SU Ning  Teaching
Info
How to Contact:

office: Room 1318, New Science Building,
Tsinghua Campus

phones: +86(0)1062772860(O)
Teaching Courses:

Calculus
(03/0106/01, 09/0112/01, 02/0206/02, 09/0212/02)
Teaching Experience:

09/9906/00 Calculus, including
functions, limits, continuity, differential, indefinite integral, Riemann
integration, NewtonLeibniz formula, several variable functions, partial
differential, gradient, multiintegration, divergence formulas (GreenGaussStokes
formulas), elementary differential equations.

09/9801/99 Introduction to Mathematical
Physics Equations, including wave, heat, and potential equations, their
derivation and solutions, variable separation, Fourier transformation,
energy estimation, uniqueness and stability, maximum principle.

09/9801/99 Advanced Calculus,
including metric spaces, continuous functions, contraction mapping principle,
inverse function theorem, existence theorem for differential equations,
measure, measurable functions, Lebesgue integration, L2 spaces.

09/9707/98 Calculus, including
functions, limits, continuity, differential, indefinite integral, Riemann
integration, NewtonLeibniz formula, two variable functions, partial differential,
gradient, multiintegration, divergence formulas (GreenGaussStokes formulas).

02/9607/97 Real Analysis,
including ndimensional Euclidian space, several variable functions, continuity,
differential, RiemannStieltjes integration, differential forms, Lebesgue
measure and integration.

09/9601/97 Morden Partial Differential
Equations, including Sobolev spaces, elliptic boundary value problem,
abstract function spaces, abstract evolution equations, linear semigroup
method, RitzGalerkin methods.

09/9501/96 Morden Partial Differential
Equations.

02/9507/95 Engineering Mathematical
Methods, including complex variable functions, vector analysis, mahtematical
physics equations, variational method, integral transformation.

09/9401/95 Morden Partial Differential
Equations.

02/9407/94 Engineering Mathematical
Methods.

09/9301/94 Morden Partial Differential
Equations.

02/9307/93 Mathematical Physics
Equations, including wave, heat, and potential equations, their derivation
and solutions, variable separation, Fourier transformation, energy estimation,
uniqueness and stability, Green function, maximum principle, variational
principle.
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