Analysis of p(x)-Laplace thermistor models describing the electrothermal behavior of organic semiconductor devices
Authors
- Glitzky, Annegret
ORCID: 0000-0003-1995-5491 - Liero, Matthias
ORCID: 0000-0002-0963-2915
2010 Mathematics Subject Classification
- 35J92 35Q79 35B65 80A20 35J57
Keywords
- Thermistor model, p(x)-Laplacian, nonlinear coupled system, existence and boundedness, regularity theory, Caccioppoli estimates, organic light emitting diode, self-heating, Arrhenius-like conductivity law
DOI
Abstract
We study a stationary thermistor model describing the electrothermal behavior of organic semiconductor devices featuring non-Ohmic current-voltage laws and self-heating effects. The coupled system consists of the current-flow equation for the electrostatic potential and the heat equation with Joule heating term as source. The self-heating in the device is modeled by an Arrhenius-like temperature dependency of the electrical conductivity. Moreover, the non-Ohmic electrical behavior is modeled by a power law such that the electrical conductivity depends nonlinearly on the electric field. Notably, we allow for functional substructures with different power laws, which gives rise to a $p(x)$-Laplace-type problem with piecewise constant exponent. We prove the existence and boundedness of solutions in the two-dimensional case. The crucial point is to establish the higher integrability of the gradient of the electrostatic potential to tackle the Joule heating term. The proof of the improved regularity is based on Caccioppoli-type estimates, Poincaré inequalities, and a Gehring-type Lemma for the $p(x)$-Laplacian. Finally, Schauder's fixed-point theorem is used to show the existence of solutions.
Appeared in
- Nonlinear Anal. Real World Appl., 34 (2017), pp. 536--562.
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