Add to ORKGAbstract. The famous de Boor conjecture states that the condition of the polynomial B-spline collocation matrix at the knot averages is bounded independently of the knot sequence, i.e., it depends only on the spline degree. For highly nonuniform knot meshes, like geometric meshes, the conjecture is known to be false. As an effort towards finding an answer for uniform meshes, we investigate the spectral condition number of cardinal B-spline collocation matrices. Numerical testing strongly suggests that the conjecture is true for cardinal B-splines
AbstractIn this paper we complete the investigations started by K. Höllig and K. Scherer “Approximat...
AbstractIn this note, improved lower bounds are derived for the sup norm condition numbers of the B-...
A Bohemian matrix family is a set of matrices all of whose entries are drawn from a fixed, usually d...
The famous de Boor conjecture states that the condition of the polynomial B-spline collocation matri...
We prove that the L_#infinity#-norm of the L_2-projector P onto the spline space S_k(#DELTA#) is bou...
AbstractThe author's conjecture concerning the knot sequence whose associated B-spline sequence has ...
AbstractFor the p-norm condition number κk, p of the B-spline basis of order k we prove the upper es...
AbstractPolynomial B-splines of given order m and with knots of arbitrary multiplicity are investiga...
AbstractFor an integer k ⩾ 1, let t:=(ti), be a non-decreasing real sequence with ti $̌ti, k, and le...
Polynomial B-splines of given order m and with knots of arbitrary multiplicity are investigated with...
Polynomial B-splines of given order m and with knots of arbitrary multiplicity are investigated with...
International audienceThis works complements a recent article (Mazure, J. Comp. Appl. Math. 219(2):4...
Effective completeness of B-splines, defined as the capability of approaching completeness without c...
B-splines of polynomial order d are the unique functions that are globally in C^(d-2) and piecewise ...
The conventional B-splines possess the de Boor–Cox formula, which relates to a pyramid algorithm. Ho...
AbstractIn this paper we complete the investigations started by K. Höllig and K. Scherer “Approximat...
AbstractIn this note, improved lower bounds are derived for the sup norm condition numbers of the B-...
A Bohemian matrix family is a set of matrices all of whose entries are drawn from a fixed, usually d...
The famous de Boor conjecture states that the condition of the polynomial B-spline collocation matri...
We prove that the L_#infinity#-norm of the L_2-projector P onto the spline space S_k(#DELTA#) is bou...
AbstractThe author's conjecture concerning the knot sequence whose associated B-spline sequence has ...
AbstractFor the p-norm condition number κk, p of the B-spline basis of order k we prove the upper es...
AbstractPolynomial B-splines of given order m and with knots of arbitrary multiplicity are investiga...
AbstractFor an integer k ⩾ 1, let t:=(ti), be a non-decreasing real sequence with ti $̌ti, k, and le...
Polynomial B-splines of given order m and with knots of arbitrary multiplicity are investigated with...
Polynomial B-splines of given order m and with knots of arbitrary multiplicity are investigated with...
International audienceThis works complements a recent article (Mazure, J. Comp. Appl. Math. 219(2):4...
Effective completeness of B-splines, defined as the capability of approaching completeness without c...
B-splines of polynomial order d are the unique functions that are globally in C^(d-2) and piecewise ...
The conventional B-splines possess the de Boor–Cox formula, which relates to a pyramid algorithm. Ho...
AbstractIn this paper we complete the investigations started by K. Höllig and K. Scherer “Approximat...
AbstractIn this note, improved lower bounds are derived for the sup norm condition numbers of the B-...
A Bohemian matrix family is a set of matrices all of whose entries are drawn from a fixed, usually d...