Stability analysis for a class of 2D continuous-discrete linear systems with dynamic boundary conditions
Stability analysis for a class of 2D continuous-discrete linear systems with dynamic boundary conditions
Differential linear repetitive processes are a class of continuous-discrete 2D linear systems of both practical and algorithmic interest. This paper undertakes a stability analysis for these processes in the presence of a general set of boundary conditions. The major conclusion is that a correct characterization of stability for these processes is critically dependent on the structure of these conditions.
55-60
Owens, D H
db24b8ef-282b-47c0-9cd2-75e91d312ad7
Rogers, E
611b1de0-c505-472e-a03f-c5294c63bb72
1999
Owens, D H
db24b8ef-282b-47c0-9cd2-75e91d312ad7
Rogers, E
611b1de0-c505-472e-a03f-c5294c63bb72
Owens, D H and Rogers, E
(1999)
Stability analysis for a class of 2D continuous-discrete linear systems with dynamic boundary conditions.
Systems & Control Letters, 37, .
Abstract
Differential linear repetitive processes are a class of continuous-discrete 2D linear systems of both practical and algorithmic interest. This paper undertakes a stability analysis for these processes in the presence of a general set of boundary conditions. The major conclusion is that a correct characterization of stability for these processes is critically dependent on the structure of these conditions.
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Published date: 1999
Organisations:
Southampton Wireless Group
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Local EPrints ID: 250670
URI: http://eprints.soton.ac.uk/id/eprint/250670
PURE UUID: a1156010-c6dd-45b6-a6ca-1d406c4e89d5
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Date deposited: 04 Mar 2004
Last modified: 18 Oct 2022 01:32
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Author:
D H Owens
Author:
E Rogers
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