Question

Diffeo·morphisms which satisfy the Beltrami equation with a finite Beltrami coefficient have the “quasi” form of this property. A theorem of Liouville states that, in R-n with n greater than two, any function with this property is a composition of Mobius transformations. A function with this property that connects the upper half-plane to any simple (-5[1])polygon can be constructed with the Schwarz-Christoffel (-5[1])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 (10[1])per the Riemann mapping theorem. For functions with this property, the Jacobian everywhere equals a scalar multiple of a rotation matrix. For 10 points, name this type of function that locally preserves (-5[1])angles. (10[1])■END■ (10[1]0[3])

ANSWER: conformal map [accept quasi-conformal or conformally equivalent]
<BB>
= Average correct buzz position

Buzzes

PlayerTeamOpponentBuzz PositionValue
Iain CarpenterIllinoisChicago B54-5
Jeremy CummingsWUSTLNorthwestern61-5
Jerry VinokurovMaryland B-Purdue9410
Davis Everson-RoseEpic GamesOSU126-5
Eric MukherjeeSenpai Notice MeChicago A12710
Clark SmithOSUEpic Games1280
Conor ThompsonMichiganMojo Shojo1280
Beni KeownNorthwesternWUSTL1280
Vivek SasseChicago BIllinois12810

Summary

2023 BHSU @ Northwestern02/25/2023Y650%0%50%116.33
2023 BHSU @ Maryland03/11/2023N333%0%0%129.00
2023 BHSU @ Berkeley03/18/2023N367%33%33%70.50
2023 BHSU @ Sheffield04/15/2023N2100%0%0%127.00
2023 BHSU @ Waterloo04/15/2023N333%33%67%40.00