First, is there a relatively simple formula for the midpoint of two points a 1 </m

Karina Trujillo

Karina Trujillo

Answered question

2022-06-14

First, is there a relatively simple formula for the midpoint of two points a 1 and a 2 in the disk with respect to the hyperbolic geometry? That is, the point on the bisector of a 1 and a 2 which has minimal distance from a 1 and a 2 .
Second, if B denotes the degree 2 finite Blaschke product with zeros a 1 and a 2 , is the critical point of B which is in the disk equal to the midpoint of a 1 and a 2 ?

Answer & Explanation

seraphinod

seraphinod

Beginner2022-06-15Added 22 answers

Step 1
Critical point
Yes, it's at the midpoint. For Blaschke products B with zeros at ± a this is immediate from the formula B ( z ) = ( z 2 a 2 ) / ( 1 a ¯ 2 z 2 ) .
If zeros are elsewhere, say z 1 , z 2 , then consider the composition B ϕ 1 where ϕ is a Mobius transformation that sends the hyperbolic midpoint between z 1 , z 2 to 0. This composition is a Blaschke product with zeros ϕ ( z 1 ) , ϕ ( z 2 ) which satisfy ϕ ( z 1 ) + ϕ ( z 2 ) = 0 , reducing the problem to the previous case.
Midpoint
The connection with Blaschke product might be the easiest approach. Move one of points to zero, the other goes to
c = a 1 a 2 1 a 1 a ¯ 2
The midpoint between 0 and c can be found by differentiating z ( z c ) / ( 1 c ¯ z ) . When c is between 0 and 1 (can be achieved by rotation), it's
d = 1 1 c 2 c
Finally, the midpoint is obtained by undoing,
m = d + a 2 1 + m a ¯ 2

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