課程名稱︰偏微分方程式一 課程性質︰數學系選修 課程教師︰夏俊雄 開課學院：理學院 開課系所︰數學系 考試日期（年月日）︰2016/11/08 考試時限（分鐘）：170 試題 : 2 1. Suppose u is a bounded harmonic function defined on upper half space |R = + {(x , x )| x ∈ |R, x ≧ 0} such that u is continuous up to the boundary with 1 2 1 2 u(x , 0) = g(x ). Show that 1 1 (A) (8 %) If g ≡ 0, then u ≡ 0. 2 (B) (12 %) If g(x ) = exp(-x ), show that 1 1 -1 u(x , x ) = O(x ) as x → ∞, uniformly in x . (1) 1 2 2 2 1 2. Suppose Ω = (-π, π) and Ω = Ω ×(0, T]. The parabolic boundary of Ω T T ＿＿ is defined as ∂Ω = Ω \Ω . Now, we consider the following equation T T T u = u (2) t xx supplemented with the initial-boundary condition ╭ u(x, 0) = x(π - |x|), │ ╯ u(-π, t) = 0, (3) │ ╰ u(π, t) = 0. (A) (20 %) Now, you solve the equations (2)-(3) by the following Fourier series scheme: Set ∞ u(x, t) = Σ a (t) sin nx, (4) n=1 n and evaluate each a (t) and show the convergence of (4) with the a (t) you n n obtain. ＿＿ (B) (20 %) Suppose that v(x, t) is continuous on Ω that satisfies (3) and for T each heat ball E(x, t; r) ⊂ Ω we have T 2 1 |x-y| v(x, t) = ──∬ v(y, s) ─── dyds. (5) 2 E(x, t; r) 2 4r (t-s) Do you think v(x, t) is a solution to the equations (2)-(3)? Prove (make the reasonings/proof) or disprove it (give an example). N 3. (20 %) For fixed x ∈ |R , T ∈ |R, r > 0, we define the heat ball 2 N+1 N/2 |x-y| N E(x, t; r) := {(y, s) ∈ |R | s ≦ t, [4π(t-s)] exp ─── ≦ r }. (6) 4(t-s) Suppose the differentiable function u(x, t) satisfies the heat equation on some N+1 Ω ⊂ |R and E(x, t; ρ) ⊂ Ω . We define T T 2 1 |x-y| f(r) = ──∬ u(y, s) ─── dyds. (7) N E(x, t; r) 2 4r (t-s) Show that f'(r) = 0 for 0 < r < ρ. 4. (A) (10 %) State the maximum principle for the Cauchy problem ╭ u (x, t) = Δu(x, t), ╯ t (8) ╰ u(x, 0) = g(x), ∞ N N where g(x) ∈ L (|R ) ∩ C(|R ). (B) (20 %) Prove the maximum principle for the Cauchy problem by using the maximum principle for the bounded domain. 5. (20 %) Solve the following differential equations: ╭ uu + 2u = 1, │ x y ╯ (9) │ 1 ╰ u(x, x) = ─x. 2 ╭ u - 4u = 0, │ tt xx │ ╯ u (x, 0) = x, (10) │ t │ x ╰ u(x, 0) = e . -- 姊姊，姊姊~ 有人在看這篇廢文呢~ 雷姆，雷姆~ 有人被標題騙進來了呢~ -- ※ 發信站: 批踢踢實業坊(ptt.cc), 來自: 140.112.248.40 ※ 文章網址: https://www.ptt.cc/bbs/NTU-Exam/M.1478624177.A.36E.html ※ 編輯: xavier13540 (140.112.248.40), 11/09/2016 01:01:09