3.1. Primary ferrite grain inner structure analysis

In order to quantify possible links between the parent and child orientations, and their correlation with the lath morphology, it is necessary first to estimate the primary phase orientation from where the laths have grown. The remaining α-phase is then utilized to recover the primary grain geometry using, for instance, a crystallographic orientation-based inpainting process (Mollens et al., 2022). The recovered orientation map displays millimetre-sized polygonal grains resulting from the first phase transformation (i.e. liquid to solid). Hence, at each pixel coordinate x of the map, the austenite orientation g_γ(x) can be connected to its parent phase orientation g_α(x) [i.e. the misorientation is measured].

Commonly mentioned orientation relationships (ORs) in b.c.c. ↔ f.c.c. phase transformations in steels include Bain (B) (Bain & Dunkirk, 1924), Kurdjumov–Sachs (KS) (Kurdjumow & Sachs, 1930), Nishiyama–Wassermann (NW) (Nishiyama, 1934; Wassermann, 1935), Pitsch (P) (Pitsch, 1959) and Greninger–Trojano (GT) (Greninger & Troiano, 1949). Experimentally, measured ORs are more than 9° away from B, and most of the time are related to either KS or NW (Verbeken et al., 2009). These two ORs actually result from experimental observations using X-ray diffraction in the f.c.c. → b.c.c. case. P and GT ORs were identified using TEM approximately 20 years later. Some authors mentioned that ORs in b.c.c. → f.c.c. transformations were far less widely discussed, even though some relatively recent studies on meteorites (Bunge et al., 2003; He et al., 2006; Nolze, 2008; Yang et al., 2010) and various metallic alloys (Stanford & Bate, 2005; Fukino et al., 2011; Rao et al., 2016; De Jeer et al., 2017; Haghdadi et al., 2020; Cai et al., 2021) have appeared.

The ORs are defined by the set of parallel planes and directions given in Table 2. The misorientation is then the rotation that maps the crystal directions of the child phase to their parallel relatives in the parent frame. The misorientation obeying and is such that and . The axis–angle representation of the mis­orientation associated with the parallelism conditions is given in Table 2. We note that a definition of the orientation relationship based on a misorientation only is somewhat reductive since a non-zero strain is needed to accommodate the crystal atomic spacing.

Table 2 Orientation relationships commonly referenced between f.c.c. and b.c.c. lattices Both parallelism conditions and axis–angle pairs are given. The latter correspond to the pair having the smallest rotation angle of all the symmetrically equivalent operators. OR Plane Direction Angle/axis pair Bain (001)γ || (001)α [110]γ || [100]α 45.0° / [001] KS (111)γ || (110)α || 42.9° / [0.97 0.18 0.18] NW (111)γ || (110)α || [001]α 46.0° / [0.20 0.98 0.08] || P (110)γ || (111)α [001]γ || 45.0° / [0.08 0.20 0.98] || GT (111)γ || (110)α || 44.2° / [0.97 0.19 0.13]

Data obtained from a single ferritic grain are shown in Fig. 2. Fig. 2(a) displays austenite orientations (colored using the standard inverse pole figure code for cubic symmetry) grouped in lath packets with uniform or smoothly varying crystal orientations. These packets are also characterized by a preferred morphology. The comparison with all symmetrically equivalent child orientations (i.e. variants) predicted for KS [Fig. 2(b)] and the distance distributions with some reference ORs in Fig. 2(c) highlight the scatter of crystal orientations.

Figure 2 Austenite orientation in a single ferritic grain. (a) An IPF-Z map. (b) A [111] pole figure in the ferrite crystallographic frame displaying the γ-orientation spread in a single ferritic grain. The orientations are colored using the IPF-Z color coding convention to relate to (a). The exact KS variants are plotted in green to emphasize the continuity of the observed OR. Only 1% of measured points of the data present on the spatial map are shown in the pole figure. (c) Histograms of rotational angle to the closest variant for four classical ORs in f.c.c. ↔ b.c.c. systems, showing that there is no single representative OR in the CF8M alloy.

The most widely discussed cases of orientation spread around common ORs involve martensitic steels (Nolze & Geist, 2004; Cayron et al., 2010; Yardley & Payton, 2014; De Jeer et al., 2017; Hayashi et al., 2020). Their origin is still under discussion (Bhadeshia, 2011; Cayron et al., 2011; Hayashi et al., 2020) and displacive mechanisms are not expected in the present case because of the very low cooling rate after casting and the long solutionizing process. Instead, significant freedom is given to diffusion mechanisms during manufacture of the ingot. The rotational distance to distinct ORs is then presumably associated with an accomodation to minimize the interfacial energy during precipitate growth following an edge-to-edge sympathetic nucleation process (Ameyama et al., 1992).

The microstructure of interest presents visible characteristics that differ from diffusion-controlled microstructures studied in the literature. For instance, α–γ stainless steels studied by Maki et al. (1986), Ameyama et al. (1992) and Haghdadi et al. (2018, 2020) displayed a high density of both intragranular and boundary nucleated precipitates. A fundamental difference with the CF8M alloy is the resulting spatial distribution of child nuclei. The reference materials had a large amount of retained parent phase (around 50%) and a large quantity of child variants are present in each parent grain. The characterized CF8M microstructure appears much closer to the α–γ microstructure of brass characterized by Stanford & Bate (2005) where the forming conditions had promoted the growth of large millimetre-sized parent grains inside which a few child variant clusters were present. There is also a strong similarity in the variety of morphologies, from globular to sharper-shaped laths, with this Cu–Zn alloy that is missing in the previously mentioned steels. Additionally, all lath clusters seem to have grown from a small number of nuclei forming at former ferritic grain boundaries. This is to be contrasted with the results of Ameyama et al. (1992) who observed a dense array of child nuclei at parent grain boundaries.

Locally measured ORs in a single cluster may vary over a long characteristic length along with morphological changes. This morphological `gradient' is rather linked to a transition between OR variants than to statistical dispersion with respect to a fixed OR. A specific post-processing procedure of orientations was developed to reveal this aspect. Instead of considering the crystallographic distance over the symmetry group, we chose to rely on an image-processing-based interpretation of the distribution of OR variants. Stereographic projections normal to the principal cubic directions of these variants show a nearly circular pattern [Fig. 3(a)] from which the approximate expression `Bain circles' originates. Knowing the Bain circle (i.e. Bain variant) on which lies an experimental γ-orientation , according to its parent α-orientation , one may parameterize the angular position θ of (i.e. the associated misorientation) on a circle centered about the Bain variant [Fig. 3(a)]. This step was achieved by projecting the quaternion vector representing m onto the plane normal to the Bain variant and computing its polar angle with respect to an arbitrary direction. Hence, knowing allows one to reduce the description of to two parameters, namely the Bain variant and θ. The angle θ computed for austenitic orientations shown in the ferritic grain of Fig. 2(a) is plotted on a [100] spherical projection in Fig. 3(b).

Figure 3 Parameterization of γ-orientations according to their distribution about their corresponding Bain variant in a single primary ferrite grain. (a) A schematic representation of θ parameterization for a single Bain variant. The angle is taken between the orthogonal projection g and an orthogonal vector taken among three basis vectors of the ferrite grain crystallographic frame. Thus, only the θ variation is indicative of a distribution of orientations around Bain groups. (b) A [100] pole figure of γ-orientations in the α-grain reference frame. Orientations are colored according to the value of θ.

Interestingly, the `circles' observed from the present EBSD analysis and shown in Fig. 3(b) display a quasi-continuous distribution about each Bain variant. As shown in Fig. 4(a), many different laths are encountered around each Bain variant, at different (but close) specific distances to the Bain OR. The θ parameterization depicted in Fig. 4(b) reveals an important feature of the γ-orientation distribution. In the ferrite reference frame, the continuous orientation around the Bain circles correlates well with their morphology as observed on spatial maps. In some Bain groups (delimited by black lines on the spatial maps) the θ range is close to 180°, which reflects a transition from a near-horizontal lath shape to a near-vertical lath shape on the 2D section given by the EBSD maps. A 180° θ range also means that multiple ORs are crossed around a Bain group. In other words, a single spatial Bain group may contain multiple variants of a single OR, smoothly connected through progressive orientation changes on the scale of the map. The θ parameterization is only relevant for orientations lying on (or close to) the Bain circles, considering a sensible tolerance regarding the EBSD measurement accuracy. In this example, a small number of regions are far from all Bain variants [distance greater than 15° in Fig. 4(a)]. They result from the phase transformation mechanisms during cooling, and more specifically from phenomena occurring at primary ferritic grain boundaries that are detailed in the following section.

Figure 4 Illustration of the variant crossing phenomenon. (a) The crystallographic distance (in degrees) to the Bain OR. Frequently reported KS and NW ORs are at 11.07° and 9.74°, respectively. The map exhibits a much broader scatter. The black boundaries delineate different Bain groups. (b) A spatial map colored according to the value of θ. This panel shows that the orientation may cross multiple variants of a given OR in a single Bain group while preserving a spatial continuity at this scale (i.e. θ varies much more than 7.54°, which is the smallest Δθ separating two variants in the cited ORs).

3.2. Primary ferrite grain boundary neighborhood analysis

The spatial orientation maps allow one to propose a schematization of austenite nucleation and growth steps. The surfaces describing primary ferritic grain boundaries are first replaced by a `thickened' austenitic surface with the same primitive shape. The nucleation giving rise to these films starts at grain junctions. This observation is supported by the EBSD maps, on which austenite nuclei seem to appear nearly simultaneously at multiple triple points until they meet on the former boundary as a result of the growth kinetics. This observation means that the austenite film around a single ferritic grain is not monocrystalline. Additionally, the child orientation at a junction presumably results from a variant selection mechanism with a single grain. Considering that typically four randomly oriented grains meet at a junction in the bulk, a child orientation cannot accurately follow an OR with all of them. The orientation maps reveal that the child nuclei orientations are linked to a single parent grain only and that these orientations are kept by laths growing inside the grains, even though no OR is followed with most of them.

Since lath packets grow from former ferritic grain boundaries, the latter are classified into two categories, almost-coherent boundaries (i.e. low-angle grain boundaries) and incoherent boundaries where the disorientation is high (more than 10°). In almost-coherent boundaries, Bain groups from both sides of the boundary are close or may cross each other. Consequently, there is a good agreement between orientations in both grains hinting that, at the present scale, the laths are crossing the original ferrite grain boundary. Fig. 5 shows such an example. With a disorientation angle of 6.86° between the two ferritic grains, the morphology and crystal orientations are preserved on both sides of the boundary. The pole figures in Figs. 5(b) and 5(c) illustrate the small gap between the two sides given the accuracy of the orientation measurements. More importantly, they demonstrate that, in each grain, austenite orientations lie on the Bain circle given by its ferrite orientation, meaning that a slight rotation occurs in the vicinity of the boundary to comply with this observation.

Figure 5 Orientation and morphology for an almost-coherent grain boundary. (a) An IPF-Z map. The primary α-grain boundary is plotted in red. The morphology and orientation of austenite appear similar on either side of the boundary. (b) A [100] pole figure of the simulated KS and B variants given the primary grain orientations. The red points correspond to the left-hand grain and green to the right-hand grain. (c) A [100] pole figure showing actual γ-orientations measured in both grains using the previous color coding.

The second type of boundary, referred to as incoherent, corresponds to a large disorientation angle boundary as illustrated in Fig. 6(a). Since the child phase predominantly starts growing from these boundaries, severe accommodation should occur to grow on the side where its orientation does not lie on the corresponding Bain group. Yet the crystallographic orientation is preserved across such boundaries at the cost of a loss of coherence with the parent structure. Fig. 6(b) corresponds to the predicted [100] directions according to the Bain and KS ORs for the two parent grains. Fig. 6(c) reveals the actually measured [100] directions, which are far from the predicted ones for the top grain [red points in Figs. 6(b) and 6(c)] and more coherent with the Bain zone predicted for the bottom grain. However, in the incoherent grain, austenite takes the shape of laths with a different morphological orientation, possibly adapted to the top grain orientation.

Figure 6 Orientation and morphology for an incoherent boundary. The dis­orientation between the two primary α-grains is 41.1°. (a) An IPF-Z map. The primary α-grain boundary is plotted in red. The crystallographic orientation is preserved on both sides of the boundary. In the incoherent grain, a lath shape is also preserved with a different morphological orientation. (b) A [100] pole figure of the simulated KS and B variants given the primary α-grain orientations. The red points correspond to the bottom grain and green to the top grain. (c) A [100] pole figure showing the preservation of γ-phase orientations in the two parent grains even though it is far from a stable configuration given by standard ORs.

4.1. Method

The determination of the plane of lath-shaped austenitic crystals (i.e. the habit plane) is of great interest to study the local mechanical behavior. Lath clusters have near-uniform or smoothly varying crystallography and morphology. Assuming that these orientations result from a unique mechanism linked to preferential growth directions, there must exist a limited number of configurations to which a relevant homogenized mechanical behavior may be attributed. However, if austenite lath packets are large, their boundaries locally display large fluctuations. This property is likely to be inherited from the long solutionizing heat treatment and prevents the use of the standard habit plane determination methods associated with TEM measurements (Ameyama et al., 1992; Okamoto & Oka, 1992; Zhang et al., 1995; Luo & Liu, 2006), requiring an accurate and unbiased definition of phase boundaries. Therefore, one may only rely on average measurements to determine the lath extension.

The lath plane orientation in three dimensions is fully described by the orientation of its normal vector. However, as only cross sections with the observation plane are accessible, they cannot provide the 3D lath orientation. Fig. 7 illustrates the ill-posedness of a direct evaluation of the lath plane normal. However, assuming a unique link between the orientation of the lath morphology and crystallography renders the problem statistically well-posed. As shown in Fig. 7, two different cross sections offer enough information to infer the lath plane normal. Thus, exploiting the sampling of different lath orientations within one observation plane, and with the assumption of a deterministic relationship between morphology and crystallography, one can identify this relation. This method can be compared to that proposed by Rohrer et al. (2004) but, in the present case, the average orientation of a set of discrete interfaces is computed instead of a distribution. Let us emphasize that defining the average orientation based on raw pixel data avoids the difficult task of having to tune regularization parameters when extracting boundaries from EBSD maps.

Figure 7 Illustration of the geometric configuration of laths. (a) An illustration of a fixed configuration. The lath plane (in red) is fully described by its normal (solid red arrow) or by two non-collinear vectors in the plane (dashed blue arrows). (b) The cross section by two observation planes (shaded in gray) gives laths extending along the blue directions (intersection of lath plane and observation plane). Any cross section of the lath plane has a principal direction in two dimensions that is a basis vector of the lath plane in three dimensions. At least two (non parallel) cross sections are required for full determination of the 3D lath normal.

The main difficulty of the above identification results from the crystal symmetries and the possible OR variant selection. The proposed methodology is to postulate one possible OR scenario, obtain the most likely lath orientation direction (assigning the closest child variant based on the same variant for each lath packet) and finally check for consistency with the initial postulated OR. Repeating the same approach for all proposed ORs gives a figure of merit for each of them. Hence, an EBSD map can be processed hierarchically to compute (i) the primary ferritic grains, (ii) the child variant clusters inside each primary grain and (iii) the mean morphological orientation with respect to the parent crystallographic 3D frame. However, the mean orientation computation suffers from all the experimental inaccuracies of EBSD maps (definition of phase boundaries according to the imaging technique, irrespective of their natural fluctuations). Thus, a large statistical sampling is needed to retrieve the lath normal for each cluster. The pseudo-code for this evaluation of each OR from the measured orientation map is given in the following algorithm.

The chosen OR defines the subsets of the orientation map in which the morphological properties are estimated. Each child orientation is attributed to the closest predicted ones considering the local parent orientation and the OR. The mean morphological orientation of each resulting cluster is computed using the structure tensor , where is the mean pixelwise normal vector at the boundary. Its minor eigenvector corresponds to the projection of the mean lath normal in the observation plane, while its major eigenvector relates to the direction of extension of the laths in the packet. Likewise, the `best' perpendicular vector to a set of vectors is conventionally defined as the minor eigenvector of .

4.2. Application

The above construction was tested for all `classical' ORs (i.e. B, KS, NW, P and GT). The Pitsch OR appears to provide the most consistent agreement between predicted austenite lath morphology orientation and crystallography. In order to take advantage of a significant statistical distribution, the entire set of acquired maps (140 mm²) was used to compute the normals of the 12 child variants predicted by the OR. The different steps are illustrated in Fig. 8 on the microstructure shown in Figs. 2 and 4. Fig. 8(a) shows variant clustering of austenite orientations performed in every ferritic grain according to the Pitsch OR (12 variants). The resulting clusters qualitatively encompass a uniform morphological orientation.

Figure 8 Illustration of the different steps involved in computing the lath normal for the Pitsch OR. (a) Austenite orientations colored according to their affiliations to the 12 variants given by the Pitsch OR. (b) A [111] pole figure revealing the resulting sampling of the continuous orientation clusters. (c) Principal directions computed from pixels belonging to the 12th cluster. (d) A spherical projection in the parent frame of principal directions for the 12th variant computed in all processed ferritic grains (blue points) and the resulting `mean' plane trace (red line).

The [111] pole figure [Fig. 8(b)] reveals how the sampling of child orientations given by the associated variant breaks the continuous distribution (introduced in Fig. 3) into discrete clusters. Once the sampling has been performed, each variant cluster is processed to compute the principal axis of the laths corresponding to the cross section between the lath plane and the observation plane [Fig. 8(c)]. For all processed ferritic grains, this direction is stored as a crystallographic orientation in their frame. These directions should all lie in a plane but some scatter is observed. The laths are not strictly planar and some clusters are not well determined. These differences introduce statistical uncertainties into the principal direction computation. To take into account such errors, the lath plane normal is computed as the `best' (as defined above) perpendicular vector to the set of computed principal directions. As an example, the set of directions and the resulting lath normal for the 12th cluster are shown in Fig. 8(d).

The average lath plane pole in the α frame is given by the direction {−0.996 1.275 2.366}_α at about 1° from the rational plane and 4.1° from the invariant direction given by the Pitsch OR. The proximity with the latter direction is illustrated in Fig. 9 by plotting the differences with the computed plane directions and variants of the direction given by the Pitsch OR. The standard deviation of the 12 computed poles is 4.45°. This value seems reasonable, considering the limited accuracy of trace-analysis-based techniques on more suitable cases [e.g. two-plane analysis on sharply defined twin variants yields an accuracy of around 2° at best; Hoekstra (1980)].

Figure 9 A comparison between Pitsch invariant direction and computed lath normals in the parent frame. (a) An element-wise variant comparison. The computed directions are plotted as blue points and equivalent directions as red circles. The angular error between the two directions is indicated for each variant in degrees. (b) A comparison between the equivalent average pole and direction. The 12 computed poles are represented as black points. The average distance between measured and computed poles is 4.1°.