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A new inequality for weakly $(K_{1}, K_{2})$ -Quasiregular mappings.

Tong, Yuxia; Gu, Jiantao; Li, Ying — 2007

JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]

Electromagnetic topology analysis to coupling wires enclosed in cavities with apertures.

Li, Ying; Luo, Jianshu; Ni, Guyan; Shi, Jiyuan — 2010

Mathematical Problems in Engineering

Dynamic analysis of an impulsive differential equation with time-varying delays

Ying Li; Yuanfu Shao — 2014

Applications of Mathematics

An impulsive differential equation with time varying delay is proposed in this paper. By using some analysis techniques with combination of coincidence degree theory, sufficient conditions for the permanence, the existence and global attractivity of positive periodic solution are established. The results of this paper improve and generalize some previously known results.

On Decomposition Theorems for Hardy Spaces on Domains in ... and Applications.

Steven G. Krantz; Song-Ying Li — 1995

The journal of Fourier analysis and applications [[Elektronische Ressource]]

Duality theorems for Hardy and Bergman spaces on convex domains of finite type in $ℂ^{n}$

Steven G. Krantz; Song-Ying Li — 1995

Annales de l'institut Fourier

We study Hardy, Bergman, Bloch, and BMO spaces on convex domains of finite type in $n$ -dimensional complex space. Duals of these spaces are computed. The essential features of complex domains of finite type, that make these theorems possible, are isolated.

On the boundedness of multipliers, commutators and the second derivatives of Green’s operators on $H^{1}$ and $B M O$

Der-Chen Chang; Song-Ying Li — 1999

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

A novel robust principal component analysis method for image and video processing

Guoqiang Huan; Ying Li; Zhanjie Song — 2016

Applications of Mathematics

The research on the robust principal component analysis has been attracting much attention recently. Generally, the model assumes sparse noise and characterizes the error term by the $ℓ_{1}$ -norm. However, the sparse noise has clustering effect in practice so using a certain $ℓ_{p}$ -norm simply is not appropriate for modeling. In this paper, we propose a novel method based on sparse Bayesian learning principles and Markov random fields. The method is proved to be very effective for low-rank matrix recovery...

Migrativity properties of 2-uninorms over semi-t-operators

Ying Li-Jun; Qin Feng — 2022

Kybernetika

In this paper, we analyze and characterize all solutions about $α$ -migrativity properties of the five subclasses of 2-uninorms, i. e. $C^{k}$ , $C_{k}^{0}$ , $C_{k}^{1}$ , $C_{1}^{0}$ , $C_{0}^{1}$ , over semi-t-operators. We give the sufficient and necessary conditions that make these $α$ -migrativity equations hold for all possible combinations of 2-uninorms over semi-t-operators. The results obtained show that for $G \in C^{k}$ , the $α$ -migrativity of $G$ over a semi-t-operator $F_{μ, ν}$ is closely related to the $α$ -section of $F_{μ, ν}$ or the ordinal sum representation of t-norm...

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