The following pages link to Gelfond-Bézier curves (Q1942996):
Displaying 13 items.
- Polynomial degree reduction in the discrete \(L_2\)-norm equals best Euclidean approximation of \(h\)-Bézier coefficients (Q285260) (← links)
- \(G^2\) composite cubic Bézier curves (Q1300780) (← links)
- A Müntz type theorem for a family of corner cutting schemes (Q1942999) (← links)
- Continuity conditions for Q-Bézier curves of degree \(n\) (Q2012335) (← links)
- Approximate multi-degree reduction of Q-Bézier curves via generalized Bernstein polynomial functions (Q2119491) (← links)
- Shape-adjustable generalized Bézier surfaces: construction and it is geometric continuity conditions (Q2177919) (← links)
- Interpolation of \(G^1\) Hermite data by \(C^1\) cubic-like sparse Pythagorean hodograph splines (Q2180621) (← links)
- \(q\)-blossoming for analytic functions (Q2322824) (← links)
- Sparse Pythagorean hodograph curves (Q2409683) (← links)
- Dimension elevation in Müntz spaces: a new emergence of the Müntz condition (Q2441941) (← links)
- Novel polynomial Bernstein bases and Bézier curves based on a general notion of polynomial blossoming (Q2630750) (← links)
- (Q5204582) (← links)
- De Casteljau's geometric approach to geometric design still alive (Q6615390) (← links)
