FACTORS IN DETERIORATING INVENTORY MODELS :A LITERATURE REVIEW ANALYSIS

Amrouche, C. and Rejaiba, A. Navier-Stokes equations with Navier boundary condition. Mathematical Methods in the Applied Sciences, 39(17):5091–5112, 2016.

Arrieta, J., Carvalho, A. N., and Bernal, A. R. Parabolic problems with nonlinear boundary conditions and critical nonlinearities. Journal of Differential Equations, 165:376–406, 1999.

Benvenutti, M. J. and Ferreira, L. C. F. Global stability of large solutions for the Navier-Stokes equations with Navier boundary conditions. Nonlinear Analysis: Real World Applications, 43:308–322, 2018.

Bernal, A. R. and Tajdine, A. Nonlinear balance for reaction-diffusion equations under the nonlinear boundary conditions: dissipative and blow-up. Journal of Differential Equations, 169:332–372, 2001.

Beir˜ao da Veiga, H. and Crispo, F. Sharp inviscid limit results under Navier type boundary conditions: An L p theory. Journal of Mathematical Fluid Mechanics, 12(3):397–411, 2010.

Beir˜ao da Veiga, H. and Crispo, F. The 3-D inviscid limit result under slip boundary conditions, A negative answer. Journal of Mathematical Fluid Mechanics, 14(1):55–59, 2012.

Berselli, L. C. and Spirito, S. Weak solution to the Navier-Stokes equations constructed by semi-discretization are suitable. Contemporary Mathematics, 666:85-97, 2016.

Bucur, D., Feireisl, E., Ne˘casov, S., and Wolf, J. On the asymptotic limit of the Navier– ˘ Stokes system on domains with rough boundaries. Journal of Differential Equations, 244(11):2890-2908, 2008.

Caffarelli, L., Kohn, R., and Nirenberg, L. Partial regularity of the Navier-Stokes equation. Communications on Pure and Applied Mathematics, 35:771–831, 1982.