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1 – 3 of 3Sebastian Straßer and Hans-Georg Herzog
The purpose of this paper is to analyse the influence of penalty parameters for an interior penalty Galerkin method, namely, the symmetric interior penalty Galerkin method.
Abstract
Purpose
The purpose of this paper is to analyse the influence of penalty parameters for an interior penalty Galerkin method, namely, the symmetric interior penalty Galerkin method.
Design/methodology/approach
First of all, the solution of a simple model problem is computed and compared to the exact solution, which is a periodic function. Afterwards, a two-dimensional magnetostatic field problem described by the magnetic vector potential A is considered. In particular, penalty parameters depending on the polynomial degree, the properties of the elements and the material are considered. The analysis is performed by varying the polynomial degree and the mesh sizes on a structured and an unstructured mesh. Additionally, the penalty parameter is varied in a specific range.
Findings
Choosing the penalty parameter correctly plays an important role as the stability and the convergence of the numerical scheme can be affected. For a structured mesh, a limiting value for the penalty parameter can be calculated beforehand, whereas for an unstructured mesh, the choice of the penalty parameter can be cumbersome.
Originality/value
This paper shows that there exist different penalty parameters which can be taken into account to solve the considered problems. One can choose a global penalty parameter to obtain a stable solution, which is a sharp estimation. There has always to be the consideration to guarantee the coercivity of the bilinear form while minimising the number of iterations.
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Keywords
Stephan Willerich and Hans-Georg Herzog
The use of gradient-based methods in finite element schemes can be prevented by undefined derivatives, which are encountered when modeling hysteresis in constitutive material…
Abstract
Purpose
The use of gradient-based methods in finite element schemes can be prevented by undefined derivatives, which are encountered when modeling hysteresis in constitutive material laws. This paper aims to present a method to deal with this problem.
Design/methodology/approach
Non-smooth Newton methods provide a generalized framework for the treatment of minimization problems with undefined derivatives. Within this paper, a magnetostatic finite element formulation that includes hysteresis is presented. The non-linear equations are solved using a non-smooth Newton method.
Findings
The non-smooth Newton method shows promising convergence behavior when applied to a model problem. The numbers of iterations for magnetization curves with and without hysteresis are within the same range.
Originality/value
Mathematical tools like Clarke's generalized Jacobian are applied to magnetostatic field problems with hysteresis. The relation between the non-smooth Newton method and other methods for solving non-linear systems with hysteresis like the M(B)-iteration is established.
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Although criticized as illegitimate, literary elements are necessary features of legal argument. In a modern liberal state, law motivates compliance by justifying controversial…
Abstract
Although criticized as illegitimate, literary elements are necessary features of legal argument. In a modern liberal state, law motivates compliance by justifying controversial prescriptions as products of an appropriate process for representing the will of society. Yet because law constructs the will of individual and collective actors in representing them, its representations are necessarily figurative rather than mimetic. In evaluating law's representation of society, citizens of the liberal state are also shaping their own ends. Such self-expressive choices, subjective but non-instrumental, entail aesthetic judgment. Thus the literary elements of rhetorical figuration and aesthetic appeal are fundamental, rather than merely ornamental, to legal justification.