β Scribed by S.A. Abramov
No coin nor oath required. For personal study only.
π SIMILAR VOLUMES
A closed form solution of a second order linear homogeneous difference equation with variable coefficients is presented. As an application of this solution, Ε½ . we obtain expressions for cos n and sin n q 1 rsin as polynomials in cos .
In this paper, we obtain the global regularity estimates in Orlicz spaces for second-order divergence elliptic and parabolic equations with BMO coefficients in the whole space. In fact, the global result can follow from the local estimates. As a corollary we obtain L p -type regularity estimates for
## Abstract This article demonstrates that exponential convergence of the flux error can be attained with secondβ and fourthβorder accurate finite difference equations even for such electrochemical kineticβdiffusion systems where difficultβtoβresolve solution structures occur on account of fast sec
RL constants in eq. (6), dimensionless Reynolds number, dimensionless u superficial velocity, m s-' Wi Weissenberg number, dimensionless Greek letters ,' shear rate, s-l E voidage of static mixer assembly, dimensionless T shear stress, Pa =11 -\*22 primary normal stress difference, Pa P density of l