6,083 research outputs found
Linearized potential solution for an airfoil in nonuniform parallel streams
A small perturbation potential flow theory is applied to the problem of determining the chordwise pressure distribution, lift and pitching moment of a thin airfoil in the middle of five parallel streams. This theory is then extended to the case of an undisturbed stream having a given smooth velocity profile. Two typical examples are considered and the results obtained are compared with available solutions of Euler's equations. The agreement between these two results is not quite satisfactory. Possible reasons for the differences are indicated
Studies on the interference of wings and propeller slipstreams
The small disturbance potential flow theory is applied to determine the lift of an airfoil in a nonuniform parallel stream. The given stream is replaced by an equivalent stream with a certain number of velocity discontinuities, and the influence of these discontinuities is obtained by the method of images. Next, this method is extended to the problem of an airfoil in a nonuniform stream of smooth velocity profile. This model allows perturbation velocity potential in a rotational undisturbed stream. A comparison of these results with numerical solutions of Euler equations indicates that, although approximate, the present method provides useful information about the interaction problem while avoiding the need to solve the Euler equations
A modified lifting line theory for wing-propeller interference
An inviscid incompressible model for the interaction of a wing with a single propeller slipstream is presented. The model allows the perturbation quantities to be potential even though the undisturbed flow is rotational. The governing equations for the spanwise lift distribution are derived and a simple method of solving these is indicated. Spanwise lift and induced drag distribution for two cases are computed
Ergodicity from Nonergodicity in Quantum Correlations of Low-dimensional Spin Systems
Correlations between the parts of a many-body system, and its time dynamics,
lie at the heart of sciences, and they can be classical as well as quantum.
Quantum correlations are traditionally viewed as constituted out of classical
correlations and magnetizations. While that of course remains so, we show that
quantum correlations can have statistical mechanical properties like
ergodicity, which is not inherited from the corresponding classical
correlations and magnetizations, for the transverse anisotropic quantum XY
model in one-, two-, and quasi two-dimension, for suitably chosen transverse
fields and temperatures. The results have the potential for applications in
decoherence effects in realizable quantum computers.Comment: 8 pages, 6 figures, RevTeX 4.
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