德国马尔堡菲利普斯大学Klaus Bohmer教授讲座(一)
讲座名称:
德国马尔堡菲利普斯大学Klaus Bohmer教授讲座(一)
讲座时间:
2013-10-21
讲座人:
Klaus Bohmer
形式:
校区:
兴庆校区
实践学分:
讲座内容:
题 目:Full center manifold discretizations for near-onset convection patterns in the spherical Benard problem
时 间:2013年10月21日上午 10:00 -- 11:30
地 点:理科楼-407
主讲人:Klaus Bohmer 教授
单 位:德国马尔堡菲力普斯大学
摘 要:Large dynamical systems are often obtained as discretizations of parabolic PDEs with nonlinear elliptic parts, either equations or system of order 2 or 2m, m > 1. Space and time discretization methods, so called full discretizations, are necessary to determine the local dynamics on center manifolds. We proved for the first time that, allowing stable, and center manifolds, We combine the standard space discretization methods, e.g. the standard methods used in nonlinear elliptic PDEs with time discretizations. Then the space discrete center manifolds converge to the original center manifolds: The coefficients of the Taylor expansion of a discrete center manifold and its normal form converge to those of the original center manifold. Then standard, e.g., Runge--Kutta, or geometric time discretization methods can be applied to the discrete center manifold system, a small dimensional system of ordinary differential equations.
These results are applied to near-onset convection patterns in the spherical B'enard problem in the earth mantle. This problem is 5--determined, so we need the center manifold, instead of a Liapunov--Schmidt technique. The numerical method has to inherit the equivariance, so that of the sherical harmonics. We use a Chebyshev collocation spectral method, and instead of the exact we obtain an approximate discrete normal form.
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