Hampapur

From Psych 221 Image Systems Engineering
Revision as of 00:30, 22 March 2012 by imported>Psych2012 (Methods)
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Background

The goal of this project is to determine if and by how much the blue pigment (color) present in the Sellaio face painting has degraded. To this end, I attempt to use the hyperspectral data of said image.


Methods

The key constraint with this project is that the ground truth is not available i.e we lack information as to how the artist intended the painting to look like. Consequently, all methods attempted employed analysis and heuristics with the hope that we might perhaps make a cogent argument on how the painting could be restored, if it should need restoring. Methods were employed both in the spectral domain and in CIELAB space. [[1]]. Furthermore, this problem is further complicated by the fact that over time, owing to sunlight, moisture, etc, the spectra could change in undefined ways. This is mostly attributed to the fact that the color pigments along with the material over which they're painted, degrade in undefined ways.

Results - What you found

Retinotopic models in native space

Some text. Some analysis. Some figures.

Retinotopic models in individual subjects transformed into MNI space

Some text. Some analysis. Some figures.

Retinotopic models in group-averaged data on the MNI template brain

Some text. Some analysis. Some figures. Maybe some equations.


Equations

If you want to use equations, you can use the same formats that are use on wikipedia.
See wikimedia help on formulas for help.
This example of equation use is copied and pasted from wikipedia's article on the DFT.

The sequence of N complex numbers x0, ..., xN−1 is transformed into the sequence of N complex numbers X0, ..., XN−1 by the DFT according to the formula:

Xk=n=0N1xne2πiNknk=0,,N1

where i is the imaginary unit and e2πiN is a primitive N'th root of unity. (This expression can also be written in terms of a DFT matrix; when scaled appropriately it becomes a unitary matrix and the Xk can thus be viewed as coefficients of x in an orthonormal basis.)

The transform is sometimes denoted by the symbol , as in 𝐗={𝐱} or (𝐱) or 𝐱.

The inverse discrete Fourier transform (IDFT) is given by

xn=1Nk=0N1Xke2πiNknn=0,,N1.

Retinotopic models in group-averaged data projected back into native space

Some text. Some analysis. Some figures.