Finding infinitesimal Mobius transformations

Suppose $A:[0,1]\to\mathrm{SL}_2(\mathbb{C})$ is a differentiable path, with $A(0)=I$, and $z\in\widehat{\mathbb{C}}$ is a constant. Then we may differentiate the transformation $A(t)z$ at $t=0$ to obtain $(\mathrm{d}A)(z)$:

$$ \left(\frac{az+b}{cz+d}\right)'=\frac{(\dot{a}z+\dot{b})(cz+d)-(az+b)(\dot{c}z+\dot{d})}{(cz+d)^2}=-\dot{c}z^2+(\dot{a}-\dot{d})z+\dot{b}. $$

Note $a=1,b=0,c=0,d=1$ at $t=0$.

The reason for the asymmetry (why $c$ goes with the quadratic term and $b$ with the constant term) is because of how we identify the complex projective line $\mathbb{CP}^1$ with $\widehat{\mathbb{C}}$ by identifying $(w,z)$ with $(w/z,1)$; if instead we used the second coordinate for $\widehat{\mathbb{C}}$ (i.e. $z/w$) it would have been the other way around.

Tags:

Lie Algebras

Complex Analysis

Mobius Transformation

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