Fabian Bocart scite author profile

Fabian Bocart

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Inflation Propensity of Collatz Orbits: A New Proof-of-Work for Blockchain Applications

Bocart¹

2018

JRFM

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Cryptocurrencies such as Bitcoin rely on a proof-of-work system to validate transactions and prevent attacks or double-spending. A new proof-of-work is introduced which seems to be the first number theoretic proof-of-work unrelated to primes: it is based on a new metric associated to the Collatz algorithm whose natural generalization is algorithmically undecidable: the inflation propensity is defined as the cardinality of new maxima in a developing Collatz orbit. It is numerically verified that the distribution of inflation propensity slowly converges to a geometric distribution of parameter 0 . 714 ≈ ( π - 1 ) 3 as the sample size increases. This pseudo-randomness opens the door to a new class of proofs-of-work based on congruential graphs.

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Inflation Propensity of Collatz Orbits: A New Proof-of-Work for Blockchain Applications

Bocart¹

2018

Preprint

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Cryptocurrencies like Bitcoin rely on a proof-of-work system to validate transactions and prevent attacks or double-spending. A new proof-of-work is introduced which seems to be the first number theoretic proof-of-work unrelated to primes: it is based on a new metric associated to the Collatz algorithm whose natural generalization is algorithmically undecidable: the inflation propensity is defined as the cardinality of new maxima in a developing Collatz orbit. It is numerically verified that the distribution of inflation propensity slowly converges to a geometric distribution of parameter $0.714 \approx \frac{(\pi - 1)}{3}$ as the sample size increases. This pseudo-randomness opens the door to a new class of proofs-of-work based on congruential graphs.

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Fabian Bocart

Inflation Propensity of Collatz Orbits: A New Proof-of-Work for Blockchain Applications

Inflation Propensity of Collatz Orbits: A New Proof-of-Work for Blockchain Applications

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