Math @ Duke

Yuan Gao, William W. Elliott Assistant Research Professor of Mathematics and Statistical Science
I am a William W. Elliott Assistant Research Professor working on Analysis and PDE.  Contact Info:
 Office Hours:
 Physics 06, TuTh 10am11am and 2pm3pm. Or by appointment.
 Research Interests: PDE, Calculus of Variation, Control Theory, Material Science
My research interest is the mathematical analysis of nonlinear evolution equations derived from physics problems, especially in materials science and surface science. I mainly work on 4th order degenerated parabolic equations, coupled equations with dynamic boundary condition and multiscale problems. The methods invovled are entropy method, calculus of variation, gradient flows, numerical simulation, operator theory, and control theory.
 Keywords:
Diffusion processes and stochastic analysis on manifolds • Dimension reduction (Statistics) • General behavior of solutions of PDE (comparison theorems; oscillation, zeros and growth of solutions; mean value theorems) • PDE in connection with control problems • PDE with multivalued righthand sides • Simulation and numerical modeling
 Recent Publications
(More Publications)
(search)
 Dong, H; Gao, Y, Existence and uniqueness of bounded stable solutions to the Peierlsâ€“Nabarro model for curved dislocations,
Calculus of Variations and Partial Differential Equations, vol. 60 no. 2
(April, 2021) [doi] [abs]
 Gao, Y; Lu, XY; Wang, C, Regularity and monotonicity for solutions to a continuum model of epitaxial growth with nonlocal elastic effects,
Advances in Calculus of Variations
(January, 2021) [doi] [abs]
 Gao, Y; Liu, JG, Gradient flow formulation and second order numerical method for motion by mean curvature and contact line dynamics on rough surface,
Interfaces and Free Boundaries, vol. 23 no. 1
(January, 2021),
pp. 103158 [doi] [abs]
 Gao, Y; Liu, JG, Large Time Behavior, BiHamiltonian Structure, and Kinetic Formulation for a Complex Burgers Equation,
Quarterly of Applied Mathematics, vol. 79 no. 1
(May, 2020),
pp. 120123, American Mathematical Society (AMS) [doi] [abs]
 Gao, Y; Liu, JG; Luo, T; Xiang, Y, Revisit of the peierlsnabarro model for edge dislocations in Hilbert space,
Discrete and Continuous Dynamical Systems Series B, vol. 22 no. 11
(January, 2020) [doi] [abs]


dept@math.duke.edu
ph: 919.660.2800
fax: 919.660.2821
 
Mathematics Department
Duke University, Box 90320
Durham, NC 277080320

