2019
DOI: 10.1007/978-3-030-10937-0_12
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Global Existence Results for a Semilinear Wave Equation with Scale-Invariant Damping and Mass in Odd Space Dimension

Abstract: In this note, we prove blow-up results for semilinear wave models with damping and mass in the scale-invariant case and with nonlinear terms of derivative type. We consider the single equation and the weakly coupled system. In the first case we get a blow-up result for exponents below a certain shift of the Glassey exponent. For the weakly coupled system we find as critical curve a shift of the corresponding curve for the weakly coupled system of semilinear wave equations with the same kind of nonlinearities. … Show more

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Cited by 23 publications
(53 citation statements)
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References 74 publications
(125 reference statements)
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“…Similarly, combining Theorem with the blow‐up result stated in Theorem 2.6 from Nunes do Nascimento et al and the global existence results from Palmieri, we have that p crit ( n , μ ) is critical exponent for the model assuming for n = 1 and for n ≥ 3 in the radial symmetric case with μ ≤ M ( n ). The two‐dimensional case is still open, even though from the necessity part, we expect pFujfalse(1+μ2false) to be critical.…”
Section: Concluding Remarks and Open Problemssupporting
confidence: 63%
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“…Similarly, combining Theorem with the blow‐up result stated in Theorem 2.6 from Nunes do Nascimento et al and the global existence results from Palmieri, we have that p crit ( n , μ ) is critical exponent for the model assuming for n = 1 and for n ≥ 3 in the radial symmetric case with μ ≤ M ( n ). The two‐dimensional case is still open, even though from the necessity part, we expect pFujfalse(1+μ2false) to be critical.…”
Section: Concluding Remarks and Open Problemssupporting
confidence: 63%
“…Let us define the quantity δ ≐( μ − 1) 2 − 4 ν 2 , which describes the interplay between the damping term μ1+tut and the mass term ν2false(1+tfalse)2u. For further considerations on how the quantity δ describes the interplay between the damping term μ1+tut and the mass term ν2false(1+tfalse)2u one can see …”
Section: Introductionmentioning
confidence: 99%
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“…On the other hand it is possible (see ) to prove a global (in time) existence result for in Sobolev spaces with exponential weights for μ1>1,μ20 such that δ(n+1)2 and truerightpleft0.16em0.16em>pFuj()n+μ112δ2, truerightpleft0truenn21emfor0.16em0.16em0.16emn3.Then, using Theorem , we can enlarge the range of admissible exponents p for which we have global existence results in the case n3 if we assume stronger conditions on δ.…”
Section: Discussionmentioning
confidence: 99%