Polar Surface Numerical Integration

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Dog_Biscuit am 5 Mai 2022

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https://de.mathworks.com/matlabcentral/answers/1711925-polar-surface-numerical-integration

Bearbeitet: Torsten am 5 Mai 2022

Hi,

I have a 2D polar surface stored as a 2D matrix, where the values in a given row correspond to the value at a given r (in identical increments i.e. r=0,0.1,0.2 etc. up to a limit) and the values in a given column correspond to the value of the surface at a given θ (also in identical increments i.e. θ = 0, 0.5 ... 359.5). I would like to perform a 2D numerical integration of the surface i.e. calculate the volume under the surface. I do not have an analytical expression for the surface; the surface is somewhat complex.

I've come across methods for 2D integration for a regular grid, but of course a uniform polar-coordinate grid is not uniform in cartesian coordinates. I've seen some methods posted from 10+ years ago involving interpolation for non-uniform grids, but I wondered if there was a cleaner way to do it now.

Essentially, does anyone know of a method or file exchange function either to perform numerical 2D integration for a surface in polar co-ordinates, or a method/file exchange function whereby you input a 2D matrix of surface values, then 2 meshgrids for corresponding x and y values (in cartesian coordinates) that are non-uniform/arbitrary, and the output is the integral under the surface? I have searched the file exchange and not found anything like this.

e.g.

2D_nonuniform_integration_function(2D_surface_matrix,x_mesh_grid,y_mesh_grid)

or

2D_polar_integration_function(2D_surface_matrix,radius_values_vector, theta_values_vector)

Thank you in advance for your help.