Thermal runaway in a non-local problem modelling Ohmic heating. Part II: General proof of blow-up and asymptotics of runaway

A. A. Lacey

doi:10.1017/S0956792500001807

Abstract

We consider the non-local problem

It is found that for the case of decreasing f then: (i) for

there is a unique steady state which is globally asymptotically stable; (ii) for

then the problem can be scaled so that

in which case: (a) for λ < 8 there is a unique steady state which is globally asymptotically stable; (b) for λ = 8 there is no steady state and u is unbounded; (c) for λ > 8 there is no steady state and u blows up for all x, −1 < x, < 1. Some formal asymptotic estimates for the local behaviour of u as it blows up are obtained.

Information

References

Cimatti, G. 1989 Remark on existence and uniqueness for the thermistor problem under mixed boundary conditions. Quart. J. Appl. Math. 47, 117–121.CrossRef Google Scholar

Lacey, A. A. 1983 Mathematical analysis of thermal runaway for spatially inhomogeneous reactions. SIAM J. Appl. Math. 43, 1350–1366.Google Scholar

Lacey, A. A. 1994 Thermal runaway in a non-local problem modelling Ohmic heating. I. Model derivation and some special cases. Euro. J. Appl. Math. 6(2), 127–144.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Antontsev, S. N. and Chipot, M. 1997. Analysis of blowup for the thermistor problem. Siberian Mathematical Journal, Vol. 38, Issue. 5, p. 827.

López-Gómez, Julián 1998. On the Structure and Stability of the Set of Solutions of a Nonlocal Problem Modeling Ohmic Heating. Journal of Dynamics and Differential Equations, Vol. 10, Issue. 4, p. 537.

Carrillo, J.A 1998. On a nonlocal elliptic equation with decreasing nonlinearity arising in plasma physics and heat conduction. Nonlinear Analysis: Theory, Methods & Applications, Vol. 32, Issue. 1, p. 97.

Cimatti, Giovannia 1999. On the stability of the solution of the thermistor problem. Applicable Analysis, Vol. 73, Issue. 3-4, p. 407.

Pelesko, J.A. and Triolo, A.A. 2001. Nonlocal problems in MEMS device control. Journal of Engineering Mathematics, Vol. 41, Issue. 4, p. 345.

2002. Modeling MEMS and NEMS.

Cimatti, Giovanni 2004. Asymptotics for the time-dependent thermistor problem. Quarterly of Applied Mathematics, Vol. 62, Issue. 3, p. 471.

2007. Superlinear Parabolic Problems. p. 377.

Skubachevskii, A. L. 2008. Nonclassical boundary-value problems. I. Journal of Mathematical Sciences, Vol. 155, Issue. 2, p. 199.

Nikolopoulos, C. V. and Zouraris, G. E. 2008. Progress in Industrial Mathematics at ECMI 2006. Vol. 12, Issue. , p. 827.

Sidi Ammi, Moulay Rchid and Torres, Delfim F.M. 2008. Numerical analysis of a nonlocal parabolic problem resulting from thermistor problem. Mathematics and Computers in Simulation, Vol. 77, Issue. 2-3, p. 291.

Liang, Fei and Li, Yuxiang 2009. Blow-up for a nonlocal parabolic equation. Nonlinear Analysis: Theory, Methods & Applications, Vol. 71, Issue. 7-8, p. 3551.

QILIN, LIU FEI, LIANG and YUXIANG, LI 2009. Asymptotic behaviour for a non-local parabolic problem. European Journal of Applied Mathematics, Vol. 20, Issue. 3, p. 247.

Latos, Evangelos A. and Tzanetis, Dimitrios E. 2010. Grow-up of critical solutions for a non-local porous medium problem with Ohmic heating source. Nonlinear Differential Equations and Applications NoDEA, Vol. 17, Issue. 2, p. 137.

Skubachevskii, A. L. 2010. Nonclassical boundary-value problems. II. Journal of Mathematical Sciences, Vol. 166, Issue. 4, p. 377.

Cannon, John R. and Galiffa, Daniel J. 2011. On a numerical method for a homogeneous, nonlinear, nonlocal, elliptic boundary value problem. Nonlinear Analysis: Theory, Methods & Applications, Vol. 74, Issue. 5, p. 1702.

AL-REFAI, MOHAMMED KAVALLARIS, NIKOS I. and HAJJI, MOHAMED ALI 2011. Monotone iterative sequences for non-local elliptic problems. European Journal of Applied Mathematics, Vol. 22, Issue. 6, p. 533.

Fan, Mingshu and Du, Lili 2012. Asymptotic behavior for an Ohmic heating model in thermal electricity. Applied Mathematics and Computation, Vol. 218, Issue. 22, p. 10906.

Ammi, Moulay Rchid Sidi and Torres, Delfim F.M. 2012. Optimal control of nonlocal thermistor equations. International Journal of Control, Vol. 85, Issue. 11, p. 1789.

Liang, Fei Liu, Qi Lin and Li, Yu Xiang 2013. On a nonlocal problem modelling Ohmic heating in planar domains. Acta Mathematica Sinica, English Series, Vol. 29, Issue. 3, p. 523.

Download full list

Article contents

Thermal runaway in a non-local problem modelling Ohmic heating. Part II: General proof of blow-up and asymptotics of runaway

Abstract

Information

Access options

Article purchase

Temporarily unavailable

References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

Thermal runaway in a non-local problem modelling Ohmic heating. Part II: General proof of blow-up and asymptotics of runaway

Abstract

Information

Access options

Article purchase

Temporarily unavailable

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests