A5100700522- Quasicrystal Structures and Properties
- Mathematical Approximation and Integration
- Differential Equations and Boundary Problems
- Mathematical Dynamics and Fractals
- Differential Equations and Numerical Methods
- Homotopy and Cohomology in Algebraic Topology
- Algebraic structures and combinatorial models
- Nonlinear Differential Equations Analysis
- Advanced Topics in Algebra
- Advanced Banach Space Theory
- Mathematical Analysis and Transform Methods
- Advanced Numerical Methods in Computational Mathematics
- Algebraic Geometry and Number Theory
- Advanced Harmonic Analysis Research
- Numerical methods for differential equations
- Railway Systems and Materials Science
- X-ray Diffraction in Crystallography
- Advanced Differential Equations and Dynamical Systems
- Matrix Theory and Algorithms
Zhejiang Normal University
2024
Xihua University
2023
Qilu Normal University
2017
Huazhong University of Science and Technology
2016
Tsinghua University
2014
University of Aveiro
2010
We provide significant conditions under which we prove the existence of stable open book structures at infinity, i.e. on spheres $S^{m-1}_R$ large enough radius $R$. obtain new classes real polynomial maps $\mathbb R^m \to \mathbb R^p$ induce such structures.
In this paper, the controllability of a class fractional differential evolution equations with nonlocal conditions is investigated.Sufficient which guarantee are obtained.The method used contraction mapping principle and Krasnoselskii theorem.A distributed parameter control system provided to illustrate applications our results.
To accelerate dynamic security assessments of large scale transmission power systems, efficient transient simulation tools are desperately required, especially the advanced nonlinear equation solvers. Jacobian-free Newton-GMRES(m) [JFNG(m)] is a high efficiency equations solver. However, computation burden matrix-vector multiplication dramatically increases as system enlarges. In this paper, parallelism capability GPU(Graphic Processing Unit) fully exploited to speed up large-scale system. A...
In this paper, we study the Manin triples associated to [Formula: see text]-Lie bialgebras. We introduce concept of operad matrices for particular, by studying a special case matrices, it leads notion local cocycle Furthermore, establish one-to-one correspondence between double bialgebras and algebras.
In this paper, we study the approximation characteristics of weighted p-Wiener algebra AωpTd for 1≤p<∞ defined on d-dimensional torus Td. particular, investigate asymptotic behavior numbers, Kolmogorov and entropy numbers associated with embeddings id:AωpTd→ATd id:AωpTd→LqTd 1≤p, q<∞, where ATd is Wiener
The direct products and semidirect of quasi-crystallographic point groups, were derived from group theory. According to crystallography theory, the stereographic projection pentagonal system, octagonal decagonal system dodecagonal drawn. Basing upon them, all maximal subgroups each As a result, supergroups three-dimensional crystallographic groups (the ‘family tree' sixty groups) depicted in drawing. In tree', minimal illustrated detail form subgroup chains.