Locally Linear Embedding (LLE) is a nonlinear spectral dimensionality reduction and manifold learning method. It has two main steps which are linear reconstruction and linear embedding of points in the input space and embedding space, respectively. In this work, we look at the linear reconstruction step from a stochastic perspective where it is assumed that every data point is conditioned on its linear reconstruction weights as latent factors. The stochastic linear reconstruction of LLE is solved using expectation maximization. We show that there is a theoretical connection between three fundamental dimensionality reduction methods, i.e., LLE, factor analysis, and probabilistic Principal Component Analysis (PCA). The stochastic linear recon...
Abstract Raw data sets taken with various capturing devices are usually multidimensional and need to...
Much research has gone into scaling up classical machine learning algorithms such as Gaussian Proces...
Linear dimensionality reduction methods are a cornerstone of analyzing high dimensional data, due to...
Roweis ST, Lawrence LK. Nonlinear Dimensionality Reduction by Locally Linear Embedding. Science. 200...
Abstract. Locally linear embedding (LLE) is a recently proposed method for unsupervised nonlinear di...
Principal component analysis (PCA), also known as proper orthogonal decomposition or Karhunen-Loeve ...
This paper presents a Local Learning Projection (LLP) approach for linear dimensionality reduction. ...
The curse of dimensionality is pertinent to many learning algorithms, and it denotes the drastic in...
The problem of dimensionality reduction arises in many fields of information processing, including m...
Abstract — LLE is a very effective non-linear dimension reduction algorithm and widely explored in m...
In 2000, Saul and Roweis proposed locally linear embedding as a tool for nonlinear dimensionality re...
The locally linear embedding (LLE) is considered an effective algorithm for dimensionality reduction...
We introduce a new perspective on spectral dimensionality reduction which views these methods as Gau...
We study non-linear data-dimension reduction. We are motivated by the classical linear framework of ...
The problem of approximating multidimensional data with objects of lower dimension is a classical pr...
Abstract Raw data sets taken with various capturing devices are usually multidimensional and need to...
Much research has gone into scaling up classical machine learning algorithms such as Gaussian Proces...
Linear dimensionality reduction methods are a cornerstone of analyzing high dimensional data, due to...
Roweis ST, Lawrence LK. Nonlinear Dimensionality Reduction by Locally Linear Embedding. Science. 200...
Abstract. Locally linear embedding (LLE) is a recently proposed method for unsupervised nonlinear di...
Principal component analysis (PCA), also known as proper orthogonal decomposition or Karhunen-Loeve ...
This paper presents a Local Learning Projection (LLP) approach for linear dimensionality reduction. ...
The curse of dimensionality is pertinent to many learning algorithms, and it denotes the drastic in...
The problem of dimensionality reduction arises in many fields of information processing, including m...
Abstract — LLE is a very effective non-linear dimension reduction algorithm and widely explored in m...
In 2000, Saul and Roweis proposed locally linear embedding as a tool for nonlinear dimensionality re...
The locally linear embedding (LLE) is considered an effective algorithm for dimensionality reduction...
We introduce a new perspective on spectral dimensionality reduction which views these methods as Gau...
We study non-linear data-dimension reduction. We are motivated by the classical linear framework of ...
The problem of approximating multidimensional data with objects of lower dimension is a classical pr...
Abstract Raw data sets taken with various capturing devices are usually multidimensional and need to...
Much research has gone into scaling up classical machine learning algorithms such as Gaussian Proces...
Linear dimensionality reduction methods are a cornerstone of analyzing high dimensional data, due to...