Hermite Subdivision with Shape Constraints on a Rectangular Mesh

Dyadic C Hermite interpolation on a square mesh

For prescribed values of a function and its partial derivatives of orders 1 and 2 at the vertices of a square, we fit an interpolating surface. We investigate two families of solutions provided by two Hermite subdivision schemes, denoted HD2 and HR2. Both schemes depend on 2 matrix parameters, a square matrix of order 2 and a square matrix of order 3. We exhibit the masks of both schemes. We co...

Addendum To: Shape Constraints and Optimal Bases for C Hermite Interpolatory Subdivision Schemes

Dyadic C2 Hermite interpolation on a square mesh

For prescribed values of a function and its partial derivatives of orders 1 and 2 at the vertices of a square, we fit an interpolating surface. We investigate two families of solutions provided by two Hermite subdivision schemes, denoted HD2 and HR2. Both schemes depend on 2 matrix parameters, a square matrix of order 2 and a square matrix of order 3. We exhibit the masks of both schemes. We co...

C1 Interpolatory Subdivision with Shape Constraints for Curves

We derive two reformulations of the C1 Hermite subdivision scheme introduced in [12]. One where we separate computation of values and derivatives and one based of refinement of a control polygon. We show that the latter leads to a subdivision matrix which is totally positive. Based on this we give algorithms for constructing subdivision curves that preserve positivity, monotonicity, and convexi...

Interpolatory Subdivision with Shape Constraints for Curves ∗

We derive two reformulations of the C1 Hermite subdivision scheme introduced by Merrien. One where we separate computation of values and derivatives and one based of refinement of a control polygon. We show that the latter leads to a subdivision matrix which is totally positive. Based on this we give algorithms for constructing subdivision curves that preserve positivity, monotonicity, and conv...