Abstract
We will prove some new results in the theory of Weaving Frames. Two frames {φi}ieI and {Ψ i }ieI in a Hilbert space H are woven if there are constants 0 i } ieσ ∪ {ψ i } ieσc is a frame for H with frame bounds A, B. We begin by introducing the main results in weaving frames. We then prove some new basic properties. This is followed by showing a fundamental connection between frames and projections, providing intuition on woven frames. Finally, a weaving equivalent of an unconditional basis for weaving Riesz bases is considered.
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