Long-time existence for signed solutions of the heat equation with a noise term

Mueller, Carl

doi:10.1007/s004400050144

Cited by 16 publications

(21 citation statements)

References 8 publications

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“…However, the tightness is still useful in obtaining weak convergence, which is similar as in Refs. [10,12,[15][16][17]. As to the tightness arguments here, we will need some fundamental estimates on the Green kernel corresponding to the operator ∂ ∂t + ∆ 2 .…”

Section: Introductionmentioning

confidence: 99%

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Higher-order stochastic partial differential equations with branching noises

Wang

Yan

2007

Front. Math. China

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Section: Introductionmentioning

confidence: 99%

“…Refs. [16][17][18]). Therein a powerful tool is the comparison theorem, and the (mild) solution of the equation is positive if the initial u 0 is positive.…”

Section: Introductionmentioning

confidence: 99%

Higher-order stochastic partial differential equations with branching noises

Wang

Yan

2007

Front. Math. China

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“…As for SPDE analogues of the Bessel process, the only results known to the authors are in Mueller [Mue98] and Mueller and Pardoux [MP99]. Here we assume that u(t, x) is scalar valued, and as before t > 0.…”

Section: Introductionmentioning

confidence: 99%

“…Let τ be the first time at which u hits 0, and let τ = ∞ if u does not hit 0. Then P(τ < ∞) > 0 if α < 3, see [Mue98] Corollary 1.1. Also, P(τ < ∞) = 0 if α > 3, see Theorem 1 of [MP99].…”

Section: Introductionmentioning

confidence: 99%

Can the stochastic wave equation with strong drift hit zero?

Lin¹,

Mueller²

2019

Electron. J. Probab.

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We study the stochastic wave equation with multiplicative noise and singular drift:where x lies in the circle R/JZ and u(0, x) > 0. We show that (i) If 0 < α < 1 then with positive probability, u(t, x) = 0 for some (t, x).(ii) If α > 3 then with probability one, u(t, x) = 0 for all (t, x).1 Lemma 3. Suppose that v(t, x) is a solution to (4.2). ThenSince J 0 S I (t, x − y)dy = t by the definition of the one-dimensional wave kernel, and since J 0 1 2 u 0 (x + t) + u 0 (x − t) dx = J 0 u 0 (x)dx,

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“…Krylov [Kry94] gave another proof of this fact for a more general class of equations. The papers [Mue97a] and [Mue97b] are also relevant. We refer the reader to Pardoux [Par93] for this and other questions about parabolic SPDE.…”

Section: Introductionmentioning

confidence: 99%

The critical parameter for the heat equation with a noise term to blow up in finite time

Mueller¹

2000

Ann. Probab.

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Consider the stochastic partial differential equationx) is 2-parameter white noise, and we assume that the initial function u(0, x) is nonnegative and not identically 0. We impose Dirichlet boundary conditions on u in the interval I. We say that u blows up in finite time, with positive probability, if there is a random time T < ∞ such that P lim t↑T sup x u(t, x) = ∞ > 0.It was known that if γ < 3/2, then with probability 1, u does not blow up in finite time. It was also known that there is a positive probability of finite time blow-up for γ sufficiently large.In this paper, we show that if γ > 3/2, then there is a positive probability that u blows up in finite time.1 Supported by an NSA grant.

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Long-time existence for signed solutions of the heat equation with a noise term

Cited by 16 publications

References 8 publications

Higher-order stochastic partial differential equations with branching noises

Higher-order stochastic partial differential equations with branching noises

Can the stochastic wave equation with strong drift hit zero?

The critical parameter for the heat equation with a noise term to blow up in finite time

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