Results 21 to 30 of about 55,940 (168)

Daugavet points and $\Delta $-points in Lipschitz-free spaces [PDF]

Studia Mathematica, 2022
Comment: 19 ...
Jung, Mingu, Rueda Zoca, Abraham
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On Lipschitz-free spaces over spheres of Banach spaces [PDF]

Journal of Mathematical Analysis and Applications, 2021
We prove that, for each Banach space $X$ which is isomorphic to its hyperplanes, the Lipschitz-free spaces over $X$ and over its sphere are isomorphic.
Leandro Candido, Pedro L. Kaufmann
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The Lipschitz free Banach spaces of $C(K)$-spaces [PDF]

Proceedings of the American Mathematical Society, 2005
Given a metric space \(X\) with a special point \(0\), its \textit{free Banach space} \({\mathcal F} (X)\) is the linear subspace of \(\big[\text{Lip}_0(X)\big]^\ast\) generated by the evaluation functionals \(f \mapsto f(x)\) for \(x\in X\), where \(\text{Lip}_0(X)\) is the space of Lipschitz functions \(f\colon X \to \mathbb R\) which vanish at \(0\),
Dutrieux, Yves, Ferenczi, Valentin
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Extremal Structure and Duality of Lipschitz Free Spaces [PDF]

Mediterranean Journal of Mathematics, 2018
28 ...
Luis García-Lirola, Colin Petitjean, Antonín Procházka, Abraham Rueda Zoca   +3 more
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A temperature control problem

International Journal of Mathematics and Mathematical Sciences, 1984
In an open bounded region of n-space occupied by a homogeneous and isotropic medium, we control the temperature through the boundary. The normal derivative of the temperature (which measures the appropriate heat flux) is restricted to be nonnegative ...
Ioannis Athanasopoulos
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Lipschitz-free spaces and subsets of finite-dimensional spaces

Proceedings of the Royal Society of Edinburgh: Section A Mathematics, 2023
We consider two questions on the geometry of Lipschitz-free $p$-spaces $\mathcal {F}_p$, where $0< p\leq 1$, over subsets of finite-dimensional vector spaces. We solve an open problem and show that if $(\mathcal {M}, \rho )$ is an infinite doubling metric space (e.g. an infinite subset of an Euclidean space), then $\mathcal {F}_p (\mathcal {M}, \rho
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On the Global Limiting Absorption Principle for Massless Dirac Operators [PDF]

, 2017
We prove a global limiting absorption principle on the entire real line for free, massless Dirac operators $H_0 = \alpha \cdot (-i \nabla)$ for all space dimensions $n \in \mathbb{N}$, $n \geq 2$. This is a new result for all dimensions other than three,
Carey, Alan, Gesztesy, Fritz, Kaad, Jens, Levitina, Galina, Nichols, Roger, Potapov, Denis, Sukochev, Fedor   +6 more
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Nonrough norms in Lipschitz free spaces

, 2023
In this paper we characterise nonrough norms of Lipschitz free spaces F(M) in terms of a new geometric property of the underlying metric space M.
Basu, Sudeshna, Seal, Susmita
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Hypercyclic operators on Lipschitz spaces [PDF]

Математичні Студії, 2013
We consider hypercyclic operators on free Banach spaces and little Lipschitz spaces which are some kind of generalizations of shift operators and composition operators respectively.
M. V. Dubey, Z. H. Mozhyrovska, A. V. Zagorodnyuk   +2 more
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Hyperbolic Metric Spaces and Stochastic Embeddings

Forum of Mathematics, Sigma
Stochastic embeddings of finite metric spaces into graph-theoretic trees have proven to be a vital tool for constructing approximation algorithms in theoretical computer science.
Chris Gartland
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