论文信息 - The estimation of the gradient of a density function, with applications in pattern recognition

The estimation of the gradient of a density function, with applications in pattern recognition

Nonparametric density gradient estimation using a generalized kernel approach is investigated. Conditions on the kernel functions are derived to guarantee asymptotic unbiasedness, consistency, and uniform consistency of the estimates. The results are generalized to obtain a simple mcan-shift estimate that can be extended in a k -nearest-neighbor approach. Applications of gradient estimation to pattern recognition are presented using clustering and intrinsic dimensionality problems, with the ultimate goal of providing further understanding of these problems in terms of density gradients.

Larry D. Hostetler | Keinosuke Fukunaga | K. Fukunaga | L. Hostetler

[1] M. Rosenblatt. Remarks on Some Nonparametric Estimates of a Density Function , 1956 .

[2] E. Parzen. On Estimation of a Probability Density Function and Mode , 1962 .

[3] C. Quesenberry,et al. A nonparametric estimate of a multivariate density function , 1965 .

[4] E. Nadaraya. On Non-Parametric Estimates of Density Functions and Regression Curves , 1965 .

[5] T. Cacoullos. Estimation of a multivariate density , 1966 .

[6] J. V. Ryzin,et al. ON STRONG CONSISTENCY OF DENSITY ESTIMATES , 1969 .

[7] V. A. Epanechnikov. Non-Parametric Estimation of a Multivariate Probability Density , 1969 .

[8] M. Woodroofe. On Choosing a Delta-Sequence , 1970 .

[9] V. Alekseev. Estimation of a probability density function and its derivatives , 1972 .

[10] B. Chandrasekaran,et al. A finite-memory deterministic algorithm for the symmetric hypothesis testing problem , 1975, IEEE Trans. Inf. Theory.