Now showing items 8-14 of 14

    • The Least Solution for the Polynomial Interpolation Problem 

      de Boor, Carl; Ron, Amos (University of Wisconsin-Madison Department of Computer Sciences, 1990)
    • The Limit at the Origin of a Smooth Function Space 

      de Boor, Carl; Ron, Amos (University of Wisconsin-Madison Department of Computer Sciences, 1989)
      We present a map H -- H?that assigns to each finite-dimensional space of smooth functions a homogeneous polynomial space of the same dimension. We discuss applications of this map in the areas of multivariate polynomial ...
    • On Multivariate Polynomial Interpolation 

      de Boor, Carl; Ron, Amos (University of Wisconsin-Madison Department of Computer Sciences, 1989)
    • On Polynomial Ideals of Finite Codimension with Applications to Box Spline Theory 

      de Boor, Carl; Ron, Amos (University of Wisconsin-Madison Department of Computer Sciences, 1989)
      We investigate here the relations between an ideal I of finite codimension in the space ??of multivariate polynomials and various ideals which are generated by lower order perturbations of the generators of I. Special ...
    • On Two Polynomial Spaces Associated With a Box Spline 

      de Boor, Carl; Dyn, Nira; Ron, Amos (University of Wisconsin-Madison Department of Computer Sciences, 1989)
      The polynomial space H in the span of the integer translates of a box spline M admits a well-known characterization as the joint kernel of a set of homogeneous differential operators with constant coefficients. The dual ...
    • Oral History Interview, Carl de Boor (859) 

      de Boor, Carl (2007-04-25)
      In this 2007 interview, Carl de Boor details his family background, his early life in Germany, and his immigration to the US in the late 1950s. Boor also chronicles his education, including the completion of his PhD and ...
    • Polynomial Ideals and Multivariate Splines 

      de Boor, Carl; Ron, Amos (University of Wisconsin-Madison Department of Computer Sciences, 1989)
      The well established theory of multivariate polynomial ideals (over C) was found in recent years to be important for the investigation of several problems in multivariate approximation. In this note we draw connections ...