A quadratic surface in n-dimensional space is defined as the locus of zeros of a quadratic polynomial. The quadratic polynomial may be compactly written in notation by an (n + 1)-vector and a real symmetric matrix of order n + 1, where the vector represents homogenous coordinates of an n-D point, and the symmetric matrix is constructed from the quadratic coefficients. If an n-D quadratic surface is an n-D ellipsoid, the leading n x n principal submatrix of the symmetric matrix would be positive or opposite definite. As we know, to impose a matrix being positive or opposite definite, perhaps the best choice may be to employ semidefinite programming (SDP). From such straightforward and intuitive knowledge, in the literature until 2002, Calafi...
In this paper, we present techniques for ellipsoid fitting which are based on minimizing the sum of ...
Implicit planar curve and surface fitting to a set of scattered points plays an important role in so...
http://deepblue.lib.umich.edu/bitstream/2027.42/4192/5/bam3305.0001.001.pdfhttp://deepblue.lib.umich...
Many problems in computer vision can be formulated as multidimensional ellipsoid-specific fitting, w...
Least square fitting of quadratic surfaces is a fundamental problem in pattern recognition, computer...
This paper presents a new efficient method to increase the accuracy and the robustness of ellipse fi...
In this paper, a sufficient condition for a quadric surface to be an ellipsoid has been developed an...
Abstract. This paper is concerned with a class of ellipsoidal sets (ellipsoids and elliptic cylinder...
This paper discusses the problem of approximating data points in n-dimensional Euclidean space, usin...
This paper presents a robust and accurate technique for an estimation of the best-fit ellipse going ...
We propose a classification approach exploiting relationships between ellipsoidal separation and Sup...
This work presents a new efficient method for fitting ellipses to scattered data. Previous algorithm...
Separating two finite sets of points in a Euclidean space is a fundamental problem in classification...
This thesis deals with a pattern classification problem, which geometrically implies data separation...
We present a practical algorithm for computing the minimum volume n-dimensional ellipsoid that must ...
In this paper, we present techniques for ellipsoid fitting which are based on minimizing the sum of ...
Implicit planar curve and surface fitting to a set of scattered points plays an important role in so...
http://deepblue.lib.umich.edu/bitstream/2027.42/4192/5/bam3305.0001.001.pdfhttp://deepblue.lib.umich...
Many problems in computer vision can be formulated as multidimensional ellipsoid-specific fitting, w...
Least square fitting of quadratic surfaces is a fundamental problem in pattern recognition, computer...
This paper presents a new efficient method to increase the accuracy and the robustness of ellipse fi...
In this paper, a sufficient condition for a quadric surface to be an ellipsoid has been developed an...
Abstract. This paper is concerned with a class of ellipsoidal sets (ellipsoids and elliptic cylinder...
This paper discusses the problem of approximating data points in n-dimensional Euclidean space, usin...
This paper presents a robust and accurate technique for an estimation of the best-fit ellipse going ...
We propose a classification approach exploiting relationships between ellipsoidal separation and Sup...
This work presents a new efficient method for fitting ellipses to scattered data. Previous algorithm...
Separating two finite sets of points in a Euclidean space is a fundamental problem in classification...
This thesis deals with a pattern classification problem, which geometrically implies data separation...
We present a practical algorithm for computing the minimum volume n-dimensional ellipsoid that must ...
In this paper, we present techniques for ellipsoid fitting which are based on minimizing the sum of ...
Implicit planar curve and surface fitting to a set of scattered points plays an important role in so...
http://deepblue.lib.umich.edu/bitstream/2027.42/4192/5/bam3305.0001.001.pdfhttp://deepblue.lib.umich...