Construction of spherical spline quasi-interpolants based on blossoming

A general theory of quasi-interpolants based on quadratic spherical Powell–Sabin splines on spherical triangulations of a sphere-like surface SS is developed by using polar forms. As application, various families of discrete and differential quasi-interpolants reproducing quadratic spherical Bézier–Bernstein polynomials or the whole space of the spherical Powell–Sabin quadratic splines of class C1C1 are presented.