Results 71 to 80 of about 6,185,996 (263)
Ideal Convergence of k-Positive Linear Operators
Journal of Function Spaces and Applications, 2012 We study some ideal convergence results of k-positive linear operators defined on an appropriate subspace of the space of all analytic functions on a bounded simply connected domain in the complex plane.
Akif Gadjiev +2 more
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Value Distribution and Linear Operators [PDF]
Proceedings of the Edinburgh Mathematical Society, 2013 AbstractNevanlinna's second main theorem is a far-reaching generalization of Picard's theorem concerning the value distribution of an arbitrary meromorphic function f. The theorem takes the form of an inequality containing a ramification term in which the zeros and poles of the derivative f′ appear.
Risto Korhonen, Rodney Halburd
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Exploring Bounded Linear Operators in Neutrosophic Normed Linear Spaces
Fuzzy Information and EngineeringThis study focuses on analyzing the convergence of the product of sequences and investigating the Cauchy sequences under specific conditions within neutrosophic normed linear spaces (NNLS).
Chandan Chaurasiya +3 more
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Convergence of Sequences of Linear Operators and Their Spectra
, 2016 We establish spectral convergence results of approximations of unbounded non-selfadjoint linear operators with compact resolvents by operators that converge in generalized strong resolvent sense.
S. Bögli
semanticscholar +1 more source
The largest linear space of operators satisfying the Daugavet Equation in L_1 [PDF]
arXiv, 1999 We find the largest linear space of bounded linear operators on L_1(Omega), that being restricted to any L_1(A), A \subset Omega, satisfy the Daugavet equation.
arxiv
Mathematische Zeitschrift, 1967 To every complex or real Banach space E we shall make correspond a locally convex Hausdorff space (J~, T), called the hull of E, with the following properties: (i) E is a snbspace of E; (ii) every linear operator A with both domain and range in E has a unique extension A in/2; (iii) the spectra of A and .4 coincide; (iv) if A has empty residual ...
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Complexity of Linear Operators
, 2018 Let $A \in \{0,1\}^{n \times n}$ be a matrix with $z$ zeroes and $u$ ones and $x$ be an $n$-dimensional vector of formal variables over a semigroup $(S, \circ)$. How many semigroup operations are required to compute the linear operator $Ax$? As we observe in this paper, this problem contains as a special case the well-known range queries problem and ...
Kulikov, Alexander S. +3 more
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Schwartz Linear operators in distribution spaces [PDF]
arXiv, 2011 In this paper we define the Schwartz linear operators among spaces of tempered distributions. These operators are the analogous of linear continuous operators among separable Hilbert spaces, but in the case of spaces endowed with Schwartz bases having a continuous index set.
arxiv
Approximating Derivatives by a Class of Positive Linear Operators
International Journal of Analysis and Applications, 2013 Some Direct Theorems for the linear combinations of a new class of positive linear operators have been obtained for both, pointwise and uniform simultaneous approximations.
Bramha Dutta Pandey, B. Kunwar
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Continuous linear operators on Orlicz-Bochner spaces
Open Mathematics, 2019 Let (Ω, Σ, μ) be a complete σ-finite measure space, φ a Young function and X and Y be Banach spaces. Let Lφ(X) denote the corresponding Orlicz-Bochner space and Tφ∧$\begin{array}{} \displaystyle \mathcal T^\wedge_\varphi \end{array}$ denote the finest ...
Nowak Marian
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