Satyanad Kichenassamy
Published 2017-09-22Version 1
While the global boundary control of nonlinear wave equations that exhibit blow-up is generally impossible, we show on a typical example, motivated by laser breakdown, that it is possible to control solutions with small data so that they blow up on a prescribed compact set bounded away from the boundary of the domain. This is achieved using the representation of singular solutions with prescribed blow-up surface given by Fuchsian reduction. We outline on this example simple methods that may be of wider applicability.
Journal: Evolution Equations and Control Theory, vol. 2, no. 4 (Dec. 2013) 667-677
Recent developments on the lifespan estimate for classical solutions of nonlinear wave equations in one space dimension
The lifespan estimates of radially symmetric solutions to systems of nonlinear wave equations in even space dimensions
The combined effect in one space dimension beyond the general theory for nonlinear wave equations
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