12.7. Show that without the condition that u remains bounded, the Dirichlet problem for the upper...
Partial Differential Equations. Let be the upper half of a disk of radius 1. Solve the Dirichlet problem for the Laplace equation: in for -1 < x <1 and y = 0 for We were unable to transcribe this imageu : We were unable to transcribe this imageWe were unable to transcribe this imageu = y We were unable to transcribe this image u : u = y
(a) Let u: R2R be a harmonic function. Show that the function v: R2R defined by is also harmonic. (b) Show that the tranformation maps the positive quadrant Q+-[(x,y): x > 0&y to the upper half plane c)Find the Dirichlet Green function for the positive quadrant + (a) Let u: R2R be a harmonic function. Show that the function v: R2R defined by is also harmonic. (b) Show that the tranformation maps the positive quadrant Q+-[(x,y): x > 0&y to...
2. Two-point boundary value problem with Dirichlet condition. Consider the two-point boundary value problem у" = х-уз, у(0) = 0, y(1) = 0. Approximate y'" by (yn-1-2yn ynt1)/Az2 and write the corresponding discretization for this BVP. Take N 4; write the nonlinear system of equations F(y) 0 for the unknowns yi, уг, уз, y4-What is the Jacobian for the problem? Once you have the Jacobian, how do you perform one Newton iteration to solve F(y)-0? 2. Two-point boundary value problem...
Please help me with this 1D vibrating string problem. That has a Dirichlet boundary condition at both ends and the string is at rest when t=0. Picture on the equation below What is missing for this to be solved? Please elaborate htt(t, x)=c2hxx(t, x) + f sin(vt), x E [0, π].
5. The problem may be a challenging problem. We define and our goal is to show that f maps the upper half-plane {z : Im(z) >0) to the unit ball (i) Show that if ż-x + iy, then f(x + yi)-u(z, y) + iv(z, y) where ii) Show that the function maps the real axis y -0 to the unit circle. (Hint: Compute (u(x, 0))2 + (v(,0)2) (Bonus Extra 1 point for the homework grade) (iii) Show that f maps...
P3.* Consider the ordinary differential equation: u” + 1 = 0. a) Show that this equation together with the boundary conditions u(0) = 2, u(a) = 0 has no solution. b) Show that this equation together with the boundary conditions u(0) = 2, u(a) = –2 has infinitely many solutions.
4. Consider the differential equation with initial condition r(0) = 0 (a) What does the existence and uniqueness theorem tell you about the solution to this IVP? (10 points) (b) Use separation of variables to find the solution for the IVP r(to) = Io for to +0. (5 points) (c) Are the solutions to b) unique? (5 points) (d) Sketch solutions for Xo = --1,0,1 and to = 1 and show that for all to and to the solution goes...
HW09 12.7-12.8: Problem 18 Previous Problem Problem List Next Problem (1 point) Suppose a change of coordinates T : R2 + R2 from the uv-plane to the by-plane is given by I= -30 – 3u - 1. y = -1 +54 + 2v. (a) Find the absolute value of the determinant of the Jacobian for this change of coordinates a(z,y) a(u, v) det - 1 (b) If a region D* in the uv-plane has area 7.14, find the area of...
use the hint please 2. Show that the Dirichlet problem for the disc t(z,y): +y S R2), where f(0) is the boundary function, has the solution 0o aj COS 1 sin j 3-1 where a, and b, are the Fourier coefficients of f. Show also that the Poisson integral formula for this more general disc setting is R22 (Hint: Do not solve this problem from first principles. Rather, do a change of variables to reduce this new problem to the...
Hello, I need help with Problem 2. Please show all the steps and the solutions of the problem. Thank you very much. 2" (10 points) Show that the image of the upper half plane H2-(2 E C : S(z) > 0} under the map C(z) = i is the disk D-{2E C : 2ti 2" (10 points) Show that the image of the upper half plane H2-(2 E C : S(z) > 0} under the map C(z) = i is...