Fully Discrete Scheme for Bean's Critical-state Model with Temperature Effects in Superconductivity

Abstract: This paper examines the fully discrete analysis of a hyperbolic Maxwell-type variational inequality with temperature effects arising from Bean's critical-state model in type-II (hightemperature) superconductivity. Here, temperature dependence is included in the critical current due to its main importance for the realization of superconducting effects, as confirmed through physical measurements. We propose a fully discrete scheme based on the implicit Euler in time and a mixed FEM in space consisting of Nédélec… Show more

“…This paper is a continuation of the recent papers [32,33] on hyperbolic Maxwell variational inequalities (VI), including those arising in high-temperature superconductivity and electromagnetic shielding (cf. [14,27,28]). The goal of the present paper is to explore hyperbolic Maxwell QVI arising from the Bean-Kim model (B1)-(B3) with magnetic field and temperature dependence in the critical current j c = j c (θ, H).…”

“…also [32] for a more general class of hyperbolic Maxwell VI). The pure temperature dependence j c = j c (x, θ(x, t)) was considered in the subsequent paper [27] focusing on its fully discrete analysis. The present paper extends [27,30]: We consider the more realistic case j c = j c (x, θ(x, t), H(x, t)) with less regularity requirement for the data u, θ, and (E 0 , H 0 ).…”

“…The pure temperature dependence j c = j c (x, θ(x, t)) was considered in the subsequent paper [27] focusing on its fully discrete analysis. The present paper extends [27,30]: We consider the more realistic case j c = j c (x, θ(x, t), H(x, t)) with less regularity requirement for the data u, θ, and (E 0 , H 0 ). Note that, since our problem features a QVI character, the prior developed VI-techniques in [27,30,32] cannot be directly applied to (QVI) and require certain extensions.…”

“…We investigate the stability analysis of the resulting time-discrete magnetic and electric fields, including their difference quotients (Lemmas 4.5 and 4.6). Differently from [27,Assumption 2.2], our stability analysis does not rely on any compatibility condition for the initial data. We circumvent this issue by introducing an auxiliary current density (33) and initial difference quotients (34), that preserve the pivotal QVI structure at the initial time (35).…”

Maxwell quasi-variational inequalities in superconductivity

“…This paper is a continuation of the recent papers [32,33] on hyperbolic Maxwell variational inequalities (VI), including those arising in high-temperature superconductivity and electromagnetic shielding (cf. [14,27,28]). The goal of the present paper is to explore hyperbolic Maxwell QVI arising from the Bean-Kim model (B1)-(B3) with magnetic field and temperature dependence in the critical current j c = j c (θ, H).…”

“…also [32] for a more general class of hyperbolic Maxwell VI). The pure temperature dependence j c = j c (x, θ(x, t)) was considered in the subsequent paper [27] focusing on its fully discrete analysis. The present paper extends [27,30]: We consider the more realistic case j c = j c (x, θ(x, t), H(x, t)) with less regularity requirement for the data u, θ, and (E 0 , H 0 ).…”

“…The pure temperature dependence j c = j c (x, θ(x, t)) was considered in the subsequent paper [27] focusing on its fully discrete analysis. The present paper extends [27,30]: We consider the more realistic case j c = j c (x, θ(x, t), H(x, t)) with less regularity requirement for the data u, θ, and (E 0 , H 0 ). Note that, since our problem features a QVI character, the prior developed VI-techniques in [27,30,32] cannot be directly applied to (QVI) and require certain extensions.…”

“…We investigate the stability analysis of the resulting time-discrete magnetic and electric fields, including their difference quotients (Lemmas 4.5 and 4.6). Differently from [27,Assumption 2.2], our stability analysis does not rely on any compatibility condition for the initial data. We circumvent this issue by introducing an auxiliary current density (33) and initial difference quotients (34), that preserve the pivotal QVI structure at the initial time (35).…”

Maxwell quasi-variational inequalities in superconductivity

“…We notice that the PDE-constraint in (58) is motivated by the timediscretization of Bean's critical-state model for type-II superconductivity (cf. [30,31,28,32]). We also refer to [29] for our previous contribution towards the optimal control of nonlinear elliptic Maxwell equations.…”

Optimal control of elliptic variational inequalities with bounded and unbounded operators

Maxwell Variational Inequalities in Type-II Superconductivity