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Organisation/Company ONERA Research Field Engineering Mathematics Computer science » Digital systems Researcher Profile Recognised Researcher (R2) Leading Researcher (R4) First Stage Researcher (R1) Established Researcher (R3) Application Deadline 5 Mar 2026 - 22:00 (UTC) Country France Type of Contract Temporary Job Status Full-time Offer Starting Date 1 Sep 2026 Is the job funded through the EU Research Framework Programme? Not funded by a EU programme Is the Job related to staff position within a Research Infrastructure? No

Overview

In aerospace turbo-pumps, turbines rotate at speeds up to 100,000 rpm to deliver propellant to the rocket engine at high flow rates and optimized pressures. At such extreme conditions, mechanical supports like ball bearings alone cannot maintain the rotor’s axial position. Instead, part of the propellant is diverted into a cavity behind the rotor, known as a hydrostatic bearing or Axial Balancing System (ABS) to balance forces. This cavity, bounded by inner and outer valves at the rotor’s center and periphery, stabilizes the rotor through pressure equilibrium. However, under certain conditions, the compressible fluid’s response to rotor motion can induce vibrations and instabilities. These fluid-structure interactions are critical as they may degrade performance or even cause failure. Understanding them is therefore essential to improving the reliability and performance of spatial turbo-pumps.

To investigate the fundamental mechanisms of these instabilities, a simplified ABS test bench was set up at IRPHE. In this setup, the motion of a disc changes the aperture of an inner valve, directly influencing the cavity flow and pressure fluctuations. Adjustment rings allow precise tuning of the geometry, making it possible to couple acoustic modes in the cavity with structural modes of the disc. This can generate sustained oscillations, thereby reproducing instability mechanisms observed in real turbo-pumps. This experimental platform provides an ideal reference for validating numerical predictions. Although fluid-structure coupling in such systems is conceptually understood, there is currently no accurate method to predict the onset of instability in ABS configurations. Existing studies using Arbitrary Lagrangian Eulerian (ALE) frameworks have successfully captured oscillatory behavior and destabilization phenomena in other fluid–structure systems, but a systematic application to ABS geometries and conditions has not yet been undertaken.

Responsibilities (as described in the project)

• Develop a numerical framework based on linear stability analysis within the ALE approach to capture fluid-structure instabilities in a compressible, turbulent flow.
• Provide predictive insights and confirm destabilization mechanisms.
• Investigate the sensitivity of instability onset to key input parameters such as inflow velocity profiles, cavity dimensions, or disc rigidity.
• Investigate the harmonic response to periodic perturbations.
• Systematically compare numerical predictions with available experimental data from IRPHE to assess accuracy and refine the model, ultimately leading to a validated numerical tool capable of predicting ABS instabilities.

References for context:

• (1) Brunier-Coulin, Florian, Vandenberghe, Nicolas, Verhille, Gautier, and Le Gal, Patrice. Fluid–structure instabilities in the axial balancing system of a turbo-pump. Journal of Sound and Vibration, ), .
• (2) Pfister, Jean-Lou, Marquet, Olivier, and Carini, Marco. Linear stability analysis of strongly coupled fluid–structure problems with the Arbitrary-Lagrangian–Eulerian method. Computer Methods in Applied Mechanics and Engineering, ), 663-689.
• (3) Pfister, Jean-Lou, Fabbiane, Nicolo, and Olivier, Marquet. Global stability and resolvent analyses of laminar boundary-layer flow interacting with viscoelastic patches. Journal of Fluid Mechanics, ).
• (4) Houtman, Jelle and Timme, Sebastian. Global stability analysis of elastic aircraft in edge-of-the-envelope flow. Journal of Fluid Mechanics, ).

Subject with figures is available at

Qualifications: Master degree required, in Fluid Mechanics, Applied Mathematics or relevant field of studies.