On a Class of Positive Linear Operators

In a recent paper [3] Meir and Sharma introduced a generalization of the Sα- method of summability. The elements of their matrix, (ank), are defined by(1)where is a sequence of complex numbers. if 0 < αj < l for each j = 0, 1, 2,… then ank≥0 for each n = 0, 1, 2,… and k = 0,1,2,…

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Representations and Divisibility of Operator Polynomials

Canadian Journal of Mathematics ◽

10.4153/cjm-1978-088-2 ◽

1978 ◽

Vol 30 (5) ◽

pp. 1045-1069 ◽

Cited By ~ 26

Author(s):

I. Gohberg ◽

P. Lancaster ◽

L. Rodman

Keyword(s):

Banach Space ◽

Complex Banach Space ◽

Linear Operators ◽

Complex Numbers ◽

Bounded Linear Operators ◽

Bounded Linear ◽

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Let be a complex Banach space and the algebra of bounded linear operators on . In this paper we study functions from the complex numbers to of the form

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Positive linear operators and summability

Journal of the Australian Mathematical Society ◽

10.1017/s1446788700006650 ◽

1970 ◽

Vol 11 (3) ◽

pp. 281-290 ◽

Cited By ~ 18

Author(s):

J. P. King ◽

J. J. Swetits

Keyword(s):

Linear Operators ◽

Positive Linear Operators ◽

Convergence Properties ◽

Summability Matrices ◽

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Let {Ln} be a sequence of positive linear operators defined on C[a, b] of the form where xnk ∈ [a, b] for each k = 0, 1,…, n = 1, 2,…. The convergence properties of the sequences {Ln(f)} to for each f ∈ C[a, b] have been the object of much recent research (see e.g. [4], [8], [11], [13]). In many cases positive linear operators of the form (1) give rise to interesting summability matrices A = (ank(x)) and vice- versa.

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Approximate point spectrum and commuting compact perturbations

Glasgow Mathematical Journal ◽

10.1017/s0017089500006509 ◽

1986 ◽

Vol 28 (2) ◽

pp. 193-198 ◽

Cited By ~ 32

Author(s):

Vladimir Rakočević

Keyword(s):

Banach Space ◽

Essential Spectrum ◽

Point Spectrum ◽

Complex Banach Space ◽

Linear Operators ◽

Complex Numbers ◽

Approximate Point Spectrum ◽

Infinite Dimensional ◽

Compact Perturbations ◽

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Let X be an infinite-dimensional complex Banach space and denote the set of bounded (compact) linear operators on X by B (X) (K(X)). Let σ(A) and σa(A) denote, respectively, the spectrum and approximate point spectrum of an element A of B(X). Setσem(A)and σeb(A) are respectively Schechter's and Browder's essential spectrum of A ([16], [9]). σea (A) is a non-empty compact subset of the set of complex numbers ℂ and it is called the essential approximate point spectrum of A ([13], [14]). In this note we characterize σab(A) and show that if f is a function analytic in a neighborhood of σ(A), then σab(f(A)) = f(σab(A)). The relation between σa(A) and σeb(A), that is exhibited in this paper, resembles the relation between the σ(A) and the σeb(A), and it is reasonable to call σab(A) Browder's essential approximate point spectrum of A.

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An elementary proof of the Birkhoff-Hopf theorem

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100072911 ◽

1995 ◽

Vol 117 (1) ◽

pp. 31-55 ◽

Cited By ~ 10

Author(s):

Simon P. Eveson ◽

Roger D. Nussbaum

Keyword(s):

Elementary Proof ◽

Linear Operators ◽

Positive Linear Operators ◽

Important Work ◽

Large Classes ◽

Contraction Mappings ◽

Measurable Functions ◽

Almost Everywhere ◽

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Hopf Theorem

In important work some thirty years ago, G. Birkhoff[2, 3] and E. Hopf [16, 17] showed that large classes of positive linear operators behave like contraction mappings with respect to certain ‘almost’ metrics. Hopf worked in a space of measurable functions and took as his ‘almost’ metric the oscillation ω(y/x) of functions y and x with x(t) > 0 almost everywhere, defined by

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On eigenvalues and inverse singular values of compact linear operators in Hilbert space

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100028292 ◽

1953 ◽

Vol 49 (2) ◽

pp. 201-212 ◽

Cited By ~ 1

Author(s):

J. P. O. Silberstein ◽

F. Smithies

Keyword(s):

Hilbert Space ◽

Linear Operator ◽

Continuous Linear Operator ◽

Singular Values ◽

Linear Operators ◽

Complex Numbers ◽

Identity Operator ◽

Continuous Linear ◽

Completely Continuous ◽

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1·1. In this paper we shall be concerned with the equationswhere K is a compact (completely continuous) linear operator in a Hilbert space , K is the adjoint of K, I is the identity operator, x and y are elements of ∥ x ∥ denotes the norm of x, and κ and σ are complex numbers.

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Sharp estimates of approximation by some positive linear operators

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972700021225 ◽

1984 ◽

Vol 29 (1) ◽

pp. 13-18 ◽

Cited By ~ 3

Author(s):

Ashok Sahai ◽

Govind Prasad

Keyword(s):

Modulus Of Continuity ◽

Bernstein Polynomials ◽

Higher Order ◽

Linear Operators ◽

Positive Linear Operators ◽

Higher Order Moments ◽

Sharp Estimates ◽

Quantitative Estimates ◽

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Recently, Varshney and Singh [Rend. Mat. (6) 2 (1982), 219–225] have given sharper quantitative estimates of convergence for Bernstein polynomials, Szasz and Meyer-Konig-Zeller operators. We have achieved improvement over these estimates by taking moments of higher order. For example, in case of the Meyer-Konig-Zeller operator, they gave the following estimatewherein ∥·∥ stands for sup norm. We have improved this result toWe may remark here that for this modulus of continuity ) our result cannot be sharpened further by taking higher order moments.

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Approximation in statistical sense to B -continuous functions by positive linear operators

Studia Scientiarum Mathematicarum Hungarica ◽

10.1556/sscmath.2009.1129 ◽

2010 ◽

Vol 47 (3) ◽

pp. 289-298 ◽

Cited By ~ 2

Author(s):

Fadime Dirik ◽

Oktay Duman ◽

Kamil Demirci

Keyword(s):

Compact Subset ◽

Real Line ◽

Statistical Convergence ◽

Approximation Theorem ◽

Continuous Functions ◽

Linear Operators ◽

Positive Linear Operators ◽

Statistical Approximation ◽

Classical Version ◽

Statistical Sense

In the present work, using the concept of A -statistical convergence for double real sequences, we obtain a statistical approximation theorem for sequences of positive linear operators defined on the space of all real valued B -continuous functions on a compact subset of the real line. Furthermore, we display an application which shows that our new result is stronger than its classical version.

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On αβ-statistical convergence for sequences of fuzzy mappings and Korovkin type approximation theorem

Filomat ◽

10.2298/fil1712749k ◽

2017 ◽

Vol 31 (12) ◽

pp. 3749-3760 ◽

Cited By ~ 5

Author(s):

Ali Karaisa ◽

Uğur Kadak

Keyword(s):

Statistical Convergence ◽

Approximation Theorem ◽

Linear Operators ◽

Positive Linear Operators ◽

Bernstein Operator ◽

Korovkin Type Approximation Theorem ◽

Type Approximation ◽

Inclusion Relations ◽

Prior Investigation

Upon prior investigation on statistical convergence of fuzzy sequences, we study the notion of pointwise ??-statistical convergence of fuzzy mappings of order ?. Also, we establish the concept of strongly ??-summable sequences of fuzzy mappings and investigate some inclusion relations. Further, we get an analogue of Korovkin-type approximation theorem for fuzzy positive linear operators with respect to ??-statistical convergence. Lastly, we apply fuzzy Bernstein operator to construct an example in support of our result.

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