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@@ -17,6 +17,16 @@ <h1># Characteristics of numbers 11, 7, 3, 5675055181, 13, 1753, 56750551851, 17
 and hopefully following some rational sound math formula and strategies in order to rediscover through a similar path an array of transcendental numbers,
 including a lost one, dealing with other various intricacies and multiplots of prime numbers, special formulas and conjectures, all in order to study systems that exhibit quantum mechanical behavior, 
 such as some particles. Imaginary thermodynamics anyone?
+
+In this paper , https://link.springer.com/chapter/10.1007/978-3-642-87140-5_2
+the proof of the important Orlicz- Pettis theorem which claims the equivalence of weak and strong unconditional convergence of series in Banach spaces. 
+The second paragraph contains Riemann’s theorem which asserts that absolute and unconditional convergence of series in finite dimensional vector spaces are the same, 
+and the famous Dvoretzky-Rogers theorem. The latter states the existence in every infinite dimensional Banach space of an unconditional series which is not absolutely convergent,
+a fact, which has been conjectured for about twenty years and which has been settled down by Dvoretzky and Rogers in 1950.
+
+In this PHD dissertation, Convergence of Frame Series from Hilbert spaces to Banach spaces And l^1-boundedness, https://repository.gatech.edu/entities/publication/36f42a49-2e32-4cb4-9f3e-a6196c623a47,
+similar methods and information are mentnioned.
+
 <> 59.99 value calculated </>
 
 <> $`cos(pi/2  - log2(e)) = 0.99999750062433397480084412018728`$ </>