1. Let be the unit disc x² + y² ≤ 1. Suppose that the functions f(t, x, y), g(t, x, y) are smooth solutionsof the systemaf= Ag,Ətfor tER and (x, y) =D,Əg= -Af,Ət22where A =+მų2., and we have the boundary conditionsf(t, x, y) = 0 = g(t, x, y) for teR and (x, y) = 0D.DefineM(t) = = [1₁₂1f²f(t, x, y)2 + g(t, x, y) |² dA.Use integration by parts to show thatdM= 0.dt?х2

As per the question we are given a dynamic(Hamiltonian) system as : ft = ∆g , gt = -∆f for : t…

Let be the unit disc x² + y² ≤ 1. Suppose that the functions f(t, x, y), g(t, x, y) are smooth solutions of the system af Δg, Ət for tER and (x, y) =D, Əg = -Af, Ət 2² 8² where A = ?х2 and we have the boundary conditions " Əy2 f(t, x, y) = 0 = g(t, x, y) for teR and (x, y) = ID. Define M(t) = [] |ƒ(t, x,y)|² + [g(t, x, y)|² dA. Use integration by parts to show that dM = 0. dt =

Let be the unit disc x² + y² ≤ 1. Suppose that the functions f(t, x, y), g(t, x, y) are smooth solutions of the system af Δg, Ət for tER and (x, y) =D, Əg = -Af, Ət 2² 8² where A = ?х2 and we have the boundary conditions " Əy2 f(t, x, y) = 0 = g(t, x, y) for teR and (x, y) = ID. Define M(t) = [] |ƒ(t, x,y)|² + [g(t, x, y)|² dA. Use integration by parts to show that dM = 0. dt =

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter3: Functions And Graphs

Section3.3: Lines

Problem 31E

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Question

1. Let be the unit disc x² + y² ≤ 1. Suppose that the functions f(t, x, y), g(t, x, y) are smooth solutions
of the system
af
= Ag,
Ət
for tER and (x, y) =D,
Əg
= -Af,
Ət
22
where A =
+
მų2.
, and we have the boundary conditions
f(t, x, y) = 0 = g(t, x, y) for teR and (x, y) = 0D.
Define
M(t) = = [1₁₂1f²
f(t, x, y)2 + g(t, x, y) |² dA.
Use integration by parts to show that
dM
= 0.
dt
?х2

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