On the Sign Distributions of Hilbert Space Frames

Abstract

We show that the positive and negative parts uk of any frame in a real L2 space with respect to a continuous measure have both "infinite l2 masses": 1) always, Σ kuk (x)2=∞ almost everywhere (in particular, there exist no positive frames, nor Riesz bases), but 2) Σ k=1n(uk+(x)-uk-(x))2 can grow "locally" as slow as we wish (for n ∞ ), and 3) it can happen that Σ k=1nuk-(x)2=\, o(Σ k=1nuk+(x)2), and vice versa, as n ∞ on a set of positive measure. Property 1) for the case of an orthonormal basis in L2(0,1) was settled earlier (V. Ya. Kozlov, 1948) using completely different (and more involved) arguments. Our elementary treatment includes also the case of unconditional bases in a variety of Banach spaces. For property 2), we show that, moreover, whatever is a monotone sequence ε k>0 satisfying Σ kε 2k=\, ∞ there exists an orthonormal basis (uk)k\, in L2 such that uk(x) ≤ \, A(x)ε k, 0<A(x)<\, ∞ .