6533b82afe1ef96bd128ba11

RESEARCH PRODUCT

Integer Complexity: Experimental and Analytical Results

Jānis IraidsKaspars BalodisJuris ČErņenoksMārtiņš OpmanisRihards OpmanisKārlis Podnieks

subject

Mathematics - Number TheoryFOS: MathematicsNumber Theory (math.NT)

description

We consider representing of natural numbers by arithmetical expressions using ones, addition, multiplication and parentheses. The (integer) complexity of n -- denoted by ||n|| -- is defined as the number of ones in the shortest expressions representing n. We arrive here very soon at the problems that are easy to formulate, but (it seems) extremely hard to solve. In this paper we represent our attempts to explore the field by means of experimental mathematics. Having computed the values of ||n|| up to 10^12 we present our observations. One of them (if true) implies that there is an infinite number of Sophie Germain primes, and even that there is an infinite number of Cunningham chains of length 4 (at least). We prove also some analytical results about integer complexity.

yearjournalcountryeditionlanguage
2012-03-29
https://dx.doi.org/10.48550/arxiv.1203.6462