A queueing/inventory and an insurance risk model. (11th January 2017)

Record Type:
Journal Article
Title:
A queueing/inventory and an insurance risk model. (11th January 2017)
Main Title:
A queueing/inventory and an insurance risk model
Authors:
Boxma, Onno
Essifi, Rim
Janssen, Augustus J. E. M.
Abstract:
Abstract: We study an M/G/1-type queueing model with the following additional feature. The server works continuously, at fixed speed, even if there are no service requirements. In the latter case, it is building up inventory, which can be interpreted as negative workload. At random times, with an intensity ω( x ) when the inventory is at level x >0, the present inventory is removed, instantaneously reducing the inventory to 0. We study the steady-state distribution of the (positive and negative) workload levels for the cases ω( x ) is constant and ω( x ) = a x . The key tool is the Wiener–Hopf factorization technique. When ω( x ) is constant, no specific assumptions will be made on the service requirement distribution. However, in the linear case, we need some algebraic hypotheses concerning the Laplace–Stieltjes transform of the service requirement distribution. Throughout the paper, we also study a closely related model arising from insurance risk theory.
Is Part Of:
Advances in applied probability. Volume 48:Number 4(2016)
Journal:
Advances in applied probability
Issue:
Volume 48:Number 4(2016)
Issue Display:
Volume 48, Issue 4 (2016)
Year:
2016
Volume:
48
Issue:
4
Issue Sort Value:
2016-0048-0004-0000
Page Start:
1139
Page End:
1160
Publication Date:
2017-01-11
Subjects:
M/G/1 queue, -- Cramér–Lundberg insurance risk model, -- workload, -- inventory, -- ruin probability, -- Wiener–Hopf technique
Primary 60K25, -- 90B22, -- 91B30, -- Secondary 47A68
Probabilities -- Periodicals
Stochastic models -- Periodicals
Electronic journals
Periodicals
519.2
Journal URLs:
http://www.appliedprobability.org/content.aspx?Group=journals&Page=apjournals
DOI:
10.1017/apr.2016.68
Languages:
English
ISSNs:
0001-8678
Deposit Type:
Legaldeposit
View Content:
Available online (eLD content is only available in our Reading Rooms)
Physical Locations:
British Library HMNTS - ELD Digital store
Ingest File:
5269.xml