Patent Application
20080138197
This invention relates to transition ducts in gas turbine engines.
In a multi-spool jet engine the low-pressure (LP) system has a lower rotational speed and larger radius than the high-pressure (HP) core system. Hence, intermediate “S” shaped transition ducts are needed to connect the compressor or turbine of the high-radius LP system with the corresponding compressor or turbine of the low-radius HP system. These intermediate ducts often carry loads, support bearings and have thick structural struts passing through them, making them large, heavy and expensive structures of considerable complexity. Improving these ducts can lead to significant benefits both in the weight and in the performance of the engine.
In particular, if the curvature of the duct is made more pronounced, the required change of radius can be accomplished with a shorter duct and the whole engine can be made shorter and lighter. However, more pronounced curvature exacerbates the undesirable aerodynamic effects in the duct. This may worsen the aerodynamic performance of a downstream compressor or turbine, and may cause instability in either an upstream or a downstream compressor. These effects limit the design of current transition ducts.
It is therefore an object of the invention to provide a transition duct for a gas turbine engine that is shorter and lighter than known ducts, without introducing aerodynamic problems.
According to the invention, there is provided a transition duct for a gas turbine engine as claimed in claim 1.
The invention will now be described, by way of example, with reference to the accompanying drawings in which
a) and 6(b) are sectional side views of the ducts of
A typical duct used between compressors today has an area ratio (Ain/Aout) of 1.0-2.5 and an aspect ratio (ΔR/length) of 0.3-0.6. The ducts used in current engines may in fact achieve only minimal diffusion. This is a very conservative choice in order to be absolutely sure that there is no risk of separations in the duct. When optimizing a compression system a conservative duct leads to significant compromises in both upstream and downstream compressors. Rear stages of the upstream compressor have to be designed at a non-optimum radius, and the design flow coefficient of the downstream compressor is limited by the exit Mach number of the upstream compressor and the choice of a conservative area ratio through the duct. There are inevitable cost, weight and fuel-burn penalties associated with such compromises, and these will be present for the complete life cycle of the product. If it were possible to use more pronounced curvatures in duct designs and design tools, much better optimization of the whole compression system would be possible.
Transition ducts between compressors should ideally diffuse the flow through them in order to minimise the flow velocity into the downstream compressor. That is to say, the cross-sectional area of the duct should ideally increase in the flow direction.
Where structural struts are present they will typically have a form of aerodynamic fairing around them to present an acceptably smooth surface to the gas flow. Typically the fairing is symmetrical in shape around the camber line of the strut, and both its surfaces are largely convex in plan view.
In some instances the strut and fairing will not be separate. Rather, the strut itself will be aerodynamically shaped.
Throughout this specification, the term “fairing” will be used for such an aerodynamic fairing, or for a fairing-shaped strut.
These fairings do not turn the air flow through the duct, and so there is no aerodynamic lift on them. These fairings should, therefore, not be confused with vanes, or static turning aerofoils, in a compressor or a turbine of a gas turbine engine.
In the case that the inlet flow is axially aligned, the fairing will also be so aligned. However, if the inlet flow is swirling (has a tangential velocity component) then the fairings will be staggered to be aligned to this flow.
In the case of swirling inlet flow and the duct changing radius (which typically it will) then the flow angle will change through the duct as a) the axial velocity changes (with area change) and b) the tangential velocity changes (with radius, following the conservation of angular momentum). If the flow angle through the duct does change then the stagger angle of the camber line will be modified accordingly. The fairing stagger angle will follow the flow—but it will not be turning it.
Although fairings improve the gas flow past the struts, their presence will exacerbate the diffusion of the flow locally and may give rise to flow separations, resulting in aerodynamic losses in the duct and poor inlet conditions to the downstream compressor. The latter may cause a loss of efficiency of the downstream compressor and/or make it more prone to surge.
In
These effects would arise even for the duct alone. However, the presence of the fairing 12 exacerbates them. The region of lower static pressure due to the flow accelerating over the convex end wall curvature 28 extends further downstream near to the fairing 12 than it does further away from it (region 22 in
The aerodynamic conditions may be so adverse that flow separation occurs. This is shown in
It should also be understood that the location of the maximum thickness of the fairing 12 is typically in its forward (upstream) part. This will usually correspond to the location of the maximum thickness of the strut within it. By having the maximum thickness in the forward part of the strut the diffusion gradient along the surface of the fairing is reduced and the losses in the boundary layer (away from the end walls) are minimised.
It will be clear that if the aim of reducing duct length, and/or increasing the radius change for a given length, is to be achieved the radii of curvature of the different parts of the end walls must increase. The local acceleration and diffusion of the flow will also increase, making flow separation more likely or adding to the severity of any separation that has already occurred.
Three-dimensional shaping of vanes in gas turbine engines is a well-known technique, used to improve aerodynamic efficiency and suppress end wall flow separation. Examples of such shaping are the application of lean (often “compound lean”), sweep and dihedral. However, in the case of the transition duct described here, the strut will typically be a major load-bearing part of the gas turbine engine and the loads must be carried in a largely radial manner through it, so it is not possible to apply any significant three-dimensional shaping to such components.
Boundary layer bleed, from the strut and/or the end walls, is another known means of preventing separation in strongly diffusing flows. However, this is rarely if ever applied to practical gas turbine engines, because usually the benefit in aerodynamic efficiency will be lost due to the cost and weight of the bleed system. In addition the action of bleeding off the flow and either dumping it overboard or re-introducing it back into the gas flow in some other part of the engine will typically incur as much extra loss elsewhere as was gained in the duct.
Typically this arrangement will be found aerodynamically connecting two compressors in a multi-shaft gas turbine, the duct and compressors being arranged axisymmetrically around the centre-line of the gas turbine.
Typically the strut, and the fairing around it, will be aligned substantially radially. They may be leant in an axial sense but they will not usually be leant tangentially.
Typically in such an arrangement the first compressor will be at a higher radius than the second and rotating more slowly than it. Thus this transition duct will typically have a reducing radius through it.
In
Referring to
Near the leading edge of the fairing (perhaps slightly upstream of it) this increases the local (convex) radius of curvature of the end wall (as viewed in the circumferential direction). This locally lowers the static pressure and raises the free stream velocity. Referring to
In the rear part of the passage the perturbation 38 has the opposite arrangement to the perturbation 36. Its highest point (i.e. the point of maximum radius from the engine centreline) is at the camber line 40, and it therefore defines a “blister” in the end wall. Away from the camber line, the amplitude of the perturbation reduces steadily until the end wall radius (from the engine centreline) is the same as that of the axisymmetric annulus. This occurs at the position indicated by the notional line 39, which defines the circumferential extent of the perturbation. The amplitude of the perturbation also reduces in an axially downstream direction from its maximum, to blend into the axisymmetric annulus at the appropriate point on the notional line 39.
This increases the (concave) radius of curvature (as viewed in the circumferential direction) of the end wall adjacent to the fairing over most of the rear part of the passage, thus generally reducing the diffusion of the flow in this region. Downstream of the trailing edge, the perturbed annulus line is faired back into the axisymmetric annulus 42. Locally the (concave) radius of curvature is increased thus increasing the diffusion.
The perturbations will have a circumferential extent, on each side of the fairing, typically about 50% of the fairing pitch at each location. The range of useful values will lie between 5% and 100% of the pitch. The circumferential extent of a perturbation is defined as described in the discussion of
In the case where the fairings are uniformly spaced circumferentially and all have to have the same end wall profiling, then the perturbations will be symmetrical about the fairing camber lines and also about the mid-pitch lines. Thus the maximum circumferential extent could only be 50% of pitch in this case.
However, it may be the case that the fairing arrangement is not periodically uniform. It might happen, for example, that only every alternate fairing has the profiling applied. In this case the perturbation around one fairing could extend beyond the mid-pitch position, so that its circumferential extent would be greater than 50%, and it may extend as far as the next fairing, in which case its circumferential extent would be 100%.
The perturbations at different axial locations may have different maximum amplitudes. Typically the maximum amplitude will be 7% of the chord, but may lie in the range 2% to 15% of chord depending on the details of the flow conditions. (Higher speed flows require smaller amplitudes to achieve the same aerodynamic effects as lower speed flows).
The effect of these perturbations is that the static field on the hub end wall is more uniform and the corner separation is reduced (seen in
A smooth end wall shape is obtained by applying a spline in the streamwise direction through circumferentially corresponding points at these axial locations, to blend the perturbations smoothly into the axisymmetric end wall shape so as to present a smooth surface to the gas flow.
As noted already, the presence of a fairing in an annular duct changes the pressure field on the duct wall. Around the upstream part of the fairing the flow is accelerated and around the downstream part the flow is diffused. This extra diffusion on the duct wall can cause the boundary layer to separate close to the strut surface. By locally altering the area of the duct close to the fairing surface the effect of this acceleration and diffusion can be reduced.
In regions where the fairing is accelerating the flow the end walls must be opened out. Increasing the passage area would, on its own, act to decelerate the flow.
Where the fairing is decelerating the flow the end walls must be contracted. Decreasing the passage area in this way would, on its own, act to accelerate the flow.
Careful design of the area ruling should enable the flow near the fairing to experience the same diffusion (from inlet to exit) that the mid-passage region experiences. This embodiment is illustrated in
To minimise this pressure variation a second embodiment of the invention is proposed, in which the end wall profiling is as shown in
Downstream of this there will be another perturbation 94 such that the radius of the end wall with respect to the engine centreline is decreased at the intersection with the camber line. This will locally increase the flow area adjacent to the fairing, lowering flow velocities and raising the static pressure. This will compensate for the decrease in static pressure due to the blockage of the fairing in the flow. Typically the maximum amplitude 96 of the perturbation will be axially located in the plane of maximum vane thickness. The chord-wise extents and amplitudes of the perturbations will typically lie within the same ranges as before.
As in the first embodiment, a smooth shape is obtained for the end wall by applying a spline fit in the streamwise direction through circumferentially corresponding points at different axial locations, to blend the perturbations smoothly into the axisymmetric end wall shape.
The end wall profiling is defined by perturbations at, at least, two axial locations.
The end wall profiling may be applied to either (radially inner or radially outer) end wall of the transition duct. Typically for a transition duct with reducing radius it will be most effective if applied to the hub end wall.
In practice the optimum design will incorporate a combination of controlling local end wall curvature and non axisymmetric end wall area ruling.
To achieve the required change in curvature the annulus must locally be raised or lowered, which will alter the flow area. Conversely, the area ruling cannot be implemented without changing the local surface curvature.
Ultimately the designer must finalise the choice of perturbation amplitudes and locations to minimise the effect of the presence of the fairing on the hub end wall static pressure distribution.
An optimum aerodynamic design for the annulus wall may be obtained by the designing the duct without a fairing present to achieve maximum diffusion along the annulus wall while avoiding (2-D) boundary layer separation. The fairing is then replaced and non axisymmetric end wall profiling applied to restore the end wall static pressure field to be as close as possible to what it was in the absence of the fairing.
Where the duct wall static pressure field is made more uniform, the circumferential variation in static pressure experienced by upstream and/or downstream blade rows will also be reduced. This may be of benefit in reducing the aero-mechanical forcing on these blade rows and improve the component lives by reducing the unsteady stresses induced in them.
It may be the case that the fairings are not arranged uniformly in the circumferential direction. In this case the dimensions of the perturbations may be based on the chord and pitch local to each fairing.
Where the interaction of the static pressure field of the fairing with adjacent blade rows is a major issue, i.e. the aero-mechanical forcing significantly reduces these component lives, then it is a known solution to adopt an arrangement of “Bragg struts”. In this case small vanes or fairings, sometimes in a helical spiral arrangement, are added between the larger fairings around the struts. In this case, non axisymmetric end wall profiling may be applied to the larger and the smaller fairings but in each case the perturbations will be based on the chord and pitch local to each.
| Number | Date | Country | Kind |
|---|---|---|---|
| 0624294.5 | Dec 2006 | GB | national |
