A5101426626- Spectral Theory in Mathematical Physics
- Numerical methods in inverse problems
- Advanced Mathematical Modeling in Engineering
- Differential Equations and Boundary Problems
- Nuclear reactor physics and engineering
- Holomorphic and Operator Theory
- Algebraic and Geometric Analysis
- Point processes and geometric inequalities
- Cerebral Palsy and Movement Disorders
- Stability and Controllability of Differential Equations
- Botulinum Toxin and Related Neurological Disorders
- Quantum chaos and dynamical systems
- Stroke Rehabilitation and Recovery
- Advanced Operator Algebra Research
- Traditional Chinese Medicine Analysis
- Nonlinear Differential Equations Analysis
- Optical Imaging and Spectroscopy Techniques
- Nuclear Engineering Thermal-Hydraulics
- Mathematical Analysis and Transform Methods
- Pharmacy and Medical Practices
- Differential Equations and Numerical Methods
- Law, logistics, and international trade
- Neuroscience and Neuropharmacology Research
- Dental Erosion and Treatment
- Cardiac Health and Mental Health
Zhuhai People's Hospital
2023
Jinan University
2023
First Affiliated Hospital of University of South China
2020
University of South China
2020
Tianjin International Joint Academy of Biomedicine
2018
Tianjin University of Traditional Chinese Medicine
2018
Centre Hospitalier Universitaire Sainte-Justine
2016
Tianjin University of Finance and Economics
2009
China Institute of Atomic Energy
1981-2002
Institute of Atomic Energy
1981-1991
Ischemic brain injury impacts cardiac dysfunction depending on the part of affected, with a manifestation irregular blood pressure, arrhythmia, and heart failure. Generally called brain-heart syndrome in traditional Chinese medicine, few mechanistic understanding treatment options are available at present. We hypothesize that considering established efficacy for both ischemic stroke myocardial infarction (MI), Danhong injection (DHI), multicomponent patent may have dual pharmacological...
Background Pediatric cerebral palsy (CP) is a non-progressive brain injury syndrome characterized by central motor dysfunction and insufficient coordination ability. The etiology of CP complex often accompanied diverse complications such as intellectual disability language disorders, making clinical treatment difficult. Despite the availability pharmacological interventions, rehabilitation programs, spasticity relief surgery options for CP, their effectiveness still constrained....
Abstract In this paper, the time dependent linear transport equation with an isotropic, energy dependent, non-uniform bounded convex media and specular reflection boundary condition is considered. The existence, uniqueness stability of its solution for initial value are proved. spectral properties independent operator studied.
The long time asymptotic behaviour of the solution for time-dependent neutron transport integro- differential equation is determined by dominant eigenvalue operator. This a basic problem which has not yet been solved in theory. In this paper, using operator theory L2-space we have proved existence energy-dependent most general cases concerned with anisotropic scattering and/or fission an arbitrary nonhomogeneous finite convex medium possibly cavity.
Abstract In this paper we deal with a class of inverse problems for an operator-valued mapping in Banach space, which is usually associated compact operator equation. Our aim to remove the restriction compactness. The existence, uniqueness and stability solution problem are shown. results obtained here applied transport equation inhomogeneous medium. An example given illustrate relationship between topology.
Abstract This paper discusses the spectrum of energy-dependent neutron transport opertor in anisotropic nonhomogeneous slab geometry with generalized boundary conditions. We prove existence a strictly dominant eigenavalue for this operator.
Abstract In this paper we generalize Kato's perturbation theory to weakly compact perturbations. As applications of theory, discuss the distribution essential spectrum linear transport operators.
Abstract The complex eigenvalue problem of a mono-energetic neutron transport operator is studied in homogeneous sphere with spherically symmetric scattering. It shown that the spectrum involves countable infinity eigenvalues.
Objective To explore the effects of exercise rehabilitation nursing mode on cardiac function and quality life (QOL) in patients with chronic heart failure (CHF). Methods Patients CHF were randomly divided into experimental group (n=30) control (n=30). Patients given based drug therapy, while therapy. The whole treatment lasted for about three weeks, follow-up half a year. Cardiac function, change QOL readmission rate at 3 weeks year two groups observed compared. Results The was...
[Objective] A randomized controlled trial was conducted to investigate a systematic intervention improve medication safety among elderly people in the community. [Methods] 150 community patients with chronic diseases were randomly selected and divided into group control group. In addition conventional guidance methods, multidisciplinary team cooperation mode added After 2 months of intervention, knowledge, belief practice two groups compared analyzed. [Results]After inter-group intra-group...
ABSTRACT Spectral properties of the transport operator in a nonuniform slab with generalized boundary conditions were first studied Ref. [1] Belleni-Morante, A. 1970. J. Math. Phys., 11: 1553–1557. [Crossref] , [Google Scholar]. The author showed that is an infinitesimal generator C 0-semigroup and it has at least one real eigenvalue displaying asymptotic behavior initial-value problem. Both continuous spectrum possible accumulation points isolated eigenvalues have not been considered. In...
Let g be a holomorphic function of the unit ball B in several complex variables, and denote by induced extended Cesaro operator. This paper discussed boundedness compactness acting from to Bloch space ball.
Abstract We give a complete description of the spectrum transport operator for bounded convex body. show that Jorgen's spectra satisfy summability: σ < ∞ where τ is maximum escape time. Moreover, we obtain eigenfunction expansion semigroup Et) all t > 6τ.
Abstract U-scalar operators are discussed in this paper. We give the necessary and sufficient conditions for an operator with purely discrete spectrum to be u-scalar. And generally, we prove that a u-scalar is Hermitian sense of some topology. A new example given. This not spectral scalar type.
Abstract In computational and experimental aspects of nuclear reactor theory, the perturbation method is applied in many ways1,2. this paper we rigorously apply to find qualitative results for critical parameter, flux, fundamental decay factor (the dominant eigenvalue) mode.