Sampling approximation by framelets in Sobolev space and its application in modifying interpolating error

Abstract The estimates of N. V. Krylov for distributions of stochastic integrals by means of the L d {L_{d}} -norm of a measurable function are well-known and are widely used in the theory of stochastic differential equations and controlled diffusion processes. We generalize estimates of this type for optional semimartingales, then apply these estimates to prove the change of variables formula for a general class of functions from the Sobolev space W d 2 {W^{2}_{d}} . We also show how to use these estimates for the investigation of L 2 {L^{2}} -convergence of solutions of optional SDE’s.

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On the convergence of difference schemes for the generalized BBM–Burgers equation

Georgian Mathematical Journal ◽

10.1515/gmj-2018-0075 ◽

2019 ◽

Vol 26 (3) ◽

pp. 341-349 ◽

Cited By ~ 1

Author(s):

Givi Berikelashvili ◽

Manana Mirianashvili

Keyword(s):

Exact Solution ◽

Sobolev Space ◽

Difference Scheme ◽

Absolute Stability ◽

Burgers Equation ◽

Initial Boundary ◽

Initial Boundary Value Problem ◽

Algebraic Equations ◽

The Difference ◽

Initial Boundary Value

Abstract A three-level finite difference scheme is studied for the initial-boundary value problem of the generalized Benjamin–Bona–Mahony–Burgers equation. The obtained algebraic equations are linear with respect to the values of the desired function for each new level. The unique solvability and absolute stability of the difference scheme are shown. It is proved that the scheme is convergent with the rate of order {k-1} when the exact solution belongs to the Sobolev space {W_{2}^{k}(Q)} , {1<k\leq 3} .

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A generalization of the Itô formula

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/s0161171202102018 ◽

2002 ◽

Vol 31 (8) ◽

pp. 477-496

Author(s):

Said Ngobi

Keyword(s):

Sobolev Space ◽

White Noise ◽

Itô Formula ◽

Ito Formula ◽

Integrable Functions ◽

Square Integrable Functions ◽

White Noise Space

The classical Itô formula is generalized to some anticipating processes. The processes we consider are in a Sobolev space which is a subset of the space of square integrable functions over a white noise space. The proof of the result uses white noise techniques.

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On principal eigenvalues for quasilinear elliptic differential operators: an Orlicz-Sobolev space setting

Nonlinear Differential Equations and Applications NoDEA ◽

10.1007/s000300050073 ◽

1999 ◽

Vol 6 (2) ◽

pp. 207-225 ◽

Cited By ~ 67

Author(s):

M. García-Huidobro ◽

V.K. Le ◽

R. Manásevich ◽

K. Schmitt

Keyword(s):

Sobolev Space ◽

Differential Operators ◽

Principal Eigenvalues ◽

Space Setting ◽

Elliptic Differential Operators ◽

Quasilinear Elliptic

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Adams Type Inequality and Application for a Class of Polyharmonic Equations with Critical Growth

Advanced Nonlinear Studies ◽

10.1515/ans-2015-0407 ◽

2015 ◽

Vol 15 (4) ◽

Author(s):

João Marcos do Ó ◽

Abiel Costa Macedo

Keyword(s):

Sobolev Space ◽

Exponential Growth ◽

Type Inequality ◽

Critical Growth ◽

Polyharmonic Equations ◽

Critical Exponential Growth

AbstractIn this paper we give a new Adams type inequality for the Sobolev space W(−Δ)where the nonlinearity is “superlinear” and has critical exponential growth at infinite.

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An Asymptotical Stability in Variational Sense for Second Order Systems

Advanced Nonlinear Studies ◽

10.1515/ans-2010-0108 ◽

2010 ◽

Vol 10 (1) ◽

Author(s):

Dariusz Idczak ◽

Stanisław Walczak

Keyword(s):

Sobolev Space ◽

Differential System ◽

Sufficient Conditions ◽

Zero Solution ◽

Second Order ◽

Functional Parameter ◽

Asymptotical Stability ◽

Parameter Control ◽

Initial Condition ◽

Second Order Systems

AbstractIn this paper, a new, variational concept of asymptotical stability of zero solution to an ordinary differential system of the second order, considered in Sobolev space, is presented. Sufficient conditions for an asymptotical stability in a variational sense with respect to initial condition and functional parameter (control) are given. Relation to the classical asymptotical stability is illustrated.

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Characterisation of upper gradients on the weighted Euclidean space and applications

Annali di Matematica Pura ed Applicata (1923 -) ◽

10.1007/s10231-021-01088-4 ◽

2021 ◽

Author(s):

Danka Lučić ◽

Enrico Pasqualetto ◽

Tapio Rajala

Keyword(s):

Euclidean Space ◽

Sobolev Space ◽

Radon Measure ◽

Lipschitz Functions ◽

Euclidean Spaces ◽

Upper Gradient

AbstractIn the context of Euclidean spaces equipped with an arbitrary Radon measure, we prove the equivalence among several different notions of Sobolev space present in the literature and we characterise the minimal weak upper gradient of all Lipschitz functions.

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Optimal L 2 -decay of solutions to a cubic dissipative nonlinear Schrödinger equation

Asymptotic Analysis ◽

10.3233/asy-211738 ◽

2021 ◽

pp. 1-13

Author(s):

Kita Naoyasu ◽

Sato Takuya

Keyword(s):

Sobolev Space ◽

Global Solution ◽

Initial Value Problem ◽

Trivial Solution ◽

Decay Estimate ◽

Weighted Sobolev Space ◽

The Other ◽

Initial Value ◽

Decay Of Solutions ◽

Dissipative Nonlinearity

This paper presents the optimality of decay estimate of solutions to the initial value problem of 1D Schrödinger equations containing a long-range dissipative nonlinearity, i.e., λ | u | 2 u. Our aim is to obtain the two results. One asserts that, if the L 2 -norm of a global solution, with an initial datum in the weighted Sobolev space, decays at the rate more rapid than ( log t ) − 1 / 2 , then it must be a trivial solution. The other asserts that there exists a solution decaying just at the rate of ( log t ) − 1 / 2 in L 2 .

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Local well-posedness for the quantum Zakharov system in one spatial dimension

Journal of Hyperbolic Differential Equations ◽

10.1142/s0219891617500059 ◽

2017 ◽

Vol 14 (01) ◽

pp. 157-192 ◽

Cited By ~ 2

Author(s):

Yung-Fu Fang ◽

Hsi-Wei Shih ◽

Kuan-Hsiang Wang

Keyword(s):

Sobolev Space ◽

Initial Data ◽

Electric Field ◽

Classical Result ◽

Spatial Dimension ◽

Well Posedness ◽

Ion Density ◽

Zakharov System ◽

Quantum Parameter ◽

Quantum Zakharov System

We consider the quantum Zakharov system in one spatial dimension and establish a local well-posedness theory when the initial data of the electric field and the deviation of the ion density lie in a Sobolev space with suitable regularity. As the quantum parameter approaches zero, we formally recover a classical result by Ginibre, Tsutsumi, and Velo. We also improve their result concerning the Zakharov system and a result by Jiang, Lin, and Shao concerning the quantum Zakharov system.

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