Unexpected Uncertainty Principle for Disc Banach Spaces
Abstract
Let (\fn\n=1∞, \τn\n=1∞) and (\gn\n=1∞, \ωn\n=1∞) be unbounded continuous p-Schauder frames (0<p<1) for a disc Banach space X. Then for every x ∈ ( D(θf) (θg))\0\, we show that alignUB (1) \|θf x\|0\|θg x\|0 ≥ 1(n,m ∈ N |fn(ωm)|)p(n, m ∈ N|gm(τn)|)p, align where align* & θf: D(θf) x θfx := \fn(x)\n=1∞∈ p(N), θg: D(θg) x θgx := \gn(x)\n=1∞∈ p(N). align* Inequality (1) is unexpectedly different from both bounded uncertainty principle arXiv:2308.00312v1 and unbounded uncertainty principle arXiv:2312.00366v1 for Banach spaces.
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