# Can the base point of an elliptic curve be any point?

An elliptic curve is defined as: "Formally, an elliptic curve is a smooth, projective, algebraic curve of genus one, on which there is a specified point O."

From this it sort of sounds like you can just specify whichever point you like and it counts as an elliptic curve. Does the base point not have to act as zero? Is there a way to defined the group law so any point acts as zero?

Possible answer: I have heard you can take any inflection point as the base point and you can define an addition law with that. Does the definition just mean "a specified inflection point"?

Any references would be great. I imagine this is in silverman but I haven't found it yet...

Edit: in addition to the answer below I found the proof in Silverman, prop 3.1 on page 59.

• Yes, and the point need not be an "inflection point". – Angina Seng Sep 4 '19 at 3:04

• What about $\mathcal{O}$ as a generator? – kelalaka Sep 4 '19 at 17:34