Some non-existence results for the semilinear Schrödinger equation without gauge invariance

Ikeda, Masahiro; Inui, Takahisa

doi:10.1016/j.jmaa.2015.01.003

Cited by 38 publications

(49 citation statements)

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“…We also remark that in the 1‐dimensional case, s > 1/2 is also the necessary condition for the local existence in the

H^{s} false(double-struckR false)

framework because the nonexistence of local weak solutions for with some

H^{1 false/ 2} false(double-struckR false)

data is shown in Fujiwara . In a general setting, the necessary condition is still open, and partial results are discussed in Ikeda and Inui . On the other hand, is scaling invariant.…”

Section: Introductionmentioning

confidence: 88%

“…We consider the Cauchy problem for the following semirelativistic equations with nongauge invariant power type nonlinearity:

({, \begin{matrix} array i \partial_{t} u + {(- Δ)}^{1 / 2} u = λ | u {false|}^{p}, & array t \in [0, T), x \in {double-struckR}^{n}, \\ array u (0) = u_{0}, & array x \in {double-struckR}^{n}, \end{matrix})

with

λ \in double-struckC ∖ false{0 false}

, where ∂ t = ∂ / ∂ t and Δ is the Laplacian in

R^{n}

. Here, (−Δ) 1/2 is realized as a Fourier multiplier with symbol | ξ |:

{false(- normalΔ false)}^{1 false/ 2} = F^{- 1} false| ξ false| frakturF

, where

frakturF

is the Fourier transform defined by

(F u) (ξ) = \overset{u}{true} (ξ) = {(2 π)}^{- n / 2} \int_{{double-struckR}^{n}} u (x) e^{- i x \cdot ξ} d x .

We remark that the Cauchy problem such as arises in various physical settings, and accordingly, semirelativistic equations are also called half‐wave equations, fractional Schrödinger equations, and so on; see previous studies and reference therein.…”

Section: Introductionmentioning

confidence: 99%

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A note for the global nonexistence of semirelativistic equations with nongauge invariant power type nonlinearity

Fujiwara

2018

Math Methods in App Sciences

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“…We also remark that in the 1‐dimensional case, s > 1/2 is also the necessary condition for the local existence in the

H^{s} false(double-struckR false)

framework because the nonexistence of local weak solutions for with some

H^{1 false/ 2} false(double-struckR false)

data is shown in Fujiwara . In a general setting, the necessary condition is still open, and partial results are discussed in Ikeda and Inui . On the other hand, is scaling invariant.…”

Section: Introductionmentioning

confidence: 88%

“…We consider the Cauchy problem for the following semirelativistic equations with nongauge invariant power type nonlinearity:

({, \begin{matrix} array i \partial_{t} u + {(- Δ)}^{1 / 2} u = λ | u {false|}^{p}, & array t \in [0, T), x \in {double-struckR}^{n}, \\ array u (0) = u_{0}, & array x \in {double-struckR}^{n}, \end{matrix})

with

λ \in double-struckC ∖ false{0 false}

, where ∂ t = ∂ / ∂ t and Δ is the Laplacian in

R^{n}

. Here, (−Δ) 1/2 is realized as a Fourier multiplier with symbol | ξ |:

{false(- normalΔ false)}^{1 false/ 2} = F^{- 1} false| ξ false| frakturF

, where

frakturF

is the Fourier transform defined by

(F u) (ξ) = \overset{u}{true} (ξ) = {(2 π)}^{- n / 2} \int_{{double-struckR}^{n}} u (x) e^{- i x \cdot ξ} d x .

Section: Introductionmentioning

confidence: 99%

A note for the global nonexistence of semirelativistic equations with nongauge invariant power type nonlinearity

Fujiwara

2018

Math Methods in App Sciences

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“…The results in [5][6][7] indicate the nonlinear effect of λ|u| p is very different from the gauge invariant nonlinearity µ|u| p−1 u. For the nonlinear Schrödinger equation with a gauge invariant power nonlinearity…”

Section: Introductionmentioning

confidence: 97%

“…In [6], Ikeda and Inui showed the blow-up of solution for the semilinear Schrödinger equation with small data when 1 < p < 1 + 4 N , which improved the result obtained in [5], and they also determined the critical exponent, and gave an upper bound of the life span for blowing up solution. Furthermore, Ikeda and Inui [7] got a large data blow-up result in H s (R N ) with a nonlinear term F (u) satisfying some conditions. The main tool in [5][6][7] is test function method.…”

Section: Introductionmentioning

confidence: 99%

“…Furthermore, Ikeda and Inui [7] got a large data blow-up result in H s (R N ) with a nonlinear term F (u) satisfying some conditions. The main tool in [5][6][7] is test function method. The method based on rescalings of a compactly support test function is an effective method to prove the nonexistence of weak solutions for many kinds of equations.…”

Section: Introductionmentioning

confidence: 99%

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The nonexistence of global solutions for a time fractional nonlinear Schrödinger equation without gauge invariance

Zhang

Sun

2017

Applied Mathematics Letters

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Please cite this article as: Q. Zhang, et al., The nonexistence of global solutions for a time fractional nonlinear Schrödinger equation without gauge invariance, Applied Mathematics Letters (2016), http://dx. AbstractIn this paper, we study the following time fractional Schrödinger equationwhere 0 < α < 1, i α denotes the principal value of i α , T > 0, λ ∈ C \ {0}, p > 1, u(t, x) is a complex-valued function, and C 0 D α t u denotes Caputo fractional derivative of order α. We prove that the problem admit no global weak solution with suitable initial data when 1 < p < 1 + 2/N by using the test function method, and also give some conditions which imply the problem have no global weak solution for every p > 1.

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Non‐global solutions for the inhomogeneous nonlinear Schrödinger equation without gauge invariance

Saanouni

2024

Math Methods in App Sciences

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This work investigates the non‐global existence of solutions for the inhomogeneous nonlinear Schrödinger problem without gauge invariance. Indeed, initially, we establish the non‐global existence of certain mass‐subcritical solutions. Subsequently, we demonstrate the non‐global existence of energy‐subcritical solutions characterized by small initial data. These results are are acknowledged to be unsuccessful for the classical gauge invariant inhomogeneous nonlinear Schrödinger equation (INLS).

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Some non-existence results for the semilinear Schrödinger equation without gauge invariance

Cited by 38 publications

References 50 publications

A note for the global nonexistence of semirelativistic equations with nongauge invariant power type nonlinearity

A note for the global nonexistence of semirelativistic equations with nongauge invariant power type nonlinearity

The nonexistence of global solutions for a time fractional nonlinear Schrödinger equation without gauge invariance

Non‐global solutions for the inhomogeneous nonlinear Schrödinger equation without gauge invariance

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