Totally analytical closure of space filtered Navier–Stokes for arbitrary Reynolds number: Part II. Resolution algorithms, validations

What is it about?

CFD capability advancement unstagnation: aFNS theory contribution to CFD advancement unstagnation is documented in three parts. Mathematical formalities and resolution of the numerous algorithmic issues required for aFNS theory PDE system to be bounded domain well-posed constitute Part I. Therein derived O(4)approximate deconvolution (AD) based Galerkin differential definition formulated BCE and DBC resolution algorithms are linear tensor product finite element (FE) basis implemented, Part II. Linear FE basis implemented optimal Galerkin weak form aFNS theory coupled resolution algorithms a posteriori data validate both formulations including an asymptotic error estimate with regular mesh refinement confirmation of convergence.

Featured Image