Results 211 to 220 of about 6,505 (255)
Bowen's Formula for a Dynamical Solenoid. [PDF]
Entropy (Basel)Biś A, Kozłowski W, Marczuk A.
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Fully automated deep learning model for the evaluation of cavum septum pellucidum development in normal fetuses using magnetic resonance imaging: a Chinese cohort study. [PDF]
Quant Imaging Med SurgZhu Z +17 more
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On the Isoperimetric and Isodiametric Inequalities and the Minimisation of Eigenvalues of the Laplacian. [PDF]
J Geom AnalFarrington S.
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Multimodal Guidewire 3D Reconstruction Based on Magnetic Field Data. [PDF]
Sensors (Basel)Jiang W, Zheng Q, Yang D, Li J, Wei W.
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Existence And Uniqueness Theorems For Some Common Fixed Points In Hausdorff Uniform Spaces
, 2012 Alfred Olufemi Bosede
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Discretization in Hausdorff Space
Journal of Mathematical Imaging and Vision, 2000zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Ronse, Christian, Tajine, Mohamed
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Canadian Mathematical Bulletin, 1966
It is well-known that in a Hausdorff space, a sequence has at most one limit, but that the converse is not true. The condition that every sequence have at most one limit will be called the semi-Hausdorff condition. We will prove that the semi-Hausdorff condition is strictly stronger than the T1 -axiom and is thus between the T1 and T2 axioms.
Murdeshwar, M. G., Naimpally, S. A.
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It is well-known that in a Hausdorff space, a sequence has at most one limit, but that the converse is not true. The condition that every sequence have at most one limit will be called the semi-Hausdorff condition. We will prove that the semi-Hausdorff condition is strictly stronger than the T1 -axiom and is thus between the T1 and T2 axioms.
Murdeshwar, M. G., Naimpally, S. A.
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Hausdorff Reductions of Leaves Spaces
Analysis Mathematica, 2022The author considers the following situation: a continuous map \(F:X\to M\) from a locally path connected topological space \(X\) to a topological space \(M\). The map \(F\) induces various quotients of \(X\); the author considers the space of leaves, where \(x\) and \(y\) are equivalent (\(x\sim y\)) if there is a path that connects \(x\) and \(y\) on
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Hausdorff Implementation of Linear Geodesics in the Gromov–Hausdorff Space
Journal of Mathematical Sciences, 2023zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Ivanov, A. O., Tuzhilin, A. A.
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