A5100631303- Stochastic processes and financial applications
- Mathematical Biology Tumor Growth
- Gas Dynamics and Kinetic Theory
- Stochastic processes and statistical mechanics
- Resource-Constrained Project Scheduling
- Markov Chains and Monte Carlo Methods
- Mathematical Dynamics and Fractals
- Stability and Controllability of Differential Equations
- Nonlinear Partial Differential Equations
- Nonlinear Differential Equations Analysis
- Supply Chain and Inventory Management
- Scheduling and Optimization Algorithms
- Advanced MIMO Systems Optimization
- Advanced Mathematical Modeling in Engineering
- Economic theories and models
- Advanced Wireless Communication Techniques
- Animal Virus Infections Studies
- Complex Systems and Time Series Analysis
Southwestern University of Finance and Economics
2016-2019
University of Strathclyde
2016
This paper is devoted to path-dependent kinetics equations arising, in particular, from the analysis of coupled backward-forward systems mean field games. We present local well-posedness, global existence and some regularity results for these equations.
This paper is devoted to path-dependent kinetics equations arising, in particular, from the analysis of coupled backward - forward systems mean field games. We present local well-posedness, global existence and some regularity results for these equations.
In this paper, we consider the following sublinear Kirchhoff problems , in where a > 0 and b ≥ with N 3. A new growth condition is given. When f ( x u ) not odd integrable obtain existence of solutions for above problem.