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Let (\fₙ\₍=₁^, \ₙ\₍=₁^) and (\gₙ\₍=₁^, \ₙ\₍=₁^) be unbounded continuous p-Schauder frames (0<p<1) for a disc Banach space X. Then for every x (D (f) (g) ) \0\, we show that alignUB (1) \|f x\|₀\|g x\|₀ 1 (₍, ₌ ₍ |fₙ (ₘ) |) ᵖ (₍, ₌ ₍|gₘ (ₙ) |) ᵖ, align where align* & f: D (f) x fx: = \fₙ (x) \₍=₁^ ᵖ (N), g: D (g) x gx: = \gₙ (x) \₍=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.
K. Mahesh Krishna (Mon,) studied this question.
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