Pages that link to "Item:Q285260"

The following pages link to Polynomial degree reduction in the discrete \(L_2\)-norm equals best Euclidean approximation of \(h\)-Bézier coefficients (Q285260):

Displaying 8 items.

• Continuous and discrete best polynomial degree reduction with Jacobi and Hahn weights (Q281549) (← links)
• Best polynomial degree reduction on \(q\)-lattices with applications to \(q\)-orthogonal polynomials (Q669356) (← links)
• Least squares approximation of Bézier coefficients provides best degree reduction in the \(L_2\)-norm (Q1567424) (← links)
• Polynomial degree reduction in the \(L_2\)-norm equals best Euclidean approximation of Bézier coefficients (Q1605741) (← links)
• Constrained multi-degree reduction with respect to Jacobi norms (Q1632400) (← links)
• Polynomial degree reduction in the \(\mathcal{L}^2\)-norm on a symmetric interval for the canonical basis (Q2063285) (← links)
• Constrained polynomial degree reduction in the \(L_2\)-norm equals best weighted Euclidean approximation of Bézier coefficients (Q2388551) (← links)
• A note on the paper ``Constrained polynomial degree reduction in the \(L_2\)-norm equals best weighted Euclidean approximation of Bézier coefficients''. (Q2576041) (← links)