Partial Differential Equations (Math 473 Mast 666, Sec A) Winter 2017
Assignment [1]
[Due 19 Jan]
Assignment [2] § 3.1 {1, 2, 3, 6, 12} [Due 26 Jan ]
Assignment [3] § 3.2 {2, 4} § 3.3 {2, 3, 4, 7} [Due 2 Feb ]
Assignment [4] § 4.1 {1, 2, 7, 8, 9ad} § 4.2 {3, 10} [Due 9 Feb ]
Assignment [5] § 4.3 {3, 9, 10ab} § 4.4 {7, 10, 13} § (*) {Find the first 4 o.n. Legendre polynomials on [-1, 1] by using Gram-Schmidt} [Due 16 Feb ]
Midterm Test: In Class Mar 2. Scope: Assignments 1 through 5 : A1 - A5. Duration: 1 hour.
The solutions for A5 will be posted 16 Feb, and scripts returned in class on 28 Feb.
Assignment [6]
[Due 9 March]
Assignment [7] § 5.1 {1, 2} § 5.2 {1, 3} [Due 16 March]
Assignment [8] Q1: Consider the SL problem on [-2,2] with the eigen equation
-y"(x) + |x|y(x) = E y(x) and BC y(-2) = y(2) = 0.
Find upper bounds to the first two eigenvalues {E1, E2} of this problem by
exploring a suitable two-dimensional trial space.
Consider now the first eigenvalue for the problem on [-a, a]. For a = infinity, E1 = 1.018793 [approx].
By varying a, see how close you can get the upper bound to this smallest value.
§ 9.1 {13, 14} [Due 23 March]
Assignment [9] § 9.5 {1, 2(a), 3(a)(b), 5(a)} [Due 30 March]
Assignment [10] § 6.1 {2}, § 6.2 {2, 4, 5(a)} [Due 6 April]