Results 261 to 270 of about 9,396 (291)
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Sbornik: Mathematics, 1992
See the review in Zbl 0736.35009.
S A Avdonin +2 more
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See the review in Zbl 0736.35009.
S A Avdonin +2 more
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SIAM Journal on Mathematical Analysis, 2013
We consider the time-dependent Navier--Stokes system in a three-dimensional exterior domain with nonzero velocity at infinity. Under suitable assumptions on the data, it is shown that the velocity part of strong solutions, after subtraction of the far-field velocity, decays as $\bigl( |x| \cdot (1+|x|-x_1) \bigr) ^{-1}$, and its spatial gradient as ...
Paul Deuring
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We consider the time-dependent Navier--Stokes system in a three-dimensional exterior domain with nonzero velocity at infinity. Under suitable assumptions on the data, it is shown that the velocity part of strong solutions, after subtraction of the far-field velocity, decays as $\bigl( |x| \cdot (1+|x|-x_1) \bigr) ^{-1}$, and its spatial gradient as ...
Paul Deuring
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On the rate of decay at infinity for solutions to the Schrödinger equation in a half-cylinder
St. Petersburg Mathematical Journal, 2022Consider the equation − Δ
Krymskii, S. T., Filonov, N. D.
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THE POWER OF NEYMAN-PEARSON TESTS AT LEVEL α+0 AND THE DECAY OF DISTRIBUTIONS AT INFINITY
Statistics and Risk Modeling, 1987A. Janssen, S. Nobel
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Generalized Hermite Spectral Method Matching Different Algebraic Decay at infinities
Journal of Scientific Computing, 2015zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Ben-yu Guo, Chao Zhang
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Local energy decay for a class of hyperbolic equations with constant coefficients near infinity
Mathematische Nachrichten, 2010Ryo Ikehata
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Scattering Matrix for Magnetic Potentials with Coulomb Decay at Infinity
Integral Equations and Operator Theory, 2003zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Modulus of Continuity and Decay at Infinity in Evolution Equations with Real Characteristics
2012In the hyperbolic Cauchy problem, the well-posedness in Sobolev spaces and the modulus of continuity of the coefficients are deeply connected. This holds true in the more general framework of p-evolution equations with real characteristics where a sharp scale of Hoelder continuity, with respect to the time variable has been established.
CICOGNANI, MASSIMO, F. Colombini
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On the decay at infinity of solutions of fractional Schrödinger equations
Complex Variables and Elliptic Equations, 2019The present article focuses on the unique continuation at infinity for relativistic Schrodinger equations with potentials decreasing to zero at infinity.
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ZERO DISTRIBUTION AND DECAY AT INFINITY OF DRINFELD MODULAR COEFFICIENT FORMS
International Journal of Number Theory, 2011Let Γ = GL (2, 𝔽q[T]) be the Drinfeld modular group, which acts on the rigid analytic upper half-plane Ω. We determine the zeroes of the coefficient modular forms aℓk on the standard fundamental domain [Formula: see text] for Γ on Ω, along with the dependence of |aℓk(z)| on [Formula: see text].
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