Add to ORKGIn this paper we compute the Hausdorff distance between sets of continuous curves and sets of piecewise constant or linear discretizations. These sets are Sobolev balls given by the continuous or discrete L p-norm of the derivatives. We detail the suitable discretization or smoothing procedure which are preservative in the sense of these norms. Finally we exhibit the link between Eulerian numbers and the uniformly space knots B-spline used for smoothing
In this paper we show that the complexity, i.e., the number of elements, of a parabolic or conic spl...
Abstract. This paper is concerned with the problem of approximating in the Sobolev norm a homeomorph...
Let Hvp[a,b] be the class of continuous functions in the interval [a,b], which admit analytic contin...
In this paper we compute the Hausdorff distance between sets of continuous curves and sets of piecew...
International audienceWe derive results on equivalence of piecewise polynomial approximations of a g...
We show that the complexity of a parabolic or conic spline approximating a sufficiently smooth curve...
Abstract. Functions in a Sobolev space are approximated directly by piecewise affine inter-polation ...
Functions in a Sobolev space are approximated directly by piecewise affine interpolation in the norm...
Comparing curves is an important and common problem in computer science. Curves are usually compared...
Two algorithms for solving the piecewise linear Chebyshev approximation problem of planar curves are...
Approximating a set of points by a functional curve or surface in the d-D space is a fundamental top...
We consider the Fréchet distance between two curves which are given as a sequence of m+n curved piec...
We consider the Fréchet distance between two curves which are given as a sequence of m+n curved piec...
An on-line method for piecewise linear approximation of open or closed space curves is described. Th...
The class of continuous piecewise linear (PL) functions represents a useful family of approximants b...
In this paper we show that the complexity, i.e., the number of elements, of a parabolic or conic spl...
Abstract. This paper is concerned with the problem of approximating in the Sobolev norm a homeomorph...
Let Hvp[a,b] be the class of continuous functions in the interval [a,b], which admit analytic contin...
In this paper we compute the Hausdorff distance between sets of continuous curves and sets of piecew...
International audienceWe derive results on equivalence of piecewise polynomial approximations of a g...
We show that the complexity of a parabolic or conic spline approximating a sufficiently smooth curve...
Abstract. Functions in a Sobolev space are approximated directly by piecewise affine inter-polation ...
Functions in a Sobolev space are approximated directly by piecewise affine interpolation in the norm...
Comparing curves is an important and common problem in computer science. Curves are usually compared...
Two algorithms for solving the piecewise linear Chebyshev approximation problem of planar curves are...
Approximating a set of points by a functional curve or surface in the d-D space is a fundamental top...
We consider the Fréchet distance between two curves which are given as a sequence of m+n curved piec...
We consider the Fréchet distance between two curves which are given as a sequence of m+n curved piec...
An on-line method for piecewise linear approximation of open or closed space curves is described. Th...
The class of continuous piecewise linear (PL) functions represents a useful family of approximants b...
In this paper we show that the complexity, i.e., the number of elements, of a parabolic or conic spl...
Abstract. This paper is concerned with the problem of approximating in the Sobolev norm a homeomorph...
Let Hvp[a,b] be the class of continuous functions in the interval [a,b], which admit analytic contin...