why this overlap happen here?

1 visualización (últimos 30 días)

Mostrar comentarios más antiguos

Aisha Mohamed el 22 de Sept. de 2022

0
Enlazar

Enlace directo a esta pregunta

https://es.mathworks.com/matlabcentral/answers/1810215-why-this-overlap-happen-here

Editada: Aisha Mohamed el 23 de Sept. de 2022

Hi all

I am working on this function

f_b(1/z) = (0.10 − 0.3i)z −1 + (0.2121 − 0.0008i)z −2 + (0.9 + 0.001i)z −3 and I wrote it in MATLAB as p1,

p1=[(0.9000 + 0.0010i) (0.2121 - 0.0008i) (0.1000 - 0.3000i) (0)] ; which has the following roots ,(Thanks Torsten)

1/( 0.0000 + 0.0000i)

1/ ( -0.4716 - 0.4706i)

1/ ( 0.2359 + 0.4717i)

when I plotted the cos(phase(f_b(1/z))) , I find the following figure

where the bright yellow colors indicate positive values of cosine function, thus phase(f_b(1/z)) =0.

Whereas the dark blue colors indicate negative values of cosine function, thus phase(f_b(1/z)) =+ or – pi.

My question is,

what happened in the center of the figure(I put it inside circle ) , why the positive (yellow) and negative (blue) values overlap by this way?

I mean why ((the interference occurs at the origin where the two peaks meet, a strip of dark blue negative values (where $phase(f_b(1/z))= \pm \pi $) permeates the top of the bright yellow positive bottom (where $ phase(f_b(1/z))= 0 $) and becomes surrounded by yellow positive values. Similarly, a bar of bright yellow positive values permeates the top of the dark blue negative to become surrounded by dark blue negative values(where $ phase(f_b(1/z))= \pm \pi $) )) this happen here?

Note that the yellow and blue figures meet at the locate of the zeros of this function.

I appreciate any help.