On an extension of a question of Baker
Abstract
It is an open question of Baker whether the numbers L(1, ) for non-trivial Dirichlet characters with period q are linearly independent over Q. The best known result is due to Baker, Birch and Wirsing which affirms this when q is co-prime to (q). In this article, we extend their result to any arbitrary family of moduli. More precisely, for a positive integer q, let Xq denote the set of all L(1,) values as varies over non-trivial Dirichlet characters with period q. Then for any finite set of pairwise co-prime natural numbers qi, 1 i with (q1 ·s q, ~(q1)·s (q))=1, we show that the set Xq1 ·s Xql is linearly independent over Q. In the process, we also extend a result of Okada about linear independence of the cotangent values over Q as well as a result of Murty-Murty about Q linear independence of such L(1, ) values. Finally, we prove Q linear independence of such L values of Erd\"osian functions with distinct prime periods pi for 1 i with (p1 ·s p, ~ ( p1·s p) )= 1.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.