We study the validity of geometric optics in $L^\infty$ for nonlinear wave equations in three space dimensions whose solutions, pulse like, focus at a point. If the amplitude of the initial data is subcritical, then no nonlinear effect occurs at leading order. If the amplitude of the initial data is sufficiently big, then strong nonlinear effects occur; we study the cases where the equation is either dissipative or accretive. When the equation is dissipative, pulses are absorbed before reaching the focal point. When the equation is accretive, the family of pulses becomes unbounded
We prove global pointwise decay estimates for a class of defocusing semilinear wave equations in $n=...
The nonlinear geometric optics approach is used to elucidate the form of pulse solutions to two semi...
We consider the asymptotic behavior of solutions to nonlinear partial differential equations in the ...
Tohoku Math. J. 56 (2004), no. 3, 393-410International audienceWe study the validity of geometric op...
We study spherical pulse like families of solutions to semilinear wave equattions in space time of d...
We study spherical pulse like families of solutions to semilinear wave equations in space time of di...
Rousset∗ We justify supercritical geometric optics in small time for the defocusing semiclassical No...
International audienceWe justify supercritical geometric optics in small time for the defocusing sem...
We provide a justification with rigorous error estimates showing that the leading term in weakly non...
We present some results around three directions: 1- Focusing at one point in nonlinear geometrical o...
We consider spherically symmetric supercritical focusing wave equations outside a ball. Using mixed ...
In this companion paper to our study of amplification of wavetrains [CGW13], we study weakly stable ...
We derive an asymptotic solution of the vacuum Einstein equations that describes the propag...
We analyze the method of moving focus to determine the critical power for self-focusing by means of ...
This thesis studies the propagation of singularities of solutions to the semi-linear dissipative wav...
We prove global pointwise decay estimates for a class of defocusing semilinear wave equations in $n=...
The nonlinear geometric optics approach is used to elucidate the form of pulse solutions to two semi...
We consider the asymptotic behavior of solutions to nonlinear partial differential equations in the ...
Tohoku Math. J. 56 (2004), no. 3, 393-410International audienceWe study the validity of geometric op...
We study spherical pulse like families of solutions to semilinear wave equattions in space time of d...
We study spherical pulse like families of solutions to semilinear wave equations in space time of di...
Rousset∗ We justify supercritical geometric optics in small time for the defocusing semiclassical No...
International audienceWe justify supercritical geometric optics in small time for the defocusing sem...
We provide a justification with rigorous error estimates showing that the leading term in weakly non...
We present some results around three directions: 1- Focusing at one point in nonlinear geometrical o...
We consider spherically symmetric supercritical focusing wave equations outside a ball. Using mixed ...
In this companion paper to our study of amplification of wavetrains [CGW13], we study weakly stable ...
We derive an asymptotic solution of the vacuum Einstein equations that describes the propag...
We analyze the method of moving focus to determine the critical power for self-focusing by means of ...
This thesis studies the propagation of singularities of solutions to the semi-linear dissipative wav...
We prove global pointwise decay estimates for a class of defocusing semilinear wave equations in $n=...
The nonlinear geometric optics approach is used to elucidate the form of pulse solutions to two semi...
We consider the asymptotic behavior of solutions to nonlinear partial differential equations in the ...
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