Andere Kunden interessierten sich auch für
![Split-Wing Electric Distributed Propulsion Inlets]( "Split-Wing Electric Distributed Propulsion Inlets")
Split-Wing Electric Distributed Propulsion Inlets36,99 €![A high-order discontinuous Galerkin method for unsteady compressible flows with immersed boundaries]( "A high-order discontinuous Galerkin method for unsteady compressible flows with immersed boundaries")
A high-order discontinuous Galerkin method for unsteady compressible flows with immersed boundaries36,30 €![Finite Element Analysis for Satellite Structures]( "Finite Element Analysis for Satellite Structures")
Finite Element Analysis for Satellite Structures110,99 €![A multigrid ghost-cell method for the solution of the Euler equations]( "A multigrid ghost-cell method for the solution of the Euler equations")
A multigrid ghost-cell method for the solution of the Euler equations38,99 €![A Spectral Method Applied to Re-entry Flow Problems. Volume 2]( "A Spectral Method Applied to Re-entry Flow Problems. Volume 2")
A Spectral Method Applied to Re-entry Flow Problems. Volume 270,99 €![Network Centric Airborne Defense Element]( "Network Centric Airborne Defense Element")
Network Centric Airborne Defense Element22,99 €![ADVANCED ALGORITHMS FOR MULTI-SENSOR MULTI-TARGET TRACKING]( "ADVANCED ALGORITHMS FOR MULTI-SENSOR MULTI-TARGET TRACKING")
ADVANCED ALGORITHMS FOR MULTI-SENSOR MULTI-TARGET TRACKING44,99 €
The least-squares finite element method (LSFEM) has many attractive characteristics such as the lack of an inf-sup condition and the resulting symmetric positive system of algebraic equations unlike Galerkin finite element method (GFEM). However, the higher continuity requirements for second-order terms in the governing equations force the introduction of additional unknowns through the use of an equivalent first-order system of equations or the use of C¹ continuous basis functions, limiting the application of LSFEM to large-scale practical problems. A novel finite element method is proposed that employs a least-squares method for first-order derivatives and a Galerkin method for second order derivatives, thereby avoiding the need for additional unknowns required by a pure LSFEM approach. When the unsteady form of the governing equations is used, a streamline upwinding term is introduced naturally by the least-squares method. The method is stable for convection-dominated flows and allows for equal-order basis functions for both pressure and velocity. Various incompressible and compressible flow benchmark problems have been solved using low-order C continuous elements.