Results 1  10
of
1,617,224
ON PROJECTIVE SPACE
, 2010
"... On the classication of rank 2 almost Fano bundles on projective space ..."
to the Projective Space ∗
, 903
"... We show that every CRautomorphism of the closure of a Levi degenerate hyperquadric in the projective space extends to a holomorphic automorphism of the projective space. 1 ..."
Abstract
 Add to MetaCart
We show that every CRautomorphism of the closure of a Levi degenerate hyperquadric in the projective space extends to a holomorphic automorphism of the projective space. 1
Shape manifolds, Procrustean metrics, and complex projective spaces
 Bulletin of the London Mathematical Society
, 1984
"... 2. Shapespaces and shapemanifolds 82 3. Procrustes analysis, and the invariant (quotient) metric on I j.... 87 4. Shapemeasures and shapedensities 93 5. The manifold carrying the shapes of triangles 96 ..."
Abstract

Cited by 269 (0 self)
 Add to MetaCart
2. Shapespaces and shapemanifolds 82 3. Procrustes analysis, and the invariant (quotient) metric on I j.... 87 4. Shapemeasures and shapedensities 93 5. The manifold carrying the shapes of triangles 96
Projection Pursuit Regression
 Journal of the American Statistical Association
, 1981
"... A new method for nonparametric multiple regression is presented. The procedure models the regression surface as a sum of general smooth functions of linear combinations of the predictor variables in an iterative manner. It is more general than standard stepwise and stagewise regression procedures, ..."
Abstract

Cited by 552 (6 self)
 Add to MetaCart
, does not require the definition of a metric in the predictor space, and lends itself to graphical interpretation.
Geodesics on weighted projective spaces
 Ann. Global Anal. Geom
"... Abstract. We study the inverse spectral problem for weighted projective spaces using wavetrace methods. We show that in many cases one can “hear ” the weights of a weighted projective space. Contents ..."
Abstract

Cited by 6 (1 self)
 Add to MetaCart
Abstract. We study the inverse spectral problem for weighted projective spaces using wavetrace methods. We show that in many cases one can “hear ” the weights of a weighted projective space. Contents
Eigenfaces vs. Fisherfaces: Recognition Using Class Specific Linear Projection
, 1997
"... We develop a face recognition algorithm which is insensitive to gross variation in lighting direction and facial expression. Taking a pattern classification approach, we consider each pixel in an image as a coordinate in a highdimensional space. We take advantage of the observation that the images ..."
Abstract

Cited by 2315 (17 self)
 Add to MetaCart
We develop a face recognition algorithm which is insensitive to gross variation in lighting direction and facial expression. Taking a pattern classification approach, we consider each pixel in an image as a coordinate in a highdimensional space. We take advantage of the observation that the images
Tetrahedral quartics in Projective Space.
, 2014
"... We study tetrahedral quartics in projective space. We address their projective geometry, NeronSeveri lattice and automorphism group. ..."
Abstract
 Add to MetaCart
We study tetrahedral quartics in projective space. We address their projective geometry, NeronSeveri lattice and automorphism group.
The homogeneous coordinate ring of a toric variety
, 1992
"... This paper will introduce the homogeneous coordinate ring S of a toric variety X. The ring S is a polynomial ring with one variable for each onedimensional cone in the fan ∆ determining X, and S has a natural grading determined by the monoid of effective divisor classes in the Chow group An−1(X) of ..."
Abstract

Cited by 474 (7 self)
 Add to MetaCart
) of X (where n = dim X). Using this graded ring, we will show that X behaves like projective space in many ways. The paper is organized into four sections as follows. In §1, we define the homogeneous coordinate ring S of X and compute its graded pieces in terms of global sections of certain coherent
Results 1  10
of
1,617,224