1,131 research outputs found
Semilinear wave equation on compact Lie groups
In this note, we study the semilinear wave equation with power nonlinearity
on compact Lie groups. First, we prove a local in time existence result
in the energy space via Fourier analysis on compact Lie groups. Then, we prove
a blow-up result for the semilinear Cauchy problem for any , under
suitable sign assumptions for the initial data. Furthermore, sharp lifespan
estimates for local (in time) solutions are derived.Comment: arXiv admin note: substantial text overlap with arXiv:2005.1347
Global existence of solutions for semi-linear wave equation with scale-invariant damping and mass in exponentially weighted spaces
In this paper we consider the following Cauchy problem for the semi-linear
wave equation with scale-invariant dissipation and mass and power
non-linearity: \begin{align}\label{CP abstract} \begin{cases} u_{tt}-\Delta
u+\dfrac{\mu_1}{1+t} u_t+\dfrac{\mu_2^2}{(1+t)^2}u=|u|^p, \\ u(0,x)=u_0(x),
\,\, u_t(0,x)=u_1(x), \end{cases}\tag{} \end{align} where are nonnegative constants and . On the one hand we will prove a
global (in time) existence result for \eqref{CP abstract} under suitable
assumptions on the coefficients of the damping and the mass
term and on the exponent , assuming the smallness of data in exponentially
weighted energy spaces. On the other hand a blow-up result for \eqref{CP
abstract} is proved for values of below a certain threshold, provided that
the data satisfy some integral sign conditions. Combining these results we find
the critical exponent for \eqref{CP abstract} in all space dimensions under
certain assumptions on and . Moreover, since the global
existence result is based on a contradiction argument, it will be shown firstly
a local (in time) existence result
Lifespan of semilinear wave equation with scale invariant dissipation and mass and sub-Strauss power nonlinearity
In this paper, we study the blow-up of solutions for semilinear wave
equations with scale-invariant dissipation and mass in the case in which the
model is somehow 'wave-like'. A Strauss type critical exponent is determined as
the upper bound for the exponent in the nonlinearity in the main theorems. Two
blow-up results are obtained for the sub-critical case and for the critical
case, respectively. In both cases, an upper bound lifespan estimate is given.Comment: 23 page
Blow-up for a weakly coupled system of semilinear damped wave equations in the scattering case with power nonlinearities
In this work we study the blow-up of solutions of a weakly coupled system of
damped semilinear wave equations in the scattering case with power
nonlinearities. We apply an iteration method to study both the subcritical case
and the critical case. In the subcritical case our approach is based on lower
bounds for the space averages of the components of local solutions. In the
critical case we use the slicing method and a couple of auxiliary functions,
recently introduced by Wakasa-Yordanov, to modify the definition of the
functionals with the introduction of weight terms. In particular, we find as
critical curve for the pair (p, q) of the exponents in the nonlinear terms the
same one as for the weakly coupled system of semilinear wave equations with
power nonlinearities
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