Carl Strmer and his Numbers

Abstract

In many proofs of Fermat's Two Squares Theorem, the smallest least residue solution x0 of the quadratic congruence x2 -1 p plays an essential role; here p is prime and p 1 4. Such an x0 is called a Strmer number, named after the Norwegian mathematician and astronomer Carl Strmer (1874-1957). In this paper, we establish necessary and sufficient conditions for x0 ∈ N to be a Strmer number of some prime p 1 4. Strmer's main interest in his investigations of Strmer numbers stemmed from his study of identities expressing π as finite linear combinations of certain values of the Gregory-MacLaurin series for (1/x). Since less than 600 digits of π were known by 1900, approximating π was an important topic. One such identity, discovered by Strmer in 1896, was used by Yasumasa Kanada and his team in 2002 to obtain 1.24 trillion digits of π. We also discuss Strmer's work on connecting these numbers to Gregory numbers and approximations of π.

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