Title :
Matrix extensions of the filtering theory for deterministic traffic regulation and service guarantees
Author :
Chang, Cheng-Shang
Author_Institution :
Dept. of Electr. Eng., Nat. Tsing Hua Univ., Hsinchu, Taiwan
fDate :
6/1/1998 12:00:00 AM
Abstract :
We extend the filtering theory, presented in a previous paper, for deterministic traffic regulation and service guarantees to the matrix setting. Such an extension enables us to model telecommunication networks as linear systems with multiple inputs and multiple outputs under the (min,+)-algebra. Analogous to the scalar setting, there is an associated calculus in the matrix setting, including feedback, concatenation, “filter bank summation”, and performance bounds. As an application of the calculus, we derive service guarantees for networks with nested window flow control. In particular, service guarantees for networks with tandem flow control can be solved explicitly by the Gauss elimination
Keywords :
MIMO systems; band-pass filters; feedback; filtering theory; linear systems; matrix algebra; telecommunication congestion control; telecommunication networks; telecommunication traffic; Gauss elimination; concatenation; deterministic traffic regulation; feedback; filter bank summation; filtering theory; linear systems; matrix extensions; min-plus algebra; multiple input multiple output system; nested window flow control; performance bounds; service guarantees; tandem flow control; telecommunication networks; Algebra; Calculus; Communication system traffic control; Convolution; Feedback; Filtering theory; Global Positioning System; Linear systems; Telecommunication traffic; Traffic control;
Journal_Title :
Selected Areas in Communications, IEEE Journal on
