# how to reduce dimensionality of vector

I have a set of vectors. I'm working on ways to reduce a n-dimensional vector to a unary value (1-d), say

(x1,x2,....,xn) ------> y


This single value needs to be the characteristic value of the vector. Each unique vector produces a unique output value. Which of the following methods is appropriate:

1- norm of the vector - square root of sum of squares that measures euclidian distance from origin

2- compute hash of F, using some hashing techniques avoiding collision

3- use linear regression to compute, y = w1*x1 + w2*x2 + ... + wn*xn - unlikely to be good if there is no good dependence of input values on output

4- feature extraction technique like PCA that assigns weights to each of x1,x2,..xn based on the set of input vectors

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What's the objective of the dimensionality reduction? What are you trying to do with the vectors? If it's a machine learning problem, PCA would be best. –  Alptigin Jalayr Apr 15 '13 at 16:06
It kinda depends on what you want to do with the unique values. Could you elaborate? –  d.j.sheldrick Apr 15 '13 at 16:10
@d.j.sheldrick ; I would require these unique values to ease computation on the vectors. –  kris Apr 15 '13 at 16:35
@AlptiginJalayr: I'm not quite sure if PCA gives unique values –  kris Apr 15 '13 at 16:36
What kind of computations do you need to do on these vectors? –  torquestomp Apr 15 '13 at 16:54

It's unclear from the method what properties you need this transform to have, so I'm making a guess that you don't need the transformation to preserve any properties other than uniqueness, and possibly invertibility.

None of the techniques you suggest can in general avoid collisions:

1. Norm - two vectors pointing in opposite directions have the same norm.

2. Hash - if the input isn't known apriori - what is generally meant by hash function has a finite image, and you have an infinite number of possible vectors - no good.

3. It's easy to find to vectors which give the same result for any linear regression result (think about it).

4. PCA is a specific kind of linear transformation - hence the same problem as with linear regression.

So - if you're just looking for uniqueness, you could "stringify" your vectors. One way to do it is to write them down as text strings, with the different coordinates separated by a special character (underscore, for example). Then take the binary value of this string as your representation.

If space is important and you need a more efficient representation, you could think of a more efficient bit encoding: each character in the set 0,1,...,9,'.','' can be represented by 4 bits - a hexadecimal digit (map '.' to A and '' to B). Now encode this string as a hexadecimal number, saving half the space.

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