Martin Chuaqui scite author profile

Abstract. A geometric interpretation of the Schwarzian of a harmonic mapping is given in terms of geodesic curvature on the associated minimal surface, generalizing a classical formula for analytic functions. A formula for curvature of image arcs under harmonic mappings is applied to derive a known result on concavity of the boundary. It is also used to characterize fully convex mappings, which are related to fully starlike mappings through a harmonic analogue of Alexander's theorem.

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Univalence criteria for lifts of harmonic mappings to minimal surfaces

Chuaqui

Duren

Osgood

2007

J Geom Anal

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A general criterion in terms of the Schwarzian derivative is given for global univalence of the Weierstrass-Enneper lift of a planar harmonic mapping. Results on distortion and boundary regularity are also deduced. Examples are given to show that the criterion is sharp. The analysis depends on a generalized Schwarzian defined for conformal metrics and on a Schwarzian introduced by Ahlfors for curves. Convexity plays a central role.2000 Mathematics Subject Classification. Primary 30C99; Secondary 31A05, 53A10. Key words and phrases. Harmonic mapping, Schwarzian derivative, curvature, minimal surface. The authors were supported in part by FONDECYT Grant # 1030589. lift to a minimal surface, and it is this lift whose univalence is implied by bounds on the Schwarzian derivative. For the underlying harmonic mappings, univalent or not, our criterion is also shown to imply estimates on distortion and properties of boundary regularity that are better than those known or conjectured (see [20] or [9]) for the full normalized class of univalent harmonic mappings. In this respect our investigation can be viewed as a harmonic analogue of earlier work on analytic functions by Gehring and Pommerenke [11] and Chuaqui and Osgood [6], [7], [8].A planar harmonic mapping is a complex-valued harmonic function f (z), z = x + iy, defined on some domain Ω ⊂ C. If Ω is simply connected, the mapping has a canonical decomposition f = h + g, where h and g are analytic in Ω and g(z 0 ) = 0 for some specified point z 0 ∈ Ω. The mapping f is locally univalent if and only if its Jacobian |h ′ | 2 − |g ′ | 2 does not vanish. It is said to be orientation-preserving if |h ′ (z)| > |g ′ (z)| in Ω, or equivalently if h ′ (z) = 0 and the dilatation ω = g ′ /h ′ has the property |ω(z)| < 1 in Ω.According to the Weierstrass-Enneper formulas, a harmonic mapping f = h + g with |h ′ (z)| + |g ′ (z)| = 0 lifts locally to map into a minimal surface, Σ, described by conformal parameters if and only if its dilatation ω = q 2 , the square of a meromorphic function q. The Cartesian coordinates (U, V, W ) of the surface are then given byWe use the notation f (z) = U(z), V (z), W (z)for the lifted mapping of Ω into Σ. The height of the surface can be expressed more symmetrically as

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Sharp Distortion Theorems Associated with the Schwarzian Derivative

Chuaqui

Osgood

1993

Journal of the London Mathematical Society

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Martin Chuaqui

Uniqueness and boundary behavior of large solutions to elliptic problems with singular weights

The Schwarzian derivative for harmonic mappings

Curvature Properties of Planar Harmonic Mappings

Univalence criteria for lifts of harmonic mappings to minimal surfaces

Sharp Distortion Theorems Associated with the Schwarzian Derivative

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