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In 1931, the young Austrian mathematician that a formal mathematical system is either incomplete or inconsistent. To put it in another
words that there statements in mathematics which are un decidable. An
easy version of this is stated that in a non trivial
mathematical system, there are propositions and its denials. The
simple statement is that in a formal axiomatically mathematical
system, we can construct a theorem which is neither true nor false. Recently Kalimuthu published four papers re confirming Gdel’s
incompleteness theorems by probing the parallel postulate of
Euclidean geometry .
M. Sivasubramanian. (2017) A Brief Review of Kalimuthu’s Geometrical Publications, Punjab University Journal of Mathematics, Volume 49, Issue 2.
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