A5101472325- Advanced Mathematical Modeling in Engineering
- Nonlinear Partial Differential Equations
- Navier-Stokes equation solutions
- Advanced Mathematical Physics Problems
- Numerical methods in inverse problems
- Thermoelastic and Magnetoelastic Phenomena
- Stability and Controllability of Differential Equations
- Differential Equations and Numerical Methods
- Numerical methods in engineering
- Fractional Differential Equations Solutions
- Fluid Dynamics and Turbulent Flows
- Composite Material Mechanics
- Advanced Computational Techniques and Applications
- Nanofluid Flow and Heat Transfer
- Mathematical Analysis and Transform Methods
- Differential Equations and Boundary Problems
- Nonlinear Differential Equations Analysis
- Microstructure and Mechanical Properties of Steels
- Advanced Neural Network Applications
- Tunneling and Rock Mechanics
- Advanced Numerical Methods in Computational Mathematics
- Computational Drug Discovery Methods
- Bioinformatics and Genomic Networks
- Contact Mechanics and Variational Inequalities
- Graph theory and applications
Guangzhou Huashang College
2021-2025
Guangzhou Automobile Group (China)
2021-2025
Yunnan Investment Group (China)
2024
Shanxi Datong University
2024
Suzhou Research Institute
2024
Ocean University of China
2023
Guangdong University Of Finances and Economics
2010-2022
Hwa Chong Institution
2022
Guangdong University of Finance
2014-2021
South China University of Technology
2017
Predicting drug-target affinity (DTA) is a crucial step in the process of drug discovery. Efficient and accurate prediction DTA would greatly reduce time economic cost new development, which has encouraged emergence large number deep learning-based methods. In terms representation target proteins, current methods can be classified into 1D sequence- 2D-protein graph-based However, both two approaches focused only on inherent properties protein, but neglected broad prior knowledge regarding...
A new algorithm, Yolov8n-FADS, has been proposed with the aim of improving accuracy miners’ helmet detection algorithms in complex underground environments. By replacing head part Attentional Sequence Fusion (ASF) and introducing P2 layer, ASF-P2 structure is able to comprehensively extract global local feature information image, improvement backbone capture spatially sparsely distributed features more efficiently, which improves model’s ability perceive patterns. The improved head, SEAMHead...
This paper considers the two-dimensional Stokes system in a semi-infinite channel and is committed to deriving structural stability of model. Using differential inequality technique, we obtain expression energy function. By making use earlier work, second order for function obtained. solving this second-order inequality, continuous dependence on coefficient established. shows how derive priori estimates nonlinear terms.
<p>This paper investigates the continuous dependence of solutions to layered composite materials in binary mixtures on perturbation parameters defined a semi-infinite cylinder. Due fact that base cylinder is easily disturbed by compression, this causes disturbances data at entrance. By introducing auxiliary functions related solution equations, article analyzes impact these heat conduction equations and obtains base.</p>
This paper considers the double diffusive Brinkman flow in a semi-infinite pipe. By establishing priori estimates of solutions and setting an appropriate "energy" function, we not only obtain continuous dependence convergence solution on Soret coefficient but also prove that decay exponentially with distance from finite end cylinder.
This paper deals with the blow-up of solution to a non-local reaction diffusion problem in for under nonlinear boundary conditions. Utilizing technique differential inequality, lower bounds time are derived when does occur some suitable assumptions. MSC: 35K20, 35K55, 35K65.
This paper investigates the spatial behavior of solutions double‐diffusive Darcy plane flow in a semi‐infinite channel. Using energy estimate method and differential inequality technology, about is derived. By solving this inequality, it proved that grow polynomially or decay exponentially with variable. In case decay, we obtain upper bound for total energy. We also give some remarks to generalize results paper.
Abstract A priori bounds were derived for the flow in a bounded domain viscous-porous interfacing fluids. We assumed that viscous fluid was slow $\Omega _{1}$ <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML"><mml:msub><mml:mi>Ω</mml:mi><mml:mn>1</mml:mn></mml:msub></mml:math> , which governed by Boussinesq equations. For porous medium _{2}$ xmlns:mml="http://www.w3.org/1998/Math/MathML"><mml:msub><mml:mi>Ω</mml:mi><mml:mn>2</mml:mn></mml:msub></mml:math> we supposed satisfied Darcy...
This paper investigates the spatial behavior of solutions generalized heat conduction equations on a semi-infinite cylinder by means first-order differential inequality. We consider three kinds cylinders with boundary conditions Dirichlet type. For each cylinder, we prove Phragmén–Lindelöf alternative for solutions. In case decay, also present method obtaining explicit bounds total energy.
This paper investigates the spatial behavior of solutions thermoelastic equations type III in a semi-infinite cylinder by using partial differential inequalities. By setting an arbitrary positive constant energy expression, fast decay rate is obtained. Based on results decay, continuous dependence and convergence boundary coefficient are established inequality technique analysis method. The main work this to extend study cylinder, which can be used as reference for other types equations.
<abstract><p>The spatial decay or growth behavior of a coupled nonlinear wave equation with damping and source terms is considered. By defining the equations in cylinder an exterior region, estimates for solutions are obtained by assuming that boundary conditions satisfy certain conditions. We also show rates faster than those relevant literature. This kind can be extended to system viscoelastic type. In case decay, we prove total energy bounded known data.</p></abstract>
In this paper, we consider the initial-boundary value problem for two-dimensional primitive equations of large-scale oceanic dynamics. These models are often used to predict weather and climate change. Using differential inequality technique, rigorous a priori bounds solutions continuous dependence on heat source established. We show application symmetry in mathematical inequalities practice.
Abstract Due to the extensive use of ferrite in nuclear power plants, thermal aging issues ferritic alloys have attracted significant attention. The present study investigates thermally aged FeCr binary with different Cr contents using various mechanical and magnetic properties tests. result indicates that increase element content prolonged significantly enhances strength alloy materials, along an important reduction toughness. Meanwhile, characteristic shows a considerable difference...
This article investigates the Oldroyd fluid, which is widely used in industrial and engineering environments. When fluid passes through a three-dimensional semi-infinite cylinder, asymptotic properties of solutions are established. On this basis, we also studied continuous dependence viscosity coefficient.
This article investigates the spatial decay properties and continuous dependence on basic geometric structure. Assuming that total potential energy is bounded homogeneous Dirichlet condition satisfied side of solution within cylindrical domain, we establish an auxiliary function related to solution. By extending data at finite end forward, can perturbation base data.