We present an explicit formula which unifies the mask of 2n − 1-point ternary interpolating as well as approximating subdivision schemes.

Dec 19, 2011 · We present an explicit formula which unifies the mask of (2n − 1)-point ternary interpolating as well as approximating subdivision schemes.

Oct 22, 2024 · We present an explicit formula which unifies the mask of 2n − 1 -point ternary interpolating as well as approximating subdivision schemes.

An explicit formula is presented which unifies the mask of (2n-1)-point ternary interpolating as well as approximating subdivision schemes and it is proved ...

Dec 19, 2011 · We present an explicit formula which unifies the mask of (2n − 1)-point ternary interpolating as well as approximating subdivision schemes.

Abstract: We present an explicit formula which unifies the mask of (2n - 1)-point ternary interpolating as well as approximating subdivision schemes.

Based on Lagrange polynomials and variation of constants, we devise a novel 2n-1-point interpolatory ternary subdivision scheme that reproduces polynomials ...

Abstract: Nonlinear interpolating subdivision schemes have been introduced in recent years to reduce Gibbs phenomenon near irregular initial data points.

Ghaff ar, (2n − 1)-point ternary approximating and interpolating subdivision schemes, Journal of Applied Mathematics, Article ID. 832630, 12 pages, 2011.

We present an explicit formula which unifies the mask of(2n-1)-point ternary interpolating as well as approximating subdivision schemes. We observe that the odd ...