Hi Paul, can you give a bit more information or some code showing what you mean by the spatially-defined complex wave input field?
Nearfield Focusing, propagating a field with a known spatial field phase
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Hello,
There is a fantastic page demonstrating near field focusing using the Phased Array toolbox located here: https://www.mathworks.com/help/phased/ug/examine-the-response-of-a-focused-array.html
These example use an array of emitters to define the excitation that then solves into the near field focused field. If we have an already spatially-defined complex wave input field, is there a way to propagate the field in the same way to show it focusing? Or is it possible to 'fake' the field using an array of closely spaced emitters and weights?
3 Comments
David Goodmanson
on 4 Jun 2024
Edited: David Goodmanson
on 4 Jun 2024
HI Paul, this sounds like the Kirchhoff vector integration theorem, where if the fields on a closed surface are known, the fields in the volume inside the surface can be calculated. It's not easy, a lot of the reason being due to approximations that are involved and how to justify them in a given situation.
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