2. It is sometimes considered as strange that the ancient Indians were fascinated by large enormous integers
and numbers. The existence of the Piglet transform to aid integer factorisation and the existence of the Roo
number system that explains why all very large integers can collapse or pulsate are pointers to the solution
to the mystery. The ancient Indians do not seem to have employed the branch of mathematics known as
Analysis instead they relied on Arithmetic. All Analysis can be reduced to Arithmetic and the results of
Analysis only become evident with Arithmetic applied to very large integers. The Piglet transform can be
interpreted as saying that primes can be related either to a vacuum occurring in a finite region of space or a
nonaccepting Turing Machine computation of finite time complexity. The distribution of matter in a finite
region of space or the behaviour of a halting Turing Machine can be related to an integer that can be
factored. The distribution of primes in an enumeration of integers thus becomes the distribution of
nonhalting Turing Machines of finite time complexity in an enumeration of all Turing Machines of finite time
complexity. This seems to vindicate Tigger's view that the Riemann Hypothesis is related to the finite
version of Hilbert's Entscheidungsproblem. This is related to the concept that the Macro Cosmos is
reflected in the Micro Cosmos. All this is possible only when very enormously large integers are considered.
Also all this is within the framework of the Peano Axioms, the ZFC axioms and is naturally and consistently
related to the Arabic positional representation of numbers
POOH CLEARS UP THE MYSTERY
OF ENORMOUSLY LARGE
INTEGERS