The number 744 is significant in the context of Heegner numbers as it appears as the second term in the q expansion of the j-invariant. It can be factored as 744 = 23 × 3 × 31 = 122 × 31, where the number 12 plays a crucial role in elliptic curves. Specifically, 123 = 1728 divides the value of j(τ), where τ is a complex number associated with the elliptic curve E = ℤ ⊕ τℤ. This relationship highlights the intricate connections between number theory and elliptic curves.
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Anti-Crackpot said:Just curious if anyone had thoughts to offer on where the 744 comes from. I know it's the second term in the q expansion of the j-invariant, but since I am not much familiar with the intricacies of the maths for either q or j, I'm kind of flummoxed past that.
TIA for any thoughts,
AC
DonAntonio said:744=2^3\cdot 3 \cdot 31=12^2\cdot 31 Now, the number \,12\, has a special role in all this mess of elliptic curves. For example, \,12^3=1728\, divides the value of \,j(\tau)\, , with \,\tau=\, being a complex number with positive imaginary part, connected to a elliptic curve \,E=\mathbb Z \oplus \tau\mathbb Z.
This is very interesting and beautiful stuff, but way too messy and advanced to develop it here.
DonAntonio