Nonexistence result for the generalized Tricomi equation with the scale-invariant damping, mass term and time derivative nonlinearity

Abstract

In this article, we consider the damped wave equation in the scale-invariant case with time-dependent speed of propagation, mass term and time derivative nonlinearity. More precisely, we study the blow-up of the solutions to the following equation: (E) utt-t2m u+μtut+2t2u=|ut|p, in\ RN×[1,∞), that we associate with small initial data. Assuming some assumptions on the mass and damping coefficients, and μ>0, respectively, that the blow-up region and the lifespan bound of the solution of (E) remain the same as the ones obtained for the case without mass, i.e. =0 in (E). The latter case constitutes, in fact, a shift of the dimension N by μ1+m compared to the problem without damping and mass. Finally, we think that the new bound for p is a serious candidate to the critical exponent which characterizes the threshold between the blow-up and the global existence regions.