On the best recovery of a linear functional in a certain class of  bivariate functions

The problem of the best recovery in the sense of Sard of a linear functional Lf on the basis of information T(f) = {Ljf,j = 1, 2,... N} is studied. It is shown that in the class of bivariate functions with restricted (n,m) -derivative, known on the (n,m)-grid lines, the problem of the best recovery of a linear functional leads to the best approximation of L(KnKm) in the space S = span Lj(Kn_Km), j=1; 2,...N}, where Kn(x,t) = K(x,t)- Lxn(K(.,t):x) is the difference between the truncated power kernel K(x,t) = (x-t)n-1+ =(n-1)! and its Lagrange interpolation formula. In particular, the best recovery of a bivariate function is considered, if scattered data points and blending grid are given. An algorithm is designed and realized using the software product MATLAB.

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A numerical technique for a general form of nonlinear fractional-order differential equations with the linear functional argument

International Journal of Nonlinear Sciences and Numerical Simulation ◽

10.1515/ijnsns-2019-0281 ◽

2020 ◽

Vol 0 (0) ◽

Author(s):

Khalid K. Ali ◽

Mohamed A. Abd El salam ◽

Emad M. H. Mohamed

Keyword(s):

Differential Equations ◽

Collocation Method ◽

Fractional Order ◽

Linear Functional ◽

Numerical Technique ◽

Operational Matrix ◽

Fractional Order Differential Equations ◽

The Given ◽

Functional Argument ◽

Special Case

AbstractIn this paper, a numerical technique for a general form of nonlinear fractional-order differential equations with a linear functional argument using Chebyshev series is presented. The proposed equation with its linear functional argument represents a general form of delay and advanced nonlinear fractional-order differential equations. The spectral collocation method is extended to study this problem as a discretization scheme, where the fractional derivatives are defined in the Caputo sense. The collocation method transforms the given equation and conditions to algebraic nonlinear systems of equations with unknown Chebyshev coefficients. Additionally, we present a general form of the operational matrix for derivatives. A general form of the operational matrix to derivatives includes the fractional-order derivatives and the operational matrix of an ordinary derivative as a special case. To the best of our knowledge, there is no other work discussed this point. Numerical examples are given, and the obtained results show that the proposed method is very effective and convenient.

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Fitting partially linear functional-coefficient panel-data models with Stata

The Stata Journal Promoting communications on statistics and Stata ◽

10.1177/1536867x20976339 ◽

2020 ◽

Vol 20 (4) ◽

pp. 976-998

Author(s):

Kerui Du ◽

Yonghui Zhang ◽

Qiankun Zhou

Keyword(s):

Monte Carlo ◽

Panel Data ◽

Fixed Effects ◽

Linear Functional ◽

Semiparametric Estimation ◽

Data Models ◽

Panel Data Models ◽

Panel Models ◽

Partially Linear ◽

Functional Coefficient

In this article, we describe the implementation of fitting partially linear functional-coefficient panel models with fixed effects proposed by An, Hsiao, and Li [2016, Semiparametric estimation of partially linear varying coefficient panel data models in Essays in Honor of Aman Ullah ( Advances in Econometrics, Volume 36)] and Zhang and Zhou (Forthcoming, Econometric Reviews). Three new commands xtplfc, ivxtplfc, and xtdplfc are introduced and illustrated through Monte Carlo simulations to exemplify the effectiveness of these estimators.

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Semi-normal operators on uniformly smooth Banach spaces

Glasgow Mathematical Journal ◽

10.1017/s0017089500009356 ◽

1990 ◽

Vol 32 (3) ◽

pp. 273-276 ◽

Cited By ~ 1

Author(s):

Muneo Chō

Keyword(s):

Banach Space ◽

Linear Functional ◽

Dual Space ◽

Complex Banach Space ◽

Linear Operators ◽

Bounded Linear ◽

Uniformly Smooth ◽

Normal Operators ◽

Uniformly Smooth Banach Spaces ◽

The Relationship

In this paper we shall examine the relationship between the numerical ranges and the spectra for semi-normal operators on uniformly smooth spaces.Let X be a complex Banach space. We denote by X* the dual space of X and by B(X) the space of all bounded linear operators on X. A linear functional F on B(X) is called state if ∥F∥ = F(I) = 1. When x ε X with ∥x∥ = 1, we denoteD(x) = {f ε X*:∥f∥ = f(x) = l}.

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Computing the Distance between Piecewise-Linear Bivariate Functions

ACM Transactions on Algorithms ◽

10.1145/2847257 ◽

2016 ◽

Vol 12 (1) ◽

pp. 1-13 ◽

Cited By ~ 1

Author(s):

Guillaume Moroz ◽

Boris Aronov

Keyword(s):

Piecewise Linear ◽

Bivariate Functions

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Katugampola Fractional Integral and Fractal Dimension of Bivariate Functions

Results in Mathematics ◽

10.1007/s00025-021-01475-6 ◽

2021 ◽

Vol 76 (4) ◽

Author(s):

S. Verma ◽

P. Viswanathan

Keyword(s):

Fractal Dimension ◽

Fractional Integral ◽

Bivariate Functions ◽

Katugampola Fractional Integral

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Spectral Transformations and Associated Linear Functionals of the First Kind

Axioms ◽

10.3390/axioms10020107 ◽

2021 ◽

Vol 10 (2) ◽

pp. 107

Author(s):

Juan Carlos García-Ardila ◽

Francisco Marcellán

Keyword(s):

Orthogonal Polynomials ◽

Linear Space ◽

Linear Functional ◽

Linear Functionals ◽

Spectral Transformations ◽

Christoffel Transformation ◽

Complex Coefficients

Given a quasi-definite linear functional u in the linear space of polynomials with complex coefficients, let us consider the corresponding sequence of monic orthogonal polynomials (SMOP in short) (Pn)n≥0. For a canonical Christoffel transformation u˜=(x−c)u with SMOP (P˜n)n≥0, we are interested to study the relation between u˜ and u(1)˜, where u(1) is the linear functional for the associated orthogonal polynomials of the first kind (Pn(1))n≥0, and u(1)˜=(x−c)u(1) is its Christoffel transformation. This problem is also studied for canonical Geronimus transformations.

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The weighted Cauchy problem for linear functional differential equations with strong singularities

Georgian Mathematical Journal ◽

10.1515/gmj.2011.0034 ◽

2011 ◽

Vol 18 (3) ◽

pp. 577-586

Author(s):

Zaza Sokhadze

Keyword(s):

Cauchy Problem ◽

Differential Equations ◽

Linear Functional ◽

Functional Differential Equations ◽

Sufficient Conditions ◽

Initial Point ◽

Higher Order ◽

Well Posedness ◽

Deviating Arguments ◽

Functional Differential

Abstract The sufficient conditions of well-posedness of the weighted Cauchy problem for higher order linear functional differential equations with deviating arguments, whose coefficients have nonintegrable singularities at the initial point, are found.

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