A shift in the Strauss exponent for semilinear wave equations with a not effective damping

D’Abbicco, Marcello; Lucente, Sandra; Reissig, Michael

doi:10.1016/j.jde.2015.06.018

Cited by 109 publications

(146 citation statements)

References 28 publications

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“…Remark In the paper the number

p_{μ_{1}} false(n false)

was clarified as follows: (1)

p_{μ_{1}} false(1 false) = p_{F u j} (\frac{μ_{1}}{2})

, (2)

p_{μ_{1}} false(2 false) = \{\begin{matrix} left p_{F u j} (() 1 + \frac{μ_{1}}{2}) & left if μ_{1} \geq 2, \\ left p_{0} (() 2 + μ_{1}) & left if μ_{1} \in [0, 2], \end{matrix}

(3)

p_{μ_{1}} false(n false) = p_{0} false(n + μ_{1} false)

n \geq 3 .

…”

Section: Resultsmentioning

confidence: 99%

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Semi‐linear wave models with power non‐linearity and scale‐invariant time‐dependent mass and dissipation

Nascimento

Palmieri

Reissig

2016

Mathematische Nachrichten

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“…Remark In the paper the number

p_{μ_{1}} false(n false)

was clarified as follows: (1)

p_{μ_{1}} false(1 false) = p_{F u j} (\frac{μ_{1}}{2})

, (2)

p_{μ_{1}} false(2 false) = \{\begin{matrix} left p_{F u j} (() 1 + \frac{μ_{1}}{2}) & left if μ_{1} \geq 2, \\ left p_{0} (() 2 + μ_{1}) & left if μ_{1} \in [0, 2], \end{matrix}

(3)

p_{μ_{1}} false(n false) = p_{0} false(n + μ_{1} false)

n \geq 3 .

…”

Section: Resultsmentioning

confidence: 99%

“…If the coefficient μ 1 of the damping term is small, that is, smaller than

n + 2

for large dimensions, it is expected that the critical exponent has somehow a relation to the Strauss exponent. Indeed, it is proved in that the critical exponent for

μ_{1} = 2

is a shift of Strauss exponent

p_{0} false(n false)

p_{0} false(n + 2 false)

.…”

Section: Introductionmentioning

confidence: 99%

Semi‐linear wave models with power non‐linearity and scale‐invariant time‐dependent mass and dissipation

Nascimento

Palmieri

Reissig

2016

Mathematische Nachrichten

Self Cite

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“…In order to prove Theorem 6, we follow the approach in [4,11]. For the sake of brevity, we only sketch the main ideas, highlighting the differences due to the presence of the propagation speed λ(t).…”

Section: Data From a Weighted Energy Spacementioning

confidence: 99%

“…In order to manage the last two terms we use a Gagliardo-Nirenberg type inequality (see Lemma 2.3 in [11] and Lemma 9 in [4]) and we get…”

Section: Data From a Weighted Energy Spacementioning

confidence: 99%

“…The same exponent was first obtained in [20] by using a modified potential well technique. It has been recently proved [4] that the exponent 1 + 2/n remains critical if we consider the wave equation with a time-dependent effective damping b(t)u t satisfying suitable assumptions. We say that the damping term is effective for the wave equation if the linear estimates have the same decay rate of the corresponding heat equation b(t)u t − △u = 0 (see [26,28,29,30]).…”

Section: Introductionmentioning

confidence: 99%

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The threshold of effective damping for semilinear wave equations

D’Abbicco

2014

Math. Meth. Appl. Sci.

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A global existence result for a semilinear scale‐invariant wave equation in even dimension

Palmieri

2019

Math Methods in App Sciences

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In the present article a, semilinear scale‐invariant wave equation with damping and mass is considered. The global (in time) existence of radial symmetric solutions in even spatial dimension n is proved by using weighted L∞ − L∞ estimates, under the assumption that the multiplicative constants, which appear in the coefficients of damping and of mass terms, fulfill an interplay condition, which yields somehow a “wave‐like” model. In particular, combining this existence result with a recently proved blow‐up result, a suitable shift of Strauss exponent is proved to be the critical exponent for the considered model. Moreover, the still open part of a conjecture done by D'Abbicco‐Lucente‐Reissig is proved to be true in the massless case.

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A shift in the Strauss exponent for semilinear wave equations with a not effective damping

Cited by 109 publications

References 28 publications

Semi‐linear wave models with power non‐linearity and scale‐invariant time‐dependent mass and dissipation

Semi‐linear wave models with power non‐linearity and scale‐invariant time‐dependent mass and dissipation

The threshold of effective damping for semilinear wave equations

A global existence result for a semilinear scale‐invariant wave equation in even dimension

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