
.. currentmodule:: sklearn.manifold

.. _manifold:

=================
Manifold learning
=================

.. rst-class:: quote

                 | Look for the bare necessities
                 | The simple bare necessities
                 | Forget about your worries and your strife
                 | I mean the bare necessities
                 | Old Mother Nature's recipes
                 | That bring the bare necessities of life
                 |
                 |             -- Baloo's song [The Jungle Book]



.. figure:: ../auto_examples/manifold/images/plot_compare_methods_1.png
   :target: ../auto_examples/manifold/plot_compare_methods.html
   :align: center
   :scale: 60

Manifold learning is an approach to nonlinear dimensionality reduction.
Algorithms for this task are based on the idea that the dimensionality of
many data sets is only artificially high.


Introduction
============

High-dimensional datasets can be very difficult to visualize.  While data
in two or three dimensions can be plotted to show the inherent
structure of the data, equivalent high-dimensional plots are much less
intuitive.  To aid visualization of the structure of a dataset, the
dimension must be reduced in some way.

The simplest way to accomplish this dimensionality reduction is by taking
a random projection of the data.  Though this allows some degree of
visualization of the data structure, the randomness of the choice leaves much
to be desired.  In a random projection, it is likely that the more
interesting structure within the data will be lost.


.. |digits_img| image:: ../auto_examples/manifold/images/plot_lle_digits_1.png
    :target: ../auto_examples/manifold/plot_lle_digits.html
    :scale: 50

.. |projected_img| image::  ../auto_examples/manifold/images/plot_lle_digits_2.png
    :target: ../auto_examples/manifold/plot_lle_digits.html
    :scale: 50

.. centered:: |digits_img| |projected_img|


To address this concern, a number of supervised and unsupervised linear
dimensionality reduction frameworks have been designed, such as Principal
Component Analysis (PCA), Independent Component Analysis, Linear 
Discriminant Analysis, and others.  These algorithms define specific 
rubrics to choose an "interesting" linear projection of the data.
These methods can be powerful, but often miss important nonlinear 
structure in the data.


.. |PCA_img| image:: ../auto_examples/manifold/images/plot_lle_digits_3.png
    :target: ../auto_examples/manifold/plot_lle_digits.html
    :scale: 50

.. |LDA_img| image::  ../auto_examples/manifold/images/plot_lle_digits_4.png
    :target: ../auto_examples/manifold/plot_lle_digits.html
    :scale: 50

.. centered:: |PCA_img| |LDA_img|

Manifold Learning can be thought of as an attempt to generalize linear
frameworks like PCA to be sensitive to nonlinear structure in data. Though
supervised variants exist, the typical manifold learning problem is
unsupervised: it learns the high-dimensional structure of the data
from the data itself, without the use of predetermined classifications.


.. topic:: Examples:

    * See :ref:`example_manifold_plot_lle_digits.py` for an example of
      dimensionality reduction on handwritten digits.

    * See :ref:`example_manifold_plot_compare_methods.py` for an example of
      dimensionality reduction on a toy "S-curve" dataset.

The manifold learning implementations available in sklearn are
summarized below

Isomap
======

One of the earliest approaches to manifold learning is the Isomap
algorithm, short for Isometric Mapping.  Isomap can be viewed as an
extension of Multi-dimensional Scaling (MDS) or Kernel PCA.
Isomap seeks a lower-dimensional embedding which maintains geodesic
distances between all points.  Isomap can be performed with the object
:class:`Isomap`.

.. figure:: ../auto_examples/manifold/images/plot_lle_digits_5.png
   :target: ../auto_examples/manifold/plot_lle_digits.html
   :align: center
   :scale: 50

Complexity
----------
The Isomap algorithm comprises three stages:

1. **Nearest neighbor search.**  Isomap uses
   :class:`sklearn.neighbors.BallTree` for efficient neighbor search.
   The cost is approximately :math:`O[D \log(k) N \log(N)]`, for :math:`k`
   nearest neighbors of :math:`N` points in :math:`D` dimensions.

2. **Shortest-path graph search.**  The most efficient known algorithms
   for this are *Dijkstra's Algorithm*, which is approximately 
   :math:`O[N^2(k + \log(N))]`, or the *Floyd-Warshall algorithm*, which
   is :math:`O[N^3]`.  The algorithm can be selected by the user with
   the ``path_method`` keyword of ``Isomap``.  If unspecified, the code
   attempts to choose the best algorithm for the input data.

3. **Partial eigenvalue decomposition.**  The embedding is encoded in the 
   eigenvectors corresponding to the :math:`d` largest eigenvalues of the
   :math:`N \times N` isomap kernel.  For a dense solver, the cost is
   approximately :math:`O[d N^2]`.  This cost can often be improved using
   the ``ARPACK`` solver.  The eigensolver can be specified by the user
   with the ``path_method`` keyword of ``Isomap``.  If unspecified, the
   code attempts to choose the best algorithm for the input data.

The overall complexity of Isomap is
:math:`O[D \log(k) N \log(N)] + O[N^2(k + \log(N))] + O[d N^2]`.

* :math:`N` : number of training data points
* :math:`D` : input dimension
* :math:`k` : number of nearest neighbors
* :math:`d` : output dimension

.. topic:: References:

   * `"A global geometric framework for nonlinear dimensionality reduction"
     <http://www.sciencemag.org/content/290/5500/2319.full>`_
     Tenenbaum, J.B.; De Silva, V.; & Langford, J.C.  Science 290 (5500)


Locally Linear Embedding
========================

Locally linear embedding (LLE) seeks a lower-dimensional projection of the data
which preserves distances within local neighborhoods.  It can be thought
of as a series of local Principal Component Analyses which are globally
compared to find the best nonlinear embedding.

Locally linear embedding can be performed with function
:func:`locally_linear_embedding` or its object-oriented counterpart
:class:`LocallyLinearEmbedding`.

.. figure:: ../auto_examples/manifold/images/plot_lle_digits_6.png
   :target: ../auto_examples/manifold/plot_lle_digits.html
   :align: center
   :scale: 50

Complexity
----------

The standard LLE algorithm comprises three stages:

1. **Nearest Neighbors Search**.  See discussion under Isomap above.

2. **Weight Matrix Construction**. :math:`O[D N k^3]`.
   The construction of the LLE weight matrix involves the solution of a
   :math:`k \times k` linear equation for each of the :math:`N` local
   neighborhoods

3. **Partial Eigenvalue Decomposition**. See discussion under Isomap above.

The overall complexity of standard LLE is
:math:`O[D \log(k) N \log(N)] + O[D N k^3] + O[d N^2]`.

* :math:`N` : number of training data points
* :math:`D` : input dimension
* :math:`k` : number of nearest neighbors
* :math:`d` : output dimension

.. topic:: References:
   
   * `"Nonlinear dimensionality reduction by locally linear embedding"
     <http://www.sciencemag.org/content/290/5500/2323.full>`_
     Roweis, S. & Saul, L.  Science 290:2323 (2000)


Modified Locally Linear Embedding
=================================

One well-known issue with LLE is the regularization problem.  When the number
of neighbors is greater than the number of input dimensions, the matrix
defining each local neighborhood is rank-deficient.  To address this, standard
LLE applies an arbitrary regularization parameter :math:`r`, which is chosen
relative to the trace of the local weight matrix.  Though it can be shown
formally that as :math:`r \to 0`, the solution coverges to the desired
embedding, there is no guarantee that the optimal solution will be found
for :math:`r > 0`.  This problem manifests itself in embeddings which distort
the underlying geometry of the manifold.

One method to address the regularization problem is to use multiple weight
vectors in each neighborhood.  This is the essence of *modified locally
linear embedding* (MLLE).  MLLE can be  performed with function
:func:`locally_linear_embedding` or its object-oriented counterpart
:class:`LocallyLinearEmbedding`, with the keyword ``method = 'modified'``.
It requires ``n_neighbors > n_components``.

.. figure:: ../auto_examples/manifold/images/plot_lle_digits_7.png
   :target: ../auto_examples/manifold/plot_lle_digits.html
   :align: center
   :scale: 50
   
Complexity
----------

The MLLE algorithm comprises three stages:

1. **Nearest Neighbors Search**.  Same as standard LLE

2. **Weight Matrix Construction**. Approximately
   :math:`O[D N k^3] + O[N (k-D) k^2]`.  The first term is exactly equivalent
   to that of standard LLE.  The second term has to do with constructing the
   weight matrix from multiple weights.  In practice, the added cost of 
   constructing the MLLE weight matrix is relatively small compared to the
   cost of steps 1 and 3.

3. **Partial Eigenvalue Decomposition**. Same as standard LLE

The overall complexity of MLLE is
:math:`O[D \log(k) N \log(N)] + O[D N k^3] + O[N (k-D) k^2] + O[d N^2]`.

* :math:`N` : number of training data points
* :math:`D` : input dimension
* :math:`k` : number of nearest neighbors
* :math:`d` : output dimension

.. topic:: References:
     
   * `"MLLE: Modified Locally Linear Embedding Using Multiple Weights"
     <http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.70.382>`_
     Zhang, Z. & Wang, J.


Hessian Eigenmapping
====================

Hessian Eigenmapping (also known as Hessian-based LLE: HLLE) is another method
of solving the regularization problem of LLE.  It revolves around a
hessian-based quadratic form at each neighborhood which is used to recover
the locally linear structure.  Though other implementations note its poor
scaling with data size, ``sklearn`` implements some algorithmic
improvements which make its cost comparable to that of other LLE variants
for small output dimension.  HLLE can be  performed with function
:func:`locally_linear_embedding` or its object-oriented counterpart
:class:`LocallyLinearEmbedding`, with the keyword ``method = 'hessian'``.
It requires ``n_neighbors > n_components * (n_components + 3) / 2``.

.. figure:: ../auto_examples/manifold/images/plot_lle_digits_8.png
   :target: ../auto_examples/manifold/plot_lle_digits.html
   :align: center
   :scale: 50
   
Complexity
----------

The HLLE algorithm comprises three stages:

1. **Nearest Neighbors Search**.  Same as standard LLE

2. **Weight Matrix Construction**. Approximately
   :math:`O[D N k^3] + O[N d^6]`.  The first term reflects a similar
   cost to that of standard LLE.  The second term comes from a QR
   decomposition of the local hessian estimator.

3. **Partial Eigenvalue Decomposition**. Same as standard LLE

The overall complexity of standard HLLE is
:math:`O[D \log(k) N \log(N)] + O[D N k^3] + O[N d^6] + O[d N^2]`.

* :math:`N` : number of training data points
* :math:`D` : input dimension
* :math:`k` : number of nearest neighbors
* :math:`d` : output dimension

.. topic:: References:

   * `"Hessian Eigenmaps: Locally linear embedding techniques for
     high-dimensional data" <http://www.pnas.org/content/100/10/5591>`_
     Donoho, D. & Grimes, C. Proc Natl Acad Sci USA. 100:5591 (2003)


Local Tangent Space Alignment
=============================

Though not technically a variant of LLE, Local tangent space alignment (LTSA)
is algorithmically similar enough to LLE that it can be put in this category.
Rather than focusing on preserving neighborhood distances as in LLE, LTSA
seeks to characterize the local geometry at each neighborhood via its
tangent space, and performs a global optimization to align these local 
tangent spaces to learn the embedding.  LTSA can be performed with function
:func:`locally_linear_embedding` or its object-oriented counterpart
:class:`LocallyLinearEmbedding`, with the keyword ``method = 'ltsa'``.

.. figure:: ../auto_examples/manifold/images/plot_lle_digits_9.png
   :target: ../auto_examples/manifold/plot_lle_digits.html
   :align: center
   :scale: 50
   
Complexity
----------

The LTSA algorithm comprises three stages:

1. **Nearest Neighbors Search**.  Same as standard LLE

2. **Weight Matrix Construction**. Approximately
   :math:`O[D N k^3] + O[k^2 d]`.  The first term reflects a similar
   cost to that of standard LLE.

3. **Partial Eigenvalue Decomposition**. Same as standard LLE

The overall complexity of standard LTSA is
:math:`O[D \log(k) N \log(N)] + O[D N k^3] + O[k^2 d] + O[d N^2]`.

* :math:`N` : number of training data points
* :math:`D` : input dimension
* :math:`k` : number of nearest neighbors
* :math:`d` : output dimension

.. topic:: References:

   * `"Principal manifolds and nonlinear dimensionality reduction via
     tangent space alignment"
     <http://citeseer.ist.psu.edu/viewdoc/summary?doi=10.1.1.4.3693>`_
     Zhang, Z. & Zha, H. Journal of Shanghai Univ. 8:406 (2004)


Tips on practical use
=====================

* Make sure the same scale is used over all features. Because manifold
  learning methods are based on a nearest-neighbor search, the algorithm
  may perform poorly otherwise.  See :ref:`Scaler <preprocessing_scaler>`
  for convenient ways of scaling heterogeneous data.

* The reconstruction error computed by each routine can be used to choose
  the optimal output dimension.  For a :math:`d`-dimensional manifold embedded
  in a :math:`D`-dimensional parameter space, the reconstruction error will
  decrease as ``n_components`` is increased until ``n_components == d``.

* Note that noisy data can "short-circuit" the manifold, in essence acting
  as a bridge between parts of the manifold that would otherwise be
  well-separated.  Manifold learning on noisy and/or incomplete data is
  an active area of research.

* Certain input configurations can lead to singular weight matrices, for
  example when more than two points in the dataset are identical, or when
  the data is split into disjointed groups.  In this case, ``method='arpack'``
  will fail to find the null space.  The easiest way to address this is to
  use ``method='dense'`` which will work on a singular matrix, though it may
  be very slow depending on the number of input points.  Alternatively, one
  can attempt to understand the source of the singularity: if it is due to
  disjoint sets, increasing ``n_neighbors`` may help.  If it is due to
  identical points in the dataset, removing these points may help.
