Blowup solutions for a nonlinear heat equation involving a critical power nonlinear gradient term

Ghoul, Tej Eddine; Nguyen, Van Tien; Zaag, Hatem

doi:10.1016/j.jde.2017.05.023

Cited by 19 publications

(31 citation statements)

References 39 publications

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“…• The control of the finite dimensional problem thanks to a topological argument based on index theory. Note that this kind of topological arguments has proved to be successful also for the construction of type I blowup solutions for the semilinear heat equation (1.16) in [4], [48], [52] (see also [51] for the case of logarithmic perturbations, [5], [6] and [27] for the exponential source, [50] for the complex-valued case), the Ginzburg-Landau equation in [49] (see also [63] for an earlier work), a non-variational parabolic system in [28] and the semilinear wave equation in [15]. Note also that here we don't use the topological argument because the blow-up is stable.…”

Section: )mentioning

confidence: 99%

On the stability of type II blowup for the 1-corotational energy-supercritical harmonic heat flow

2019

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We will study the problem under an additional assumption of 1-corotational symmetry, with the following corotational ansatz Φ(x, t) = cos(u(|x|, t))x |x| sin(u(|x|, t)) 2 √ κ , where κ is an upper bound on the sectional curvature of the target manifold M (see Jost [31] and Lin-Wang [33]). Without these assumptions, the solution u(r, t) may develop singularities in some finite time (see for examples, Coron and Ghidaglia [14], Chen and Ding [11] for d ≥ 3, Chang, Ding and Yei [12] for d = 2). In this case, we say that u(r, t) blows up in a finite time T < +∞ in the sense that lim t→T ∇u(t) L ∞ = +∞.Here we call T the blowup time of u(x, t). The blowup has been divided by Struwe [60] into two types: u blows up with type I if: lim sup t→T (T − t) 1 2 ∇u(t) L ∞ < +∞, u blows up with type II if: lim sup t→T (T − t) 1 2 ∇u(t) L ∞ = +∞. 1-COROTATIONAL HARMONIC MAP HEAT FLOW IN SUPERCRITICAL DIMENSIONS 4 d−4−2 √ d−1 for d ≥ 11, correspond to the cases d = 2 and d = 7 in the study of equation (1.4) respectively.

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Section: )mentioning

confidence: 99%

On the stability of type II blowup for the 1-corotational energy-supercritical harmonic heat flow

2019

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“…We see that part B) directly follows from item (i) of part A). In addition to that, our definition is almost the same as in [21] (see also the work of Ghoul, Nguyen and Zaag [8], the works of Merle and Zaag [14], [15]). So, we kindly refer the reader to see the proofs of the existence of the set D A , item i in A) and part B) in Proposition 4.5 in [21].…”

Section: B)mentioning

confidence: 99%

Profile of a touch-down solution to a nonlocal MEMS model

Duong

Zaag

2019

Math. Models Methods Appl. Sci.

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In this paper, we are interested in the mathematical model of MEMS devices which is presented by the following equation on (0, T ) × Ω :where Ω is a bounded domain in R n and λ, γ > 0. In this work, we have succeeded to construct a solution which quenches in finite time T only at one interior point a ∈ Ω. In particular, we give a description of the quenching behavior according to the following final profile1 3 2010 Mathematics Subject Classification. Primary: 35K50, 35B40; Secondary: 35K55, 35K57.

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“…Relying on this property, our problem will be derived by using the techniques which were used in [5] and the fine control of the positivity of the real part. We treat this challenge by relying on the ideas of the work of Merle and Zaag in [16] (or the work of Ghoul, Nguyen and Zaag in [10] with inherited ideas from [16]) for the construction of the initial data. We define a shrinking set S(t) (see in Definition 3.1) which allows a very fine control of the positivity of the real part.…”

Section: The Strategy Of the Proofmentioning

confidence: 99%

A blowup solution of a complex semi-linear heat equation with an irrational power

Duong

2019

Journal of Differential Equations

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In this paper, we consider the following semi-linear complex heat equation ∂tu = ∆u + u p , u ∈ C in R n , with an arbitrary power p, p > 1. In particular, p can be non integer and even irrational, unlike our previous work [5], dedicated to the integer case. We construct for this equation a complex solution u = u 1 + iu 2 , which blows up in finite time T and only at one blowup point a. Moreover, we also describe the asymptotics of the solution by the following final profiles:2) This model is connected to the viscous Constantin-Lax-Majda equation with a viscosity term, which is a one dimensional model for the vorticity equation in fluids. For more details, the readers are addressed to the following works: Constantin, Lax, Majda [2], Guo, Ninomiya and Yanagida in [8], Okamoto, Sakajo and Wunsch [25], Sakajo in [26] and [27], Schochet [28]. In [5], we treated the case p ∈ N. Indeed, handling the 2010 Mathematics Subject Classification. Primary: 35K50, 35B40; Secondary: 35K55, 35K57.

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Blowup solutions for a nonlinear heat equation involving a critical power nonlinear gradient term

Cited by 19 publications

References 39 publications

On the stability of type II blowup for the 1-corotational energy-supercritical harmonic heat flow

On the stability of type II blowup for the 1-corotational energy-supercritical harmonic heat flow

Profile of a touch-down solution to a nonlocal MEMS model

A blowup solution of a complex semi-linear heat equation with an irrational power

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