TDOA to Estimate Source Location

25 Ansichten (letzte 30 Tage)
Andrew Park
Andrew Park am 7 Okt. 2020
Kommentiert: Star Strider am 12 Okt. 2020
(MATLAB 2018b)
Hello, the image below is taken from
https://sites.tufts.edu/eeseniordesignhandbook/files/2017/05/FireBrick_OKeefe_F1.pdf
titled: "Finding Location with Time of Arrival and Time Difference of Arrival Techniques"
author: Brian O’Keefe
The pdf is a project about using TDOA to estimate the location of the source in a 2D plane.
Similarly, I have one sound source emitter and three microphones, A, B, and C, that are placed near the emitter to detect the sound. I know the TDOA of the sound at the microphones, so I can solve for Δd and I already have the coordinates of all the microphones, so I already know (x1, y1) and (x2, y2). In the last paragraph, it says: "Using nonlinear regression, this equation can be converted to the form of a hyperbola. ... by finding the intersection." I don't quite understand the meaning of that.
So far, I've tried to use "solve()" method to find x and y (which is the coordinates of the sound source emitter, but it returned error "Unable to find explicit solution". Any help would be appreciated!
syms x y
distanceDiffAB = 11.4133;
distanceDiffAC = 26.0046;
x_1 = -3.094347632074183e+03;
x_2 = -3.094339180850340e+03;
x_3 = -3.094356380044983e+03;
y_1 = 3.927902239661466e+03;
y_2 = 3.927920563806962e+03;
y_3 = 3.927917716062433e+03;
E = [distanceDiffAB == root((x_2-x)^2 - (y_2-y)^2) - root((x_1-x)^2 - (y_1-y)^2), ...
distanceDiffAC == root((x_3-x)^2 - (y_3-y)^2) - root((x_1-x)^2 - (y_1-y)^2)];
E = rewrite(E,'log');
S = solve(E, x, y, 'IgnoreAnalyticConstraints', 1);

Melden Sie sich an, um diese Frage zu beantworten.

Antworten (0)

Kategorien

Mehr zu Audio I/O and Waveform Generation finden Sie in Help Center und File Exchange

Tags

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by