andy
e3b6a35575
Affected files: .obsidian/appearance.json .obsidian/workspace-mobile.json .obsidian/workspace.json STEM/AI/Neural Networks/MLP.md STEM/AI/Neural Networks/MLP/Back-Propagation.md STEM/AI/Neural Networks/SLP.md STEM/AI/Neural Networks/SLP/Least Mean Square.md STEM/AI/Neural Networks/SLP/Perceptron Convergence.md STEM/img/activation-function.png STEM/img/lms-algorithm.png STEM/img/mlp-arch-diagram.png STEM/img/mlp-arch-graph.png STEM/img/mlp-arch.png STEM/img/sl-lms-summary.png STEM/img/slp-arch.png STEM/img/slp-hyperplane.png STEM/img/slp-lms-independence.png STEM/img/slp-mse.png STEM/img/slp-separable.png STEM/img/slp-steepest-descent.png
2.8 KiB
2.8 KiB
- To handle overlapping classes
- Linearity condition remains
- Linear boundary
- No hard limiter
- Linear neuron
- Cost function changed to error,
J
- Half doesn’t matter for error
- Disappears when differentiating
- Half doesn’t matter for error
\mathfrak{E}(w)=\frac{1}{2}e^2(n)
- Cost' w.r.t to weights
\frac{\partial\mathfrak{E}(w)}{\partial w}=e(n)\frac{\partial e(n)}{\partial w}
- Calculate error, define delta
e(n)=d(n)-x^T(n)\cdot w(n)
\frac{\partial e(n)}{\partial w(n)}=-x(n)
\frac{\partial \mathfrak{E}(w)}{\partial w(n)}=-x(n)\cdot e(n)
- Gradient vector
g=\nabla\mathfrak{E}(w)
- Estimate via:
\hat{g}(n)=-x(n)\cdot e(n)
\hat{w}(n+1)=\hat{w}(n)+\eta \cdot x(n) \cdot e(n)
- Above is a feedback loop around weight vector,
\hat{w}
- Behaves like low-pass filter
- Pass low frequency components of error signal
- Average time constant of filtering action inversely proportional to learning-rate
- Small value progresses algorithm slowly
- Remembers more
- Inverse of learning rate is measure of memory of LMS algorithm
- Small value progresses algorithm slowly
- Behaves like low-pass filter
- $\hat{w}$ because it's an estimate of the weight vector that would result from steepest descent
- Steepest descent follows well-defined trajectory through weight space for a given learning rate
- LMS traces random trajectory
- Stochastic gradient algorithm
- Requires no knowledge of environmental statistics
Analysis
- Convergence behaviour dependent on statistics of input vector and learning rate
- Another way is that for a given dataset, the learning rate is critical
- Convergence of the mean
E[\hat{w}(n)]\rightarrow w_0 \text{ as } n\rightarrow \infty
- Converges to Wiener solution
- Not helpful
- Convergence in the mean square
E[e^2(n)]\rightarrow \text{constant, as }n\rightarrow\infty
- Convergence in the mean square implies convergence in the mean
- Not necessarily converse
Advantages
- Simple
- Model independent
- Robust
- Optimal in accordance with
H^\infty
, minimax criterion- If you do not know what you are up against, plan for the worst and optimise
- Was considered an instantaneous approximation of gradient-descent
Disadvantages
- Slow rate of convergence
- Sensitivity to variation in eigenstructure of input
- Typically requires iterations of 10 x dimensionality of the input space
- Use steepest descent
- Partial derivatives !
- Can be solved by matrix inversion
- Stochastic
- Random progress
- Will overall improve
\hat{w}(n+1)=\hat{w}(n)+\eta\cdot x(n)\cdot[d(n)-x^T(n)\cdot\hat w(n)]
=[I-\eta\cdot x(n)x^T(n)]\cdot\hat{w}(n)+\eta\cdot x(n)\cdot d(n)
Where
\hat w(n)=z^{-1}[\hat w(n+1)]