AbstractThe piecewise algebraic curve, determined by a bivariate spline function, is a generalization of the classical algebraic curve. In this paper, by using Bezout's theorem and Nöther-type theorem of piecewise algebraic curves, the Cayley–Bacharach theorem and Hilbert function of C0 piecewise algebraic curves are presented
For many years, long, thin strips of wood or some other material have been used by draftsmen to fair...
AbstractBaker's theorem is a theorem giving an upper-bound for the genus of a plane curve. It can be...
AbstractThis paper describes a method of producing projective curves with easily computed Hilbert fu...
AbstractThe piecewise algebraic curve is a generalization of the classical algebraic curve. In this ...
AbstractThe piecewise algebraic curve, as the set of zeros of a bivariate spline function, is a gene...
AbstractThe multivariate splines as piecewise polynomials have become useful tools for dealing with ...
AbstractA piecewise algebraic curve is a curve determined by the zero set of a bivariate spline func...
AbstractAs a piecewise polynomial with a certain smoothness, the spline plays an important role in c...
We study the Hilbert function of certain projective monomial curves. We determine which of our curve...
AbstractWe study the Hilbert function of certain projective monomial curves. We determine which of o...
The Cayley-Bacharach Theorem states that all cubic curves through eight given points in the plane al...
AbstractThe purpose of this survey is to emphasize the special relationship between multivariate spl...
We have proposed and implemented a new method for constructing a spline curve of third degree, which...
AbstractWe determine the Hilbert–Kunz function of plane elliptic curves in odd characteristic, as we...
AbstractAs the set of the common zeros of the multivariate splines, the piecewise algebraic variety ...
For many years, long, thin strips of wood or some other material have been used by draftsmen to fair...
AbstractBaker's theorem is a theorem giving an upper-bound for the genus of a plane curve. It can be...
AbstractThis paper describes a method of producing projective curves with easily computed Hilbert fu...
AbstractThe piecewise algebraic curve is a generalization of the classical algebraic curve. In this ...
AbstractThe piecewise algebraic curve, as the set of zeros of a bivariate spline function, is a gene...
AbstractThe multivariate splines as piecewise polynomials have become useful tools for dealing with ...
AbstractA piecewise algebraic curve is a curve determined by the zero set of a bivariate spline func...
AbstractAs a piecewise polynomial with a certain smoothness, the spline plays an important role in c...
We study the Hilbert function of certain projective monomial curves. We determine which of our curve...
AbstractWe study the Hilbert function of certain projective monomial curves. We determine which of o...
The Cayley-Bacharach Theorem states that all cubic curves through eight given points in the plane al...
AbstractThe purpose of this survey is to emphasize the special relationship between multivariate spl...
We have proposed and implemented a new method for constructing a spline curve of third degree, which...
AbstractWe determine the Hilbert–Kunz function of plane elliptic curves in odd characteristic, as we...
AbstractAs the set of the common zeros of the multivariate splines, the piecewise algebraic variety ...
For many years, long, thin strips of wood or some other material have been used by draftsmen to fair...
AbstractBaker's theorem is a theorem giving an upper-bound for the genus of a plane curve. It can be...
AbstractThis paper describes a method of producing projective curves with easily computed Hilbert fu...
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