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Bagadi, R. (2016). TRL Recursive Quantization Scheme For Any Aspect Primality Of Concern. Hyper-Primality Computation. (Universal Engineering Series). ISSN 1751-3030. PHILICA.COM Article number 654.

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TRL Recursive Quantization Scheme For Any Aspect Primality Of Concern. Hyper-Primality Computation. (Universal Engineering Series). ISSN 1751-3030

Ramesh Chandra Bagadiunconfirmed user (Physics, Engineering Mechanics, Civil & Environmental Engineering, University of Wisconsin)

Published in engi.philica.com

Abstract
TRL Recursive Quantization Scheme For Any Aspect Primality Of Concern. Hyper-Primality Computation. (Universal Engineering Series). ISSN 1751-3030

Author:
Ramesh Chandra Bagadi
Founder, Owner, Co-Director And Advising Scientist In Principal
Ramesh Bagadi Consulting LLC (R420752), Madison, Wisconsin-53715, United States Of America.
Email: rameshcbagadi@uwalumni.com

Permanent Home Address:
MIG-905, Mithilapuri Colony,
VUDA Layout, Madhurawada, Visakhapatnam 530 041,
Andhra Pradesh State, India.

Telephones:
+91-9440032711
+91-7702721450
+91-891-2501619

Article body

TRL Recursive Quantization Scheme For Any Aspect Primality Of Concern. Hyper-Primality Computation. (Universal Engineering Series). ISSN 1751-3030

Author:
Ramesh Chandra Bagadi
Founder, Owner, Co-Director And Advising Scientist In Principal
Ramesh Bagadi Consulting LLC (R420752), Madison, Wisconsin-53715, United States Of America.
Email: rameshcbagadi@uwalumni.com

Home Address:
MIG-905, Mithilapuri Colony,
VUDA Layout, Madhurawada, Visakhapatnam 530 041,
Andhra Pradesh State, India.

Telephones:
+91-9440032711
+91-7702721450
+91-891-2501619

One can note that for any Aspect Set (inclusive of those with Repeating Elements) of Concern, we can compute its
Onward Case:
1.First Order Sequence Of Primes Based Primality Tree. If still some Elements of the Set are remaining, we now Construct the Second Order Sequence Of Primes Based Primality Tree using these remaining Elements. If still some Elements are remaining, we construct the Third Order Sequence Of Primes Based Primality Tree using these remaining Elements. If still some Elements are remaining, we keep repeating this procedure to exhaustion. This can be done using author’s [1] and [2].
2.Especially, when the case of the type arises when one or more Elements of the Set are not covered by 1., we can then Slate the remaining Elements of the Set of concern at any Variable Real Order** Sequence Of Primes based Primality Tree(s), the order depending on the Least Count* of investigation of concern, actually in essence called for by the Complexity of Exhaustiveness. This can be done by using author’s [3].
**belonging to the Open Intervals (1,2),(2,3), (3,4),,,,,,(n,n+1), etc,. Note that, we have to try fitting and/ or covering these remaining elements in each of the Open Intervals (1,2),(2,3), (3,4),,,,,,(n,n+1), etc, that Represent the Fractional Real Order (of the Sequence of Primes they belong to).
3.For each of the above Sets, we also find Complete Recursive Sub-Sets to Exhaustion, using author’s [4].
Reverse Case:
4.For each of the above Primality Sets computed in 1., 2., and 3., we find the Complementary Primality. This can be done by using author’s [4].
5.The Entire Primality Set and its Entire Complementary Primality Set can be connected using the Scheme detailed in [5] and [6] to form the Universal Primality Infinity Geodesic of the Aspect Primality of Concern.
One can note that the Onward and Reverse Case are just Complementary to each other.

References
1.Bagadi, R. (2016). Primality Tree Of Any Given Set. ISSN 1751-3030. PHILICA.COM Article number 631.
2.Bagadi, R. (2016). Field(s) Of Sequence(s) Of Primes Of Positive Integral Higher Order Space(s). ISSN 1751-3030. PHILICA.COM Article number 622.
3.Bagadi, R. (2016). Recursive Calculation Of Elements Of Sequence Of Fractional Any Higher Order Primes Using Total Combinational Uncertainty. ISSN 1751-3030. PHILICA.COM Article number 653.
4.Upcoming. See author if an urgency.
5.Bagadi, R. (2016). TRL The Time Triangle Delta. (Universal Engineering Series). ISSN 1751-3030. PHILICA.COM Article number 648.
6.Bagadi, R. (2016). TRL The Infinity Geodesic Of Any Aspect Primality. (Universal Engineering Series) ISSN 1751-3030.. PHILICA.COM Article number 649.
7.http://www.philica.com/advancedsearch.php?author=12897
8.www.vixra.org/author/ramesh_chandra_bagadi

Moral: The Good Goes Further Relative To The Bad.

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This Article was published on 2nd August, 2016 at 06:15:52 and has been viewed 698 times.

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The full citation for this Article is:
Bagadi, R. (2016). TRL Recursive Quantization Scheme For Any Aspect Primality Of Concern. Hyper-Primality Computation. (Universal Engineering Series). ISSN 1751-3030. PHILICA.COM Article number 654.


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