arbitrary epochVM/G/1 := work at arbitrary epoch in corresponding M/G/1VI := work at arbitrary epoch in vacation periodVM/G/1 and VI are independent r.v.
Generalized vacations: Gated service • Gated service: At time tn server finds Xn customers. Gate closes. Server serves those Xn then takes vacation of length Vn and returns at time tn+1 • Recall RecursionMarkov chain; from recursion:
Generalized vacations: Gated service • Assume limiting distribution of Xn n ∞ exists, with pgf X(z), thenLet then
Generalized vacations: Gated service • Let M ∞ inresulting infinite product exists if ρ<1, and • Hence, if ρ<1
Convergence hence, indeed if ρ<1 • Observe • So that infinite product indeed converges
Interpretation: Branching processes (Wolff, sec 3-9) • Let Yr (i.i.d) be the first generation off-spring of individual r • Xn n-th generation off-spring of particular individual • Pgf n-th generation off-spring individual
Branching processes (Wolff, sec 3-9) • Xn+1 is sum of descendants of the j individuals of the first generation:
Generalized vacations: Gated service • Gated service: recall:Defineis p.g.f. number of the k-th generation offspringfirst previous gated period, second previous gated period
Generalized vacations • Server can take vacation at any time • Service time independent of sequence of vacation periods preceding that service time. • Order of service independent of service times. • Service non-preemptive • Rules that govern when server begins and ends vacations do not anticipate future jumps of the arrival process. • Number of customers that arrive during a vacation is independent of the number of customers present in the system when vacation began. • Theorem:
Polling models • N infinite buffer queues, Q1, …, QN • Service time distribution at queue j: Bj(.), mean βj, LST βj(.) • Poisson arrivals to queue j at rate λj • Single server in cyclic order • Switch over times: random variable Sj, mean σ j, LST σj(.) • Next week….. • Multi-type branching processes • and polling (Resing)
