- Source: Dependent component analysis
Dependent component analysis (DCA) is a blind signal separation (BSS) method and an extension of Independent component analysis (ICA). ICA is the separating of mixed signals to individual signals without knowing anything about source signals. DCA is used to separate mixed signals into individual sets of signals that are dependent on signals within their own set, without knowing anything about the original signals. DCA can be ICA if all sets of signals only contain a single signal within their own set.
Mathematical representation
For simplicity, assume all individual sets of signals are the same size, k, and total N sets. Building off the basic equations of BSS (seen below) instead of independent source signals, one has independent sets of signals, s(t) = ({s1(t),...,sk(t)},...,{skN-k+1(t)...,skN(t)})T, which are mixed by coefficients A=[aij]εRmxkN that produce a set of mixed signals, x(t)=(x1(t),...,xm(t))T. The signals can be multidimensional.
x
(
t
)
=
A
∗
s
(
t
)
{\displaystyle x(t)=A*s(t)}
The following equation BSS separates the set of mixed signals, x(t), by finding and using coefficients, B=[Bij]εRkNxm, to separate and get the set of approximation of the original signals, y(t)=({y1(t),...,yk(t)},...,{ykN-k+1(t)...,ykN(t)})T.
y
(
t
)
=
B
∗
x
(
t
)
{\displaystyle y(t)=B*x(t)}
Methods
Sub-Band Decomposition ICA (SDICA) is based on the fact that wideband source signals are dependent, but that other subbands are independent. It uses an adaptive filter by choosing subbands using a minimum of mutual information (MI) to separate mixed signals. After finding subband signals, ICA can be used to reconstruct, based on subband signals, by using ICA. Below is a formula to find MI based on entropy, where H is entropy.
I
H
^
(
y
)
=
∑
n
=
1
N
H
^
(
y
n
)
−
H
^
(
y
)
{\displaystyle {\widehat {I_{H}}}(y)=\sum _{n=1}^{N}{\widehat {H}}(y_{n})-{\widehat {H}}(y)}
H
^
(
y
n
)
=
−
1
T
∑
t
=
1
T
l
o
g
P
^
y
n
(
y
n
(
t
)
)
{\displaystyle {\widehat {H}}(y_{n})=-{\frac {1}{T}}\sum _{t=1}^{T}log{\widehat {P}}_{yn}(y_{n}(t))}
H
^
(
y
)
=
−
1
T
∑
t
=
1
T
l
o
g
P
^
y
(
y
n
(
t
)
)
{\displaystyle {\widehat {H}}(y)=-{\frac {1}{T}}\sum _{t=1}^{T}log{\widehat {P}}_{y}(y_{n}(t))}
References
Kata Kunci Pencarian:
- Sinarizin
- Tembaga
- Nikotinamida adenina dinukleotida
- CREB3
- BRCA1
- Proteasom
- Asam beta-hidroksi beta-metilbutirat
- Penyakit seliak
- Dependent component analysis
- Principal component analysis
- Independent component analysis
- Signal separation
- Linear discriminant analysis
- Network analysis (electrical circuits)
- Electronic component
- Mesh analysis
- Non-negative matrix factorization
- Multivariate analysis of variance