Nonlinear multiscale viscosity methods and time integration schemes for solving compressible Euler equations

Name: SÉRGIO SOUZA BENTO

Publication date: 29/06/2018
Advisor:

Namesort descending Role
ISAAC PINHEIRO DOS SANTOS Co-advisor *
LUCIA CATABRIGA Advisor *

Examining board:

Namesort descending Role
LUCIA CATABRIGA Advisor *
MARIA CLAUDIA SILVA BOERES Internal Examiner *

Summary: In this work we present nonlinear multiscale finite element methods for solving compressible Euler equations. The formulations are based on the strategy of separating scales -- the core of the variational multiscale (finite element) methodology. The subgrid scale space is defined using bubble functions that vanish on the boundary of the elements, allowing to use a local Schur complement to define the resolved scale problem. The resulting numerical procedure allows the fine scales to depend on time. The formulations proposed in this work are residual based considering different ways for the artificial viscosity to act on all scales of the discretization. In the first formulation a nonlinear operator is added on all scales WHEREas in the second different nonlinear operators are included on macro and micro scales. We evaluate the efficiency of the formulations through numerical studies, comparing them with the SUPG combined with the shock-capturing operator YZBeta and the CAU methodologies. Another contribution of this work concerns the time integration procedure. Density-based schemes suffer with undesirable effects of low speed flow including low convergence rate and loss of accuracy. Due to this phenomenon, local preconditioning is applied to the set of equations in the continuous case. Another alternative to solve this deficiency consists of using time integration methods with a stiff decay property. For this purpose, we propose a predictor-corrector method based on Backward Differentiation Formulas (BDF) that is not defined in the traditional sense found in the literature, i.e., using a predictor based on extrapolation.

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