A5100320058- Advanced Mathematical Physics Problems
- Nonlinear Waves and Solitons
- Matrix Theory and Algorithms
- Graph theory and applications
- Nonlinear Photonic Systems
- graph theory and CDMA systems
- Mathematical Analysis and Transform Methods
- Random Matrices and Applications
- Advanced Topics in Algebra
- Advanced Causal Inference Techniques
- Computational Drug Discovery Methods
- Statistical Methods and Inference
- Holomorphic and Operator Theory
- Rough Sets and Fuzzy Logic
- Algebraic and Geometric Analysis
- Advanced Mathematical Identities
- Topological and Geometric Data Analysis
- Polynomial and algebraic computation
- Microbial Metabolism and Applications
- Computability, Logic, AI Algorithms
- Advanced Multi-Objective Optimization Algorithms
- Nonlinear Partial Differential Equations
- Sentiment Analysis and Opinion Mining
- Microfluidic and Capillary Electrophoresis Applications
- Ionosphere and magnetosphere dynamics
Guangzhou University
2023
Shaanxi Normal University
2023
Hebei Normal University
2022
The University of Texas at Arlington
2002-2022
Fuzhou University
2011-2022
Tianjin University of Technology
2022
Shanghai University
2022
First Teaching Hospital of Tianjin University of Traditional Chinese Medicine
2022
Chinatex Posts and Telecommunications Consulting and Design Institute (China)
2021
Harbin Normal University
2020
In this paper we mainly study the problem of development singularities for solutions to periodic Degasperis-Procesi equation. Firstly, show that first blow-up strong solution equation must occur only in form wave breaking and shock waves possibly appear afterwards. Secondly, established two new results. Thirdly, investigate rate all non-global determine set blowing-up a large class initial data. We finally give an explicit example weak equation, which may be considered as waves.
Abstract Objectives We propose a one-shot, privacy-preserving distributed algorithm to perform logistic regression (ODAL) across multiple clinical sites. Materials and Methods ODAL effectively utilizes the information from local site (where patient-level data are accessible) incorporates first-order (ODAL1) second-order (ODAL2) gradients of likelihood function other sites construct an estimator without requiring iterative communication or transferring data. evaluated via extensive simulation...
Considered herein is the stability problem of solitary wave solutions a generalized Ostrovsky equation, which modification Korteweg–de Vries equation widely used to describe effect rotation on surface and internal waves or capillary waves.
In this paper we study several aspects of solitary wave solutions the Ostrovsky equation. Using variational methods, show that as rotation parameter goes to zero, ground state waves equation converge Korteweg-deVries We also investigate properties function $d(c)$ which determines stability states. an important scaling identity, together with numerical approximations waves, are able numerically approximate $d(c)$. These calculations suggest $d$ is convex everywhere, and therefore all stable.
Abstract Despite the great progress has been made on device parameters and working mechanism of perovskite‐based memristors, thermal instability under extreme conditions limits their performance, effect resistive switching (RS) characteristics remains unclear. Herein, from viewpoint organic/inorganic interfacial interaction in a novel 2D <100>‐oriented perovskite [(TZ‐H) 2 (PbBr 4 )] n (TZ = 1H‐1,2,4‐triazole), RS performance memristor is investigated. This FTO/[(TZ‐H) /Ag can exhibit...
Numerous computational drug repurposing methods have emerged as efficient alternatives to costly and time-consuming traditional discovery approaches. Some of these are based on the assumption that candidate should a reversal effect disease-associated genes. However, such not applicable in case there is limited overlap between disease-related genes drug-perturbed In this study, we proposed novel Drug Repurposing method Inhibition Effect gene regulatory network (DRIE) identify potential drugs...
The rotation-modified Kadomtsev–Petviashvili equation describes small-amplitude, long internal waves propagating in one primary direction a rotating frame of reference. main investigation is the existence and properties its solitary waves. nonexistence results for are obtained, their regularity decay established. Various characterizations given ground states cylindrical symmetry demonstrated. When effects rotation weak, energy minima constrained by constant momentum shown to be nonlinearly...
To synthesize and determine the antifungal activity of AgBr-nanoparticles (NP) @CTMAB (cetyltrimethyl-ammonium bromide) against Candida albicans (C. albicans) for use in field denture cleaning.The morphology structure AgBr-NP@CTMAB were characterized by IR, UV-Vis, XRD SEM. The potential C. was determined colony formation assay growth curve analysis. PMMA containing prepared, long-term efficacy analyzed. effect biofilm analyzed SEM OD600 , color changes specimens observed stereomicroscopy...
Abstract The rotation-modified Kadomtsev-Petviashvili equation is a modification of the (KP) widely used to describe effects rotation on small-amplitude, long waves propagating in one primary direction. In this paper we investigate conditions for finite-time blow-up solutions and uniform bounds solution generalized equation. are expressed terms energy best constant anisotropic Sobolev inequality.