Results 261 to 270 of about 9,457,899 (319)
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1997
A real matrix has real coefficients in its characteristic polynomial, but the eigenvalues may fail to be real. For instance, the matrix \(A = \left[ {\begin{array}{*{20}{l}} 1&{ - 1} \\ 1&1 \end{array}} \right]\) has no real eigenvalues, but it has the complex eigenvalues λ= 1 ± i. Thus, it is indispensable to work with complex numbers to find the full
Jin Ho Kwak, Sungpyo Hong
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A real matrix has real coefficients in its characteristic polynomial, but the eigenvalues may fail to be real. For instance, the matrix \(A = \left[ {\begin{array}{*{20}{l}} 1&{ - 1} \\ 1&1 \end{array}} \right]\) has no real eigenvalues, but it has the complex eigenvalues λ= 1 ± i. Thus, it is indispensable to work with complex numbers to find the full
Jin Ho Kwak, Sungpyo Hong
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MambaIR: A Simple Baseline for Image Restoration with State-Space Model
European Conference on Computer VisionRecent years have seen significant advancements in image restoration, largely attributed to the development of modern deep neural networks, such as CNNs and Transformers.
Hang Guo +5 more
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VideoMamba: State Space Model for Efficient Video Understanding
European Conference on Computer VisionAddressing the dual challenges of local redundancy and global dependencies in video understanding, this work innovatively adapts the Mamba to the video domain.
Kunchang Li +6 more
semanticscholar +1 more source
Review: Literature and Arts of the Americas, 1975
(1975). A complex space. Review: Literature and Arts of the Americas: Vol. 9, No. 14, pp. 26-29.
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(1975). A complex space. Review: Literature and Arts of the Americas: Vol. 9, No. 14, pp. 26-29.
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PointMamba: A Simple State Space Model for Point Cloud Analysis
Neural Information Processing SystemsTransformers have become one of the foundational architectures in point cloud analysis tasks due to their excellent global modeling ability. However, the attention mechanism has quadratic complexity, making the design of a linear complexity method with ...
Dingkang Liang +7 more
semanticscholar +1 more source
1994
Section 1 deals with the notion of analytically branched coverings. The main theorem states that analytically branched coverings are normal complex spaces. Its proof makes use of L2-methods as developed by Hormander, and is sketched in § 2. In § 3 some applications are given, some of which are used in § 7.
G. Dethloff, H. Grauert
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Section 1 deals with the notion of analytically branched coverings. The main theorem states that analytically branched coverings are normal complex spaces. Its proof makes use of L2-methods as developed by Hormander, and is sketched in § 2. In § 3 some applications are given, some of which are used in § 7.
G. Dethloff, H. Grauert
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2021
This chapter develops basic properties of complex Euclidean space. Some of the main ideas are unitary transformations, the holomorphic automorphism group of the unit ball, the use of Hermitian forms, and proper holomorphic mappings. We also gather some elementary combinatorial information.
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This chapter develops basic properties of complex Euclidean space. Some of the main ideas are unitary transformations, the holomorphic automorphism group of the unit ball, the use of Hermitian forms, and proper holomorphic mappings. We also gather some elementary combinatorial information.
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1997
All Riesz spaces in the preceding sections are real Riesz spaces. We shall now define complex Riesz spaces and then extend a considerable part of the theory to these complex spaces. Recall first that the Cartesian product X × Y of the non-empty sets X and Y is the set of all ordered pairs (x, y) such that x ∈ X and y ∈ Y.
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All Riesz spaces in the preceding sections are real Riesz spaces. We shall now define complex Riesz spaces and then extend a considerable part of the theory to these complex spaces. Recall first that the Cartesian product X × Y of the non-empty sets X and Y is the set of all ordered pairs (x, y) such that x ∈ X and y ∈ Y.
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2004
Deeming the monograph of M. Abate and G. Patrizio, [A-P], there are not many elements of novelties to bring here in complex Finsler geometry. Nevertheless, the treating in the so far used terms is very useful and, certainly, in such an ample topic some recent own contributions will not be missing here.
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Deeming the monograph of M. Abate and G. Patrizio, [A-P], there are not many elements of novelties to bring here in complex Finsler geometry. Nevertheless, the treating in the so far used terms is very useful and, certainly, in such an ample topic some recent own contributions will not be missing here.
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2015
I give a thorough introduction to the global theory of, possibly singular, symplectic complex spaces. The spaces are assumed to be of Kahler type for the most part. My presentation focuses on the study of proper and flat deformations. The corresponding local theory of symplectic singularities is hardly touched upon.
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I give a thorough introduction to the global theory of, possibly singular, symplectic complex spaces. The spaces are assumed to be of Kahler type for the most part. My presentation focuses on the study of proper and flat deformations. The corresponding local theory of symplectic singularities is hardly touched upon.
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