On the geometry of Riemannian cubic polynomials

## Abstract We show that the symmetric injective tensor product space is not complex strictly convex if __E__ is a complex Banach space of dim __E__ ≥ 2 and if __n__ ≥ 2 holds. It is also reproved that ℓ~∞~ is finitely represented in if __E__ is infinite‐dimensional and if __n__ ≥ 2 holds, which

We study the noncommutative Riemannian geometry of the alternating group A 4 = (Z 2 × Z 2 ) Z 3 using the recent formulation for finite groups. We find a unique 'Levi-Civita' connection for the invariant metric, and find that it has Ricci flat but nonzero Riemann curvature. We show that it is the un

In 1959, Davis introduced the concept of a differentiator of an operator on a finite-dimensional Hilbert space. We prove that every such operator possesses a differentiator. We also use the theory of differentiators to solve several problems in the geometry of polynomials. For instance, we answer in