When I know the two points above the elliptic curve, and the two points satisfy the relationship: $Q=e \cdot P$, is it possible for me to solve for $e$.
The equation of the curve is: $y^2 = x^3 + ax + b \pmod p$, while $e$ is a $32$-bit integer.

When I know the two points on an elliptic curve, and the two points satisfy the relationship: $Q=e \cdot P$, is it possible for me to solve for $e$.
The equation of the curve is: $y^2 = x^3 + ax + b \pmod p$, while $e$ is a $32$-bit integer.

When I know the two points above the elliptic curve, and the two points satisfy the relationship: Q=e*P, is it possible for me to solve for e The equation of the curve is: y^2 = x^3 + ax + b mod(p) e is a 32-bit integer

When I know the two points above the elliptic curve, and the two points satisfy the relationship: $Q=e \cdot P$, is it possible for me to solve for $e$.
The equation of the curve is: $y^2 = x^3 + ax + b \pmod p$, while $e$ is a $32$-bit integer.