Polynomially reflexive space

In mathematics, a polynomially reflexive space is a Banach space X, on which the space of all polynomials in each degree is a reflexive space.

Given a multilinear functional M_n of degree n (that is, M_n is n-linear), we can define a polynomial p as

${\displaystyle p(x)=M_{n}(x,\dots ,x)}$

(that is, applying M_n on the diagonal) or any finite sum of these. If only n-linear functionals are in the sum, the polynomial is said to be n-homogeneous.

We define the space P_n as consisting of all n-homogeneous polynomials.

The P₁ is identical to the dual space, and is thus reflexive for all reflexive X. This implies that reflexivity is a prerequisite for polynomial reflexivity.

On a finite-dimensional linear space, a quadratic form x↦f(x) is always a (finite) linear combination of products x↦g(x) h(x) of two linear functionals g and h. Therefore, assuming that the scalars are complex numbers, every sequence x_n satisfying g(x_n) → 0 for all linear functionals g, satisfies also f(x_n) → 0 for all quadratic forms f.

In infinite dimension the situation is different. For example, in a Hilbert space, an orthonormal sequence x_n satisfies g(x_n) → 0 for all linear functionals g, and nevertheless f(x_n) = 1 where f is the quadratic form f(x) = ||x||². In more technical words, this quadratic form fails to be weakly sequentially continuous at the origin.

On a reflexive Banach space with the approximation property the following two conditions are equivalent:^[1]

• every quadratic form is weakly sequentially continuous at the origin;
• the Banach space of all quadratic forms is reflexive.

Quadratic forms are 2-homogeneous polynomials. The equivalence mentioned above holds also for n-homogeneous polynomials, n=3,4,...

For the ${\displaystyle \ell ^{p}}$ spaces, the P_n is reflexive if and only if n < p. Thus, no ${\displaystyle \ell ^{p}}$ is polynomially reflexive. (${\displaystyle \ell ^{\infty }}$ is ruled out because it is not reflexive.)

Thus if a Banach space admits ${\displaystyle \ell ^{p}}$ as a quotient space, it is not polynomially reflexive. This makes polynomially reflexive spaces rare.

The Tsirelson space T* is polynomially reflexive.^[2]

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