Adsorption in ℝn
The mathematical description of adsorption of a gas flowing along a given velocity field ∀H through a bounded C1-domain G in Rn filled by an adsorbing material leads to the system of PDE’s for the unknown functions where the gradient is with respect to x, ε is a given positive parameter, the values of a are specified at t = 0, and certain boundary conditions are fixed for u on the boundary of G. It is shown that the Cauchy-boundary-value problem is well posed in the Lp spaces, and the regularity properties of a solution are studied. We also show that the solution of (*) converges to the solution of at+ ∀H · ∀(g(a)) = 0 as ε ↓ 0. © 1994, Khayyam Publishing.
Differential and Integral Equations
Oppenheimer, S., & Goldstein, J. (1994). Adsorption in ℝn. Differential and Integral Equations, 7 (2), 483-500. Retrieved from https://digitalcommons.memphis.edu/facpubs/4125