This follows a method described in the paper 'Algorithms for Nonnegative. More...
Public Member Functions  
NMFMultiplicativeDivergenceUpdate ()  
template < typename MatType >  
void  Initialize (const MatType &, const size_t) 
Initialize the factorization. More...  
template < typename Archive >  
void  serialize (Archive &, const unsigned int) 
Serialize the object (in this case, there is nothing to serialize). More...  
Static Public Member Functions  
template < typename MatType >  
static void  HUpdate (const MatType &V, const arma::mat &W, arma::mat &H) 
The update rule for the encoding matrix H. More...  
template < typename MatType >  
static void  WUpdate (const MatType &V, arma::mat &W, const arma::mat &H) 
The update rule for the basis matrix W. More...  
This follows a method described in the paper 'Algorithms for Nonnegative.
This is a multiplicative rule that ensures that the Kullback–Leibler divergence
is nonincreasing between subsequent iterations. Both of the update rules for W and H are defined in this file.
This set of update rules is not meant to work with sparse matrices. Using sparse matrices often causes NaNs in the output, so other choices of update rules are better in that situation.
Definition at line 48 of file nmf_mult_div.hpp.

inline 
Definition at line 52 of file nmf_mult_div.hpp.

inlinestatic 
The update rule for the encoding matrix H.
The formula used is
The function takes in all the matrices and only changes the value of the H matrix.
V  Input matrix to be factorized. 
W  Basis matrix. 
H  Encoding matrix to updated. 
Definition at line 124 of file nmf_mult_div.hpp.

inline 
Initialize the factorization.
These rules don't store any state, so the input values are ignore.
Definition at line 59 of file nmf_mult_div.hpp.

inline 
Serialize the object (in this case, there is nothing to serialize).
Definition at line 154 of file nmf_mult_div.hpp.

inlinestatic 
The update rule for the basis matrix W.
The formula used is
The function takes in all the matrices and only changes the value of the W matrix.
V  Input matrix to be factorized. 
W  Basis matrix to be updated. 
H  Encoding matrix. 
Definition at line 80 of file nmf_mult_div.hpp.