Minimal projections onto spaces of polynomials on real euclidean spheres

TL;DR

This paper studies projection constants for polynomial spaces on real spheres, deriving exact formulas and estimates, and highlighting differences from complex cases.

Contribution

It establishes new connections between projection constants and Jacobi polynomial norms, providing explicit formulas and asymptotic estimates for real polynomial spaces.

Findings

Derived exact formulas for projection constants.

Connected projection constants to weighted $L_1$-norms of Jacobi polynomials.

Provided asymptotic estimates for high-dimensional cases.

Abstract

We investigate projection constants within classes of multivariate polynomials over finite-dimensional real Hilbert spaces. Specifically, we consider the projection constant for spaces of spherical harmonics and spaces of homogeneous polynomials as well as for spaces of polynomials of finite degree on the unit sphere. We establish a connection between these quantities and certain weighted $L_1$-norms of specific Jacobi polynomials. As a consequence, we present exact formulas, computable expressions and asymptotically accurate estimates for them. The real case we address is considerably more nuanced than its complex counterpart.