Kinetics of Martensite/Austenite Decomposition during Tempering of Ultrafine Nano-Bainitic Steels

In this study, the decomposition of a martensite/austenite (M/A) microconstituent in bainitic steels was analyzed using differential scanning calorimetry (DSC) data in conjunction with Kissinger’s and Johnson–Mehl–Avrami–Kolmogorov (JMAK)’s formulas. In bainitic steel subjected to austempering heat treatment, the presence of an M/A microstructure adversely affects the mechanical properties. According to the kinetic equations derived, it is observed that after tempering the sample at 600 °C for 4000 s, the generation of each phase reaches its maximum. The SEM images taken before and after tempering reveal extensive decomposition of the M/A constituent in the microstructure. The proportion of the M/A microstructure decreased significantly from about 10% before tempering to less than 1% after. Additionally, the content of residual austenite also reduced nearly to zero. These observations are consistent with the predictions of the kinetic equations.


Introduction
Super-bainite steel, a nanostructured bainite variant known for its exceptional strength and durability, has recently drawn the attention of the scientific community.It was Professor Bhadeshia and team at the University of Cambridge who first introduced this kind of steel.In order to obtain nano-bainite, bainitic steels need to be heated at low temperatures for several hours or even days [1,2].Distinctively, unlike other high-strength steels [3,4], ultrafine nano-bainite steels can be fabricated without the need for costly alloying elements, swift heat treatments, or complex machining [5,6], thereby making them a favored option in numerous mechanical industries [7].However, the bainite phase transition can be accelerated by optimizing the alloying composition, which includes adding Co and Al elements [8,9].Depending on the austempering heat treatment used, the untransformed austenite in the bainite transformation structure can be categorized as thin, powdery, or massive [10].Some of the coarse retained austenite blocks, due to its instability [11,12], transforms into a martensite and austenite (M/A) composition during the cooling process following austempering heat treatment.The M/A island comprises martensite and some residual untransformed austenite interspersed among the bainitic structures [13,14].The M/A microstructure, characterized by its brittleness, can induce high-stress concentrations under severe deformation, leading to cracking and debonding of the steel [15].Furthermore, during impact fracture, the M/A boundary is often the site of crack initiation, which reduces the impact toughness of the material [16].On the other hand, the M/A decomposition greatly improves the steel's ductility and toughness [17][18][19].Therefore, research on M/A decomposition is of great scientific interest.
Bulky M/A can decompose more quickly with the right heat treatment.According to recent research by Huda et al. [20], a significant amount of coarse M/A can be broken down by tempering it for 10 min at 300 • C. At higher temperatures, M/A tends to break down into ferrite and carbide.Significant decomposition of residual austenite occurs within the temperature range of 550 to 600 • C [21].Within the tempering temperature spectrum of 200-600 • C, Santajuana et al. explored the thermal stability of nanostructured bainite in two distinct varieties of high-carbon steels.Their research highlighted that, particularly when tempered at 550 to 600 • C, both austenitic blocks and bainitic ferrite (BF) undergo transformation into ferrite and carbide precipitates, resulting in pronounced microstructural alterations [21].Previously, researchers have discovered that the activation energy of austenite and martensite decomposition is 134.8 and 71.6 kJ/mol, respectively.Nevertheless, most researchers are currently focusing on investigating how the heat treatment procedure affects M/A decomposition, frequently ignoring the kinetics of its M/A decomposition during the heat treatment procedure.The kinetic equation is vital to our deep understanding of the of the decomposition of the M/A, according to a number of studies [22][23][24][25][26]. Therefore, investigating the kinetic equation of M/A decomposition in ultra-fine nano-bainite steel is crucial for its future application and development.Smoljan et al. [27] conducted mathematical modeling and computer simulations to analyze the isothermal decomposition of austenite in steel, developing kinetic equations that can be used to predict the microstructural composition of hypoeutectoid steels.Differential scanning calorimetry (DSC) has been the preferred technique for measuring kinetic data by numerous researchers because of its speed, dependability, and ease of use.One major benefit is that it requires a small sample size, which saves a lot of time [28][29][30][31][32][33].In this paper, the kinetic equations are also constructed from DSC data.
This paper systematically investigates the kinetic equations for the M/A in bainitic steels during the tempering process to enhance our understanding of the M/A.A kinetic equation capable of describing the decomposition of M/A was established using data from differential scanning calorimetry (DSC), combined with Kissinger's formula and the Johnson-Mehl-Avrami-Kolmogorov (JMAK) formula.Additionally, the microstructure of bainitic steel was observed using scanning electron microscopy (SEM) and transmission electron microscopy (TEM) before and after the decomposition of M/A, and the mechanical properties were concurrently tested.

Experimental Materials and Procedures
Table 1 displays the chemical composition of the bainitic steel that was utilized in this investigation.Based on previous studies [34], it is known that the Ms of the experimental steel is 190 ± 5 • C and 0.05 • C/s is the critical cooling rate for martensitic transformation.In this work, two specimens isothermally heat-treated at various temperatures were prepared, and the differential scanning calorimetry (DSC) curves of their various heating speeds were then measured using a simultaneous thermal analyzer, respectively, to assure the validity of the data and remove the chance factor.A NETZSCH DIL 402C dilatometer from NETZSCH, Selb, Germany, was then used to measure the cooling rate expansion curves for a cooling rate of 0.005 • C/s and the JMatPro V13.0 [35] simulated precipitate generation versus temperature.The kinetic equations of the precipitates were obtained using Kissinger's and JMAK's equations and the DSC data.The specimens were processed using a NETZSCH DIL 402C dilatometer.The samples were heated to a temperature of 920 • C and then held for 30 min for austempering.Subsequently, they were cooled temperatures of 300 • C and 220 • C at a rate of 20 • C/min for austempering heat treatment, and held for 5 h and 12 h respectively.Finally, after the completion of the austempering heat treatment, they were cooled to room temperature.The schematic diagram of the austempering heat treatment process is shown in Figure 1.
completion of the austempering heat treatment, they were cooled to room temperature.The schematic diagram of the austempering heat treatment process is shown in Figure 1.The microhardness of the material was measured after austempering treatment at 300 °C/5 h and 220 °C/12 h with a load of 1 kg and a holding time of 10 s.Ten points were randomly selected for microhardness measurements for each specimen, and a certain distance was maintained between the 10 points to ensure that they would not affect each other.
Afterwards, the microstructure of the specimens was observed using a scanning electron microscope (SEM), model SUPRA-4, Carl Zeiss, Jena, Germany, and a transmission electron microscope (TEM), model FEI Talos F200, manufactured by FEI Company, Hillsboro, OR, USA.And for TEM experiments, 3 mm-diameter flakes were ground to ~30 µm thickness and then electropolished to perforation on a dual jet device at 27 V, and the perforated foils were observed by transmission electron microscopy at an operating voltage of 200 kV.After obtaining the TEM images of the microstructure, the Powder Diffraction Files (PDF) published by the International Centre for Diffraction Data were used for the phase identification of the microstructure in the specimens.Additionally, Image-Pro Plus 6.0 software was utilized to quantify the morphological distribution of each phase within the microstructure.
Based on the kinetic equation calculations for the specimens' precipitates, it was determined that the generation of each phase reached a maximum after 4000 s at 600 °C.Consequently, the two specimens were tempered at this temperature for 4000 s.The microhardness of the tempered samples was tested using the same measurement method as previously employed.The volume fraction of residual austenite is measured using mechanically polished specimens with an X-ray diffractometer (X-350A) manufactured by Handan Aoste Stress Technology Co., Ltd., Handan, China.Subsequently, at least ten microphotographs of the microstructure were taken before and after tempering.The morphology and distribution ratio of each phase were quantitatively analyzed using Image Pro Plus 6.0 software.

Kinetic Equation of M/A Decomposition
The derived kinetic equation describes the overall tempering process, encompassing not only the decomposition of M/A but also the transformation of retained austenite (RA) The microhardness of the material was measured after austempering treatment at 300 • C/5 h and 220 • C/12 h with a load of 1 kg and a holding time of 10 s.Ten points were randomly selected for microhardness measurements for each specimen, and a certain distance was maintained between the 10 points to ensure that they would not affect each other.
Afterwards, the microstructure of the specimens was observed using a scanning electron microscope (SEM), model SUPRA-4, Carl Zeiss, Jena, Germany, and a transmission electron microscope (TEM), model FEI Talos F200, manufactured by FEI Company, Hillsboro, OR, USA.And for TEM experiments, 3 mm-diameter flakes were ground to ~30 µm thickness and then electropolished to perforation on a dual jet device at 27 V, and the perforated foils were observed by transmission electron microscopy at an operating voltage of 200 kV.After obtaining the TEM images of the microstructure, the Powder Diffraction Files (PDF) published by the International Centre for Diffraction Data were used for the phase identification of the microstructure in the specimens.Additionally, Image-Pro Plus 6.0 software was utilized to quantify the morphological distribution of each phase within the microstructure.
Based on the kinetic equation calculations for the specimens' precipitates, it was determined that the generation of each phase reached a maximum after 4000 s at 600 • C. Consequently, the two specimens were tempered at this temperature for 4000 s.The microhardness of the tempered samples was tested using the same measurement method as previously employed.The volume fraction of residual austenite is measured using mechanically polished specimens with an X-ray diffractometer (X-350A) manufactured by Handan Aoste Stress Technology Co., Ltd., Handan, China.Subsequently, at least ten microphotographs of the microstructure were taken before and after tempering.The morphology and distribution ratio of each phase were quantitatively analyzed using Image Pro Plus 6.0 software.

Kinetic Equation of M/A Decomposition
The derived kinetic equation describes the overall tempering process, encompassing not only the decomposition of M/A but also the transformation of retained austenite (RA) and the bainite matrix during tempering [21].Nevertheless, this kinetic equation still describes well the M/A decomposition [27,36].The kinetic equations for the austempering phase transition can be described using the JMAK equation as follows: where f is the fraction of new phase generation; k is the reaction rate constant; k 0 is the preexponential factor, a constant determined by the material and type of phase transition; t is the phase transition time; n is the Avrami exponent; R is the gas constant (8.314J/(mol•k)); T is the thermodynamic temperature; and E is the phase transition activation energy.
Taking the logarithm twice on both sides of Equation ( 1) results in: Substituting ( 2) into (3) simplifies to: The most widely used method to test the applicability of the JMAK model in nonisothermal DSC experiments is to use the Avrami plot, a linear dependance of lnln(1 − f ) as a function of 1/T.According to Equation ( 4), the slope of the Avrami plot can be expressed as: where A is the fraction untransformed.Thus, the rate of change in the untransformed fraction, A, is: Substitute ( 2) into ( 6) to obtain: A derivation of t on both sides is obtained: Let dT dt = C (C is the rate of temperature rise), so , substituting in (9) gives: Using (10), taking logarithms on both sides gives: The above equation is known as the Kissinger formula [37].
The slope and intercept of line (12) can be used to find E and k 0 , and by substituting the value of E into Equation ( 5), n can be calculated.
The DSC curves of the 300 • C/5 h specimens with different heating speeds are shown in Figure 2, from which the temperatures corresponding to the exothermic peaks at different heating speeds, T p , can be obtained.In Figure 2, both the temperature and area of the exothermic peak in the DSC curve increase with the increase in heating rate.The range of the exothermic peak is between 450 and 600 • C, and under a cooling rate of 0.005 • C/s, the expansion curve fluctuates slightly between 560 • C and 770 • C (Figure 2a).By simulating the test steel with JMatPro V13.0 software, the generation temperatures of various precipitates are shown in Figure 3b, and various precipitates begin to form around 600 • C. The exothermic peaks in the DSC curves and the fluctuations on dilatation curves, are attributed to the decomposition of M/A and RA at around 600 • C [38].In the Kissinger formula,ln C T 2 p is used as the linear function of 1  T p , and the DSC data of the sample treated at 300 • C are fitted, as shown in Figure 4a.The relationship between the amount of precipitate f and the temperature T is obtained by processing the exothermic peaks, and the slope (Figure 5) is obtained by fitting a straight line with ln ln ( 1 1− f ) as a function of 1  T .By inserting the attained value of E into the slope value (Equation ( 4)), one can derive the respective n values at varying heating rates.The kinetic parameters of the specimens were calculated and are statistically presented in Table 2.The kinetic equation for the 220 • C/12 h specimen is calculated in the same way as for the 300 • C/5 h specimen.Unlike the specimen that underwent austempering heat treatment at 300 • C, the specimen treated at 220 • C/12 h exhibited an additional exothermic peak between 280 • C and 350 • C (Figure 6).The 220 • C/12 h specimen had 13.4% residual austenite, and the tested steel's bainite transformation temperature was approximately 300 • C [39,40].Therefore, the exothermic peak at 300 • C may be due to the exothermic phenomenon caused by the transformation of residual austenite into bainite [41].Each parameter of the kinetic equation was derived from the DSC data (Table 2), and by substituting these parameters into Equations ( 1) and ( 2), the kinetic equations for the precipitates of the two specimens listed in Table 3 were obtained.))

Experimental Validation of the Proposed Kinetic Equation and Decomposition of M/A
Volume fraction transformed versus time can be determined using the kinetic equations displayed in Table 3, derived using parameters from Table 2. Since the two samples' exothermic peaks all lie close to 600 • C, this temperature was chosen as the specimens' tempering condition.Figure 7 shows the calculated relative volume fraction of precipitates with time at 600 • C. The figure reveals that the generation of each phase peaks after 4000 s at 600 • C.So according to the calculation, the two specimens were tempered at 600 • C for 4000 s.
tions displayed in Table 3, derived using parameters from Table 2. Since the two samples' exothermic peaks all lie close to 600 °C, this temperature was chosen as the specimens' tempering condition.Figure 7 shows the calculated relative volume fraction of precipitates with time at 600 °C.The figure reveals that the generation of each phase peaks after 4000 s at 600 °C.So according to the calculation, the two specimens were tempered at 600 °C for 4000 s.

Analysis of the Microstructure Prior to Tempering
Numerous lumpy, up-convex M/A microstructures were observed at the low magnification microphotographs (Figure 8a,c) [42].These microstructures were further examined using a transmission electron microscope to observe the 220 °C austempering heat-

Analysis of the Microstructure Prior to Tempering
Numerous lumpy, up-convex M/A microstructures were observed at the low magnification microphotographs (Figure 8a,c) [42].These microstructures were further examined using a transmission electron microscope to observe the 220 • C austempering heat-treated microstructure, as illustrated in Figure 9, which displays the bright-field and dark-field microphotographs of the M/A microstructure.The high-resolution picture of the block microstructure near the edge in Figure 10a makes it clear that there are two distinct microstructures.As seen in Figure 10c,e, the lattice fringes can be obtained by applying the Fourier and inverse Fourier transforms.It is possible to calculate the crystal plane spacing between the block microstructure edge and core microstructure.Through a comparison of the Powder Diffraction Files (PDF) cards' crystallographic spacing [43], it can be determined that the red rectangular box's core microstructure is a martensitic microstructure (103) crystal face (PDF card: 44-1293), while the yellow rectangular box's edge microstructure is an austenitic microstructure (222) crystal face (PDF card: 33-0397).Accordingly, the lumpy microstructure that is up-convex has an austenitic exterior and a martensitic core, which is typical of M/A [43].
Materials 2024, 17, x FOR PEER REVIEW 9 of 15 treated microstructure, as illustrated in Figure 9, which displays the bright-field and darkfield microphotographs of the M/A microstructure.The high-resolution picture of the block microstructure near the edge in Figure 10a makes it clear that there are two distinct microstructures.As seen in Figure 10c,e, the lattice fringes can be obtained by applying the Fourier and inverse Fourier transforms.It is possible to calculate the crystal plane spacing between the block microstructure edge and core microstructure.Through a comparison of the Powder Diffraction Files (PDF) cards' crystallographic spacing [43], it can be determined that the red rectangular box's core microstructure is a martensitic microstructure (103) crystal face (PDF card: 44-1293), while the yellow rectangular box's edge microstructure is an austenitic microstructure (222) crystal face (PDF card: 33-0397).Accordingly, the lumpy microstructure that is up-convex has an austenitic exterior and a martensitic core, which is typical of M/A [43].
During the isothermal transformation of bainite, the transformation generally halts prematurely after a certain amount of bainite has formed, before reaching equilibrium [44,45].This phenomenon, known as the incomplete transformation phenomenon (ICT) [46], results in a portion of untransformed austenite remaining at the end of the bainite transformation.This untransformed austenite is morphologically classified as thin films and lumps [47].After the austempering heat treatment is finished, the thin film of austenite is typically more stable of the two forms and does not go through any additional phase changes when cooling to room temperature [48].Thin-film austenite adds to the material's toughness, and this austenite stabilization permits the austenite structure to be preserved at room temperature.In contrast, block austenite will experience a martensitic phase transformation in the core due to the difference in elemental content between the core and surface layers, while the surface layer will maintain its austenitic microstructure when the material cools to room temperature following the austempering heat treatment [49,50].During the isothermal transformation of bainite, the transformation generally halts prematurely after a certain amount of bainite has formed, before reaching equilibrium [44,45].This phenomenon, known as the incomplete transformation phenomenon (ICT) [46], results in a portion of untransformed austenite remaining at the end of the bainite transformation.This untransformed austenite is morphologically classified as thin films and lumps [47].After the austempering heat treatment is finished, the thin film of austenite is typically more stable of the two forms and does not go through any additional phase changes when cooling to room temperature [48].Thin-film austenite adds to the material's toughness, and this austenite stabilization permits the austenite structure to be preserved at room temperature.In contrast, block austenite will experience a martensitic phase transformation in the core due to the difference in elemental content between the core and surface layers, while the surface layer will maintain its austenitic microstructure when the material cools to room temperature following the austempering heat treatment [49,50].

Impact of Tempering on the Microstructure
The SEM images of the samples after five hours of post-tempering at 600 °C are shown in Figure 11.The microstructure in the circle in Figure 11a shows the change in the morphology of the M/A microstructure after tempering, and it was found that a large amount of M/A decomposed.Furthermore, Figure 11b shows that the M/A microstructure has transformed by more than 50%; the red circle clearly shows how the blocky M/A has been decomposing gradually.The 220 °C/12 h sample and the 300 °C/5 h sample exhibit

Impact of Tempering on the Microstructure
The SEM images of the samples after five hours of post-tempering at 600 • C are shown in Figure 11.The microstructure in the circle in Figure 11a shows the change in the morphology of the M/A microstructure after tempering, and it was found that a large amount of M/A decomposed.Furthermore, Figure 11b shows that the M/A microstructure has transformed by more than 50%; the red circle clearly shows how the blocky M/A has been decomposing gradually.The 220 • C/12 h sample and the 300 • C/5 h sample exhibit the same behavior.A significant amount of cementite will precipitate during the process of tempering, as the martensite in the M/A decomposes in accordance with the martensitic tempering transformation mechanism [51].Because of the high tempering temperature, the slower residual austenite decomposition also breaks down smoothly into a mixture of ferrite and cementite [52].A review of Figure 11a,c reveals that most of the bulk M/A has decomposed.In Figure 11d, it is observed that the precipitated carbide grows as a one-dimensional nucleus in the form of a long rod.This observation also correlates with an Avrami exponent n, which is found to be about 1 [53].Statistical data on the tempered M/A structure (at least 10 pictures of the same magnification in each group), presented in Figure 12, reveal that post-tempering, the decomposition content of the M/A structure has dropped below 1%, a result consistent with the kinetic equation's calculations.Residual austenite measurements on the tempered specimens were performed using an X-ray diffractometer, which revealed that the content of residual austenite in the microstructure had decreased from approximately 10% to nearly zero.This implies that a considerable amount of residual austenite decomposition occurred in addition to the bulk M/A decomposition that occurred during the tempering process.
amount of residual austenite decomposition occurred in addition to the bulk M/A decomposition that occurred during the tempering process.
Figure 13 shows the variations in the specimens' hardness levels before and after tempering.However, after tempering the specimens for 4000 s at 600 °C, the average hardness values decreased from 510 and 625 HV to 445 and 461 HV, respectively, due to the decomposition of the M/A [51,54].Figure 13 shows the variations in the specimens' hardness levels before and after tempering.However, after tempering the specimens for 4000 s at 600 • C, the average hardness values decreased from 510 and 625 HV to 445 and 461 HV, respectively, due to the decomposition of the M/A [51,54].

Conclusions
In this study, the kinetic equations for the decomposition of M/A structures were analytically computed using Kissinger's method and the JMAK approach.Subsequently, the outcomes of these kinetic equations were employed to validate the accuracy of the equations and facilitate the decomposition of the unwanted M/A structures.The ensuing conclusions are as follows: 1.Each sample demonstrated exothermic peaks proximate to 600 °C at varying heating rates.Notably, the 220 °C/12 h sample exhibited two such peaks, one near 300 °C and another around 600 °C.The precipitation activation energies for these exothermic peaks at 600 °C in the 300 °C/5 h and 220 °C/12 h samples were 85.8 kJ/mol and 161.12 kJ/mol, respectively.2. The kinetic equation was derived from the DSC data, and its computation indicated that the carbide precipitation completion time was approximately 67 min at 600 °C.3. To confirm this outcome, the specimen underwent a tempering process at 600 °C for a duration of 67 min.A subsequent microscopic examination revealed a significant decomposition of the M/A structure, indicating a residual volume fraction at less than 1%.Additionally, the sample's hardness decreased to approximately 450 HV, a consequence of the M/A decomposition post-tempering.

Conclusions
In this study, the kinetic equations for the decomposition of M/A structures were analytically computed using Kissinger's method and the JMAK approach.Subsequently, the outcomes of these kinetic equations were employed to validate the accuracy of the equations and facilitate the decomposition of the unwanted M/A structures.The ensuing conclusions are as follows: 1.
Each sample demonstrated exothermic peaks proximate to 600 • C at varying heating rates.Notably, the 220 • C/12 h sample exhibited two such peaks, one near 300 • C and another around 600 • C. The precipitation activation energies for these exothermic peaks at 600 • C in the 300 • C/5 h and 220 • C/12 h samples were 85.8 kJ/mol and 161.12 kJ/mol, respectively.2.
The kinetic equation was derived from the DSC data, and its computation indicated that the carbide precipitation completion time was approximately 67 min at 600 • C. 3.
To confirm this outcome, the specimen underwent a tempering process at 600 • C for a duration of 67 min.A subsequent microscopic examination revealed a significant decomposition of the M/A structure, indicating a residual volume fraction at less than 1%.Additionally, the sample's hardness decreased to approximately 450 HV, a consequence of the M/A decomposition post-tempering.

Figure 1 .
Figure 1.Schematic diagram of heat treatment process flow.

Figure 1 .
Figure 1.Schematic diagram of heat treatment process flow.

Figure 2 .
Figure 2. DSC curves of 300 °C austempering heat treatment samples at different heating rates (ae).Figure 2. DSC curves of 300 • C austempering heat treatment samples at different heating rates (a-e).

Figure 2 .
Figure 2. DSC curves of 300 °C austempering heat treatment samples at different heating rates ( e).

Figure 2 .
Figure 2. DSC curves of 300 °C austempering heat treatment samples at different heating rates (ae).

Figure 5 .
Figure 5.The DSC exothermic peak of the 300 • C austempering heat treatment sample is fitted by using lnln(1/(1 − f)) for different heating rates (a-e).,where the black line is the original curve of the function and the red dashed line is the fitted straight line.

Figure 5 .
Figure 5.The DSC exothermic peak of the 300 °C austempering heat treatment sample is fitted by using lnln(1/(1 − f)) for different heating rates (a-e).,where the black line is the original curve of the function and the red dashed line is the fitted straight line.

Figure 6 .
Figure 6.DSC curves of 220 °C austempering heat treatment samples at different heating rates (ae).

Figure 6 .
Figure 6.DSC curves of 220 • C austempering heat treatment samples at different heating rates (a-e).

Figure 7 .
Figure 7. Relative volume fraction of M/A constituent decomposition with time at 600 °C.

Figure 7 .
Figure 7. Relative volume fraction of M/A constituent decomposition with time at 600 • C.

Figure 9 .
Figure 9. TEM picture of the austenite/martensite structure following an austempering heat treatment at 220 • C., where (a) represents the M/A bright-field image and (b) represents the M/A dark-field image.

Figure 9 .
Figure 9. TEM picture of the austenite/martensite structure following an austempering heat treatment at 220 °C., where (a) represents the M/A bright-field image and (b) represents the M/A darkfield image.

Figure 10 .
Figure 10.High-resolution images of 220 °C austempering heat treatment sample; (a) high-resolution resolution map; (b) Fourier transform of the red rectangle; (c) inverse Fourier transform of (b); (d) Fourier transform of the yellow rectangle; (e) inverse Fourier transform of (d).

Figure 10 .
Figure 10.High-resolution images of 220 • C austempering heat treatment sample; (a) high-resolution resolution map; (b) Fourier transform of the red rectangle; (c) inverse Fourier transform of (b); (d) Fourier transform of the yellow rectangle; (e) inverse Fourier transform of (d).

Figure 11 .
Figure 11.Different austempering transformation heat-treated samples that were tempered at 600 °C for 67 min are shown in SEM images.(a,b) 300 °C/5 h; (c,d) 220 °C/12 h.Where the red circle shows the M/A decomposition after tempering, with local magnification in the direction of the arrow in (a).

Figure 11 .
Figure 11.Different austempering transformation heat-treated samples that were tempered at 600 • C for 67 min are shown in SEM images.(a,b) 300 • C/5 h; (c,d) 220 • C/12 h.Where the red circle shows the M/A decomposition after tempering, with local magnification in the direction of the arrow in (a).

Figure 12 .
Figure 12.Comparison of M/A content before and after tempering.

Figure 12 .
Figure 12.Comparison of M/A content before and after tempering.

Figure 12 .
Figure 12.Comparison of M/A content before and after tempering.

Figure 13 .
Figure 13.(a) Distribution of hardness values of untempered specimens; (b) the hardness distribution of the sample after tempering at 600 °C for 67 min.

Figure 13 .
Figure 13.(a) Distribution of hardness values of untempered specimens; (b) the hardness distribution of the sample after tempering at 600 • C for 67 min.

Table 2 .
Kinetic parameters of phase transformation.n is the average of n values.