STABILITY ON SOLUTION OF POPULATION EVOLUTION EQUATIONS WITH APPLICATIONS

  • Published : 2000.10.01

Abstract

We prove the non-homogeneous boundary value problem for population evolution equations is well-posed in Sobolev space H(sup)3/2,3/2($\Omega$). It provides a strictly mathematical basis for further research of population control problems.

Keywords

References

  1. Science Exploration v.3 no.4 On regularity of soution for population evolution equations and applications in population control Chen;R. Z.
  2. J. Sys. Sci and Math Scis. v.6 On stability of nonstationary urban and rural population control systems and critical fertility rates of females Chen. R. Z.;Gao;H.
  3. J. Northeast Normal univ. no.3 The existen and uniqueness of a nonlinear population evolutionary equation Chen;R. Z;Xing;Z.Y.
  4. Linear partial differential operators hormander;L.
  5. Non-Hornogeneous boundary value problems and application v.Ⅱ Lions;J. L.;Magenes;E.
  6. Population Planning Olsder;G. J;Stijbos;R. C. W.
  7. Theory of engineering control Qian;X. S.;Song J.
  8. Math. Modelling v.2 no.1 On stability theory of population systems and critical fertility Song J.;Yu J. Y.