Multivariate Splines and Algebraic Geometry

From SIAG-AG

(Difference between revisions)
Jump to: navigation, search
Revision as of 03:07, 23 December 2016 (edit)
Sottile (Talk | contribs)

← Previous diff
Revision as of 03:12, 23 December 2016 (edit) (undo)
Sottile (Talk | contribs)

Next diff →
Line 21: Line 21:
Michael Di Pasquale (Oklahoma State) Michael Di Pasquale (Oklahoma State)
 +
 +Bernard Mourrain (INRIA Sophia-Antipolis)
 +
 +Tatyana Sorokina (Towson University)
 +
 +Peter F. Stiller (Texas A&M)
 +
 +Nelly Villamizar (RICAM Linz)

Revision as of 03:12, 23 December 2016

Overview

A multivariate spline is a function defined on a domain in $R^d$ with $d>1$ that is piecewise a polynomial. These objects from approximation theory may be studied using techniques from commutative algebra and algebraic geometry. Research interests of the participants relevant to the minisymposium fall broadly under multivariate spline theory, interpolation, and geometric modeling. For instance, a main problem of interest is to study the Hilbert function and algebraic structure of the spline module; recently there have been several advances on this front using notions from algebraic geometry. Nevertheless this problem remains elusive in low degree; the dimension of the space of piecewise cubics on a planar triangulation (especially relevant for applications) is still unknown in general!

Organizers

Michael Di Pasquale (Oklahoma State)

Frank Sottile (Texas A&M)

Confirmed Speakers

Michael Di Pasquale (Oklahoma State)

Bernard Mourrain (INRIA Sophia-Antipolis)

Tatyana Sorokina (Towson University)

Peter F. Stiller (Texas A&M)

Nelly Villamizar (RICAM Linz)

Views
Personal tools