Question

Diffeo·morphisms which satisfy the Beltrami equation with a finite Beltrami coefficient have the “quasi” form of this property. A lesser-known theorem of Liouville states that, in R-n with n greater than two, any function with this property is a composition of (15[1])Mobius transformations. A function with this property that connects the upper half-plane to any simple polygon can be constructed with the Schwarz-Christoffel integral. Two subsets of the complex plane have this type of (*) equivalence if there is a bi·holo·morphic function connecting them; such equivalence exists between any simply connected open set and the unit disc per the Riemann mapping theorem. For functions with this property, the Jacobian everywhere equals a scalar multiple of a rotation matrix. For 10 points, (-5[1])name this type of function that locally (-5[1])preserves angles. ■END■ (0[2])

ANSWER: conformal map [accept quasi-conformal or conformally equivalent; accept biholomorphic before “biholomorphic”; reject “holomorphic”]
<BB>
= Average correct buzz position

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Buzzes

PlayerTeamOpponentBuzz PositionValue
Andrej VukovicCameron et al.Neg 5! Playing Quizbowl, Liddy Style4015
David SnoddonParth et al.The Passion According to C.H.119-5
Michael DuThe Vulture's Guide to BuzzMilan et al.126-5
Benjamin ChapmanThe Passion According to C.H.Parth et al.1290
Ian ChowMilan et al.The Vulture's Guide to Buzz1290

Summary

2023 BHSU @ Maryland03/11/2023Y333%0%0%129.00
2023 BHSU @ Berkeley03/18/2023Y367%33%33%70.50
2023 BHSU @ Sheffield04/15/2023Y2100%0%0%127.00
2023 BHSU @ Waterloo04/15/2023Y333%33%67%40.00