The Bilinear, Modal State Equations for Age-Dependent Growth ControlSource: Journal of Dynamic Systems, Measurement, and Control:;1981:;volume( 103 ):;issue: 002::page 89Author:J. W. Brewer
DOI: 10.1115/1.3139660Publisher: The American Society of Mechanical Engineers (ASME)
Abstract: There have been previous attempts to model biological processes as bilinear systems [4,9,10]. In these early studies any member of a population was taken to be quite like any other so that the variation of fertility and susceptibility to mortality with age was ignored. In this paper, however, the age-dependent nature of biological growth [5] is accounted for. The modal (eigenfunction) analysis of the basic partial differential equation of age-dependent growth is shown to result in a system of bilinear equations. (The basic mathematical model is a non-self-adjoint operator with a discrete spectrum and the modes are coupled by the control term.) The impulse control of a truncated version of this system of equations is then discussed. It is anticipated that the results presented here will aid planning for optimal amounts of pesticides to agro-ecosystems or for optimal amounts of drugs (or radiations) to unwanted cell populations.
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| contributor author | J. W. Brewer | |
| date accessioned | 2017-05-08T23:10:48Z | |
| date available | 2017-05-08T23:10:48Z | |
| date copyright | June, 1981 | |
| date issued | 1981 | |
| identifier issn | 0022-0434 | |
| identifier other | JDSMAA-26066#89_1.pdf | |
| identifier uri | http://yetl.yabesh.ir/yetl/handle/yetl/94368 | |
| description abstract | There have been previous attempts to model biological processes as bilinear systems [4,9,10]. In these early studies any member of a population was taken to be quite like any other so that the variation of fertility and susceptibility to mortality with age was ignored. In this paper, however, the age-dependent nature of biological growth [5] is accounted for. The modal (eigenfunction) analysis of the basic partial differential equation of age-dependent growth is shown to result in a system of bilinear equations. (The basic mathematical model is a non-self-adjoint operator with a discrete spectrum and the modes are coupled by the control term.) The impulse control of a truncated version of this system of equations is then discussed. It is anticipated that the results presented here will aid planning for optimal amounts of pesticides to agro-ecosystems or for optimal amounts of drugs (or radiations) to unwanted cell populations. | |
| publisher | The American Society of Mechanical Engineers (ASME) | |
| title | The Bilinear, Modal State Equations for Age-Dependent Growth Control | |
| type | Journal Paper | |
| journal volume | 103 | |
| journal issue | 2 | |
| journal title | Journal of Dynamic Systems, Measurement, and Control | |
| identifier doi | 10.1115/1.3139660 | |
| journal fristpage | 89 | |
| journal lastpage | 94 | |
| identifier eissn | 1528-9028 | |
| tree | Journal of Dynamic Systems, Measurement, and Control:;1981:;volume( 103 ):;issue: 002 | |
| contenttype | Fulltext |