Tamagawa Products for Elliptic Curves Over Number Fields

Abstract

In recent work, Griffin, Ono, and Tsai constructs an L-series to prove that the proportion of short Weierstrass elliptic curves over Q with trivial Tamagawa product is 0.5054… and that the average Tamagawa product is 1.8183…. Following their work, we generalize their L-series over arbitrary number fields K to be \[LTam(K; s):=Σm=1∞PTam(K; m)ms,\] where PTam(K;m) is the proportion of short Weierstrass elliptic curves over K with Tamagawa product m. We then construct Markov chains to compute the exact values of PTam(K;m) for all number fields K and positive integers m. As a corollary, we also compute the average Tamagawa product LTam(K;-1). We then use these results to uniformly bound PTam(K;1) and LTam(K,-1) in terms of the degree of K. Finally, we show that there exist sequences of K for which PTam(K;1) tends to 0 and LTam(K;-1) to ∞, as well as sequences of K for which PTam(K;1) and LTam(K;-1) tend to 1.