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Mathematical aspects of the minimum critical mass problem

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Part of the Lecture Notes in Mathematics book series (LNM,volume 1324)

Keywords

  • Absolute Continuity
  • Mathematical Aspect
  • Elliptic Differential Operator
  • Extremal Eigenvalue
  • Small Open Neighbourhood

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References

  1. BRIETZKE, E. and NOWOSAD, P., Existence of Minimum Critical Mass Solutions for Diffusion Equations of Reactor Theory, Nonlinear Analysis, 9, 849–860 (1985).

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  2. BRIETZKE, E. and NOWOSAD, P., Mathematical Aspects of Minimum Critical Mass Problem, 23o Seminário Brasileiro de Análise, Campinas, (1986).

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  3. FRIEDLAND, S. and NOWOSAD, P., Extremal Eigenvalue Problems with Indefinite Kernels, Adv. Math. 40, 128–154 (1981).

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  4. GOERTZEL, G., Minimum Critical Mass and Flat-Flux, J.Nucl. Energy 2, 193–201 (1956).

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  5. LEWY, H. and STAMPACCHIA, G., On the Regularity of the Solution of a Variational Inequality, Comm.Pure Appl.Math. 22, 153–188 (1969).

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  6. LITTMAN, W., STAMPACCHIA, G. and WEINBERGER, H.F., Regular Points for Elliptic Equations with Discontinuous Coefficients, Annali Scu Norm.Sup. Pisa 17, 43–77 (1963).

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© 1988 Springer-Verlag

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Brietzke, E., Nowosad, P. (1988). Mathematical aspects of the minimum critical mass problem. In: Cardoso, F., de Figueiredo, D.G., Iório, R., Lopes, O. (eds) Partial Differential Equations. Lecture Notes in Mathematics, vol 1324. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0100782

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  • DOI: https://doi.org/10.1007/BFb0100782

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  • Publisher Name: Springer, Berlin, Heidelberg

  • Print ISBN: 978-3-540-50111-4

  • Online ISBN: 978-3-540-45928-6

  • eBook Packages: Springer Book Archive