Now showing items 1-10 of 143
Heat and mass transfer model in wood chip drying
(Soc Wood Sci TechnolMadisonEUA, 2000)
CHARACTERIZATION OF DIFFUSIONNAL TRANSFERS OF BOUND WATER AND WATER VAPOR IN BEECH AND SPRUCE
(Universidad del Bío-Bío, 2006)
A Lotka-Volterra symbiotic model with cross-diffusion
(Academic Press Inc Elsevier ScienceSan DiegoEUA, 2009)
LITHIUM INTERCALATION IN MOO3 - A COMPARISON BETWEEN CRYSTALLINE AND DISORDERED PHASES
(Springer VerlagNew York, 1994)
Large time behavior for a nonlocal diffusion equation with absorption and bounded initial data
(Amer Inst Mathematical Sciences, 2011-10)
We study the large time behavior of nonnegative solutions of the Cauchy problem u t = R J ( x − y )( u ( y,t ) − u ( x,t )) dy − u p , u ( x, 0) = u 0 ( x ) ∈ L ∞ , where | x | α u 0 ( x ) → A > 0 as | x |→∞ . One of our ...
RCM: A new model accounting for the non-linear chloride binding isotherm and the non-equilibrium conditions between the free- and bound-chloride concentrations
In this paper a new theoretical model for the Rapid Chloride Migration test is presented. This model accounts for the non-linear chloride binding isotherm and the non-equilibrium conditions between the free- and bound-chloride ...
Estimation of effective diffusivity in drying of heterogeneous porous media
(Amer Chemical SocWashingtonEUA, 2000)
Decay bounds for nonlocal evolution equations in Orlicz spaces
(Duke University Press, 2016-03)
We show decay bounds of the form ∫Rd ϕ(u(x,t))dx≤Ct-μ for integrable and bounded solutions to the nonlocal evolution equation ut(x,t)= ∫Rd J(x,y)G(u(y,t)-u(x,t))(u(y,t)-u(x,t))dy+f(u(x,t)). Here G is a nonnegative and even ...