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A Mathematical Study in the Theory of Dynamic Population

โœ Scribed by M. Boulanouar

Publisher
Elsevier Science
Year
2001
Tongue
English
Weight
202 KB
Volume
255
Category
Article
ISSN
0022-247X

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โœฆ Synopsis

This article deals with a mathematical model of an age structured proliferating w cell population originally proposed by Lebowitz and Rubinow J. Math. Biol. 1 ลฝ .

x 1974 , 17แŽ36 . Individual cells are distinguished by age and by cell cycle length. The cell cycle length is considered as an inherited property determined at birth. Here, general boundary conditions are considered by means of a linear and bounded operator K. After establishing the theorem of traces, we show that the model is well posed in the sense of the theory of semigroup without restriction on the boundary operator K. We study the positivity and the irreducibility of the generated semigroup and we calculate its essential type. The asymptotic behavior is obtained in the uniform topology.

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## Abstract The solution to the linearized equations of dynamical linear piezoelectricity is shown to be unique without requiring definiteness conditions in the elastic coefficients. Only continuity of the normal component of the electric displacement field across the boundary between the elastic b