Inflection divisors of linear series on an elliptic curve

Abstract

In this largely-expository note, we describe a class of divisors on elliptic curves that index the inflection points of linear series arising (as subspaces of holomorphic sections) from line bundles on P1 via pullback along the canonical 2-to-1 projection. Associated to each inflection divisor on an elliptic curve Eλ: y2= x(x-1)(x-λ), there is an associated inflectionary curve in (the projective compactification of) the affine plane in coordinates x and λ. These inflectionary curves have remarkable features; among other things, they lead directly to an explicit conjecture for the number of real inflection points of linear series on Eλ whenever the Legendre parameter λ is real.