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I want to plot region for z numbers that satisfy D<10^-4.

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Leia
Leia le 8 Juin 2022
Commenté : Torsten le 10 Juin 2022
How do I plot the region showing z=x+iy values that make the difference between a polynomial and an exponential function less than 10^-4?
For example;
syms z
[x,y]=meshgrid(-6:.1:2,-6:.1:6);
z=x+1i*y;
R = - 0.0000000000000042786173933199698996786792332228*z.^16 + 0.000000000000093679201874795131075154866430805*z.^15 ...
- 0.0000000000018102462775238750488561630646573*z.^14 + 0.000000000070607888835529581094992975687635*z.^13 ...
- 0.00000000047430380749604348847250198255397*z.^12 + 0.0000000060302178555555310479780219749732*z.^11 ...
- 0.00000014850754796722791834393401507891*z.^10 - 0.0000011975088237244406931082370289037*z.^9 ...
- 0.00000486020688657407415163842024264*z.^8 + 0.000027465820312500018146735337769556*z.^7 ...
+ 0.0010023328993055556912781216101668*z.^6 + 0.0080891927083333337897961540664676*z.^5 ...
+ 0.041666666666666667576168711195926*z.^4 + 0.16666666666666666756898545265065*z.^3 + 0.5*z.^2 + 1.0*z + 1.0;
T = exp(z);
D = R-T;
I want to plot region for z numbers that satisfy D<10^-4.
How can I do that? I would be appreciate if you help.

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Réponse acceptée

Torsten
Torsten le 8 Juin 2022
Modifié(e) : Torsten le 8 Juin 2022
Ran in:
R1 = @(x,y)- 0.0000000000000042786173933199698996786792332228*(x+1i*y).^16 + 0.000000000000093679201874795131075154866430805*(x+1i*y).^15 ...
- 0.0000000000018102462775238750488561630646573*(x+1i*y).^14 + 0.000000000070607888835529581094992975687635*(x+1i*y).^13 ...
- 0.00000000047430380749604348847250198255397*(x+1i*y).^12 + 0.0000000060302178555555310479780219749732*(x+1i*y).^11 ...
- 0.00000014850754796722791834393401507891*(x+1i*y).^10 - 0.0000011975088237244406931082370289037*(x+1i*y).^9 ...
- 0.00000486020688657407415163842024264*(x+1i*y).^8 + 0.000027465820312500018146735337769556*(x+1i*y).^7 ...
+ 0.0010023328993055556912781216101668*(x+1i*y).^6 + 0.0080891927083333337897961540664676*(x+1i*y).^5 ...
+ 0.041666666666666667576168711195926*(x+1i*y).^4 + 0.16666666666666666756898545265065*(x+1i*y).^3 + 0.5*(x+1i*y).^2 + 1.0*(x+1i*y) + 1.0;
R2 = @(x,y) sum((x+1i*y).^(0:16)./factorial(0:16));
T = @(x,y) exp(x+1i*y);
fun1 = @(x,y)norm(R1(x,y)-T(x,y))-1e-4;
fun2 = @(x,y)norm(R2(x,y)-T(x,y))-1e-4;
fimplicit(fun1)
Warning: Function behaves unexpectedly on array inputs. To improve performance, properly vectorize your function to return an output with the same size and shape as the input arguments.
hold on
fimplicit(fun2)
Warning: Function behaves unexpectedly on array inputs. To improve performance, properly vectorize your function to return an output with the same size and shape as the input arguments.
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Leia
Leia le 10 Juin 2022
This polynomial have found as an approximate solution to a differential equation by a spectral numerical method.
Torsten
Torsten le 10 Juin 2022
And the differential equation has exp(z) as solution ?

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