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Fig. 2. Schematic diagram of the computational system of a fruit fly Drosophila
melanogaster. (A) The local wingbase-fixed (x, y,
z) and the global earth-fixed (X, Y, Z)
coordinate systems. The origin O' of the wingbase-fixed coordinate
system lies at the wing base, with the x-axis normal to the stroke
plane [the yz plane as defined by Ellington
(Ellington, 1984b)], the
y-axis vertical to the body axis and z-direction parallel to
the stroke plane. (B) The wing kinematics are described by the positional
angle 
, the feathering angle (angle of attack of the wing) 
, the
elevation angle 
, and the stroke plane angle β; the link to the
earth-fixed frame of reference comes through the body angle 
. We assume a
body angle of 45° and a stroke plane angle β of 0°
(Fry et al., 2005). (C)
Instantaneous positional angle , feathering angle , and elevation
angle of the fruit fly wing over one complete flapping cycle. Green
solid, orange broken and blue dash-dot lines represent the positional angle
, the feathering angle and the elevation angle ,
respectively. Red points a–g: (a) mid pronation, (b) early downstroke,
(c) mid downstroke, (d) late downstroke, (e) early upstroke, (f) mid upstroke
and (g) late upstroke. T, dimensionless period of one flapping
cycle.
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