• Title/Summary/Keyword: Rimann Invariant

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A numerical Analysis on Three-Dimensional Inviscid Transonic Cascade Flow (3차원 비점성 천음속 익렬 유동에 관한 수치해석적 연구)

  • 이훈구;유정열
    • Transactions of the Korean Society of Mechanical Engineers
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    • v.16 no.2
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    • pp.336-347
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    • 1992
  • The three dimensional inviscid transonic cascade flow was investigated numerically, incorporation a four stage Runge-Kutta integration method proposed by Jameson. Time marching to the steady state was accelerated by using optimum time step and enthalpy damping. In describing the boundary conditions at inlet and outlet, Riemann invariants are considered. By adding a second and a fourth order artificial viscocities, the numerical instability due to the propagation of undamped disturbance or the rapid change of state near the shock has been prevented. The numerical results for are bump cascade, cambered two dimensional turbine cascade and three dimensional stator cascade agreed reasonably well with previous results. It has been known that the accuracy of the solution depended a lot on the modeling of the leading or trailing edge.