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Maximum Variance Unfolding (Semidefinite Embedding)

The main poposal of the technique is to lean a suitable kernel with several constraints when the data is given.

Here is the constraints for the kernel.

1. Semipositive definiteness
Kernel PCA is a kind of spectral decompostion in Hilber space. The semipositive definiteness interprets the kernel matrix as storing the inner products of vectors in a Hilber space. Furthermore, the semipositive definiteness also means all eigenvalues are non-negative.

2. Centering
Considering the centering process in Kernel PCA, it is also required here. The condition is given by
[math]\displaystyle{ \sum_i \Phi(x_i) =0 . }[/math] Equivalently,
[math]\displaystyle{ 0 = |\sum_i \Phi(x_i)|^2 = \sum_{ij}\Phi(x_i)\Phi(x_j)=\sum_{ij}K_{ij}. }[/math]

3. Isometry
The local distance between a pairwise of data [math]\displaystyle{ x_i, x_j }[/math], under neighbourhood relation [math]\displaystyle{ \eta }[/math], should be preserved in new space [math]\displaystyle{ \Phi(x_i), \Phi(x_j) }[/math] after mapping. In other words, [math]\displaystyle{ \forall \eta_{ij}\gt 0 }[/math],
[math]\displaystyle{ |\Phi(x_i) - \Phi(x_j)|^2 = |x_i - x_j|^2. }[/math] Additonally, for the consider of conformal map, the neighbourhood relation can be [math]\displaystyle{ [\eta^T\eta]_{ij}\gt 0. }[/math]