Abstract
Microstructure‐based finite-element analysis with a microcracking algorithm was used to simulate an actual degradation phenomenon of marble structures, i.e., microcracking. Both microcrack initiation and crack propagation were characterized, as were their dependence on lattice preferred orientation (LPO), grain shape preferred orientation (SPO), grain size, marble composition (calcite and dolomite) and grain‐boundary fracture toughness. Two LPOs were analyzed: a random orientation distribution function and an orientation distribution function with strong directional crystalline texture generated from a March–Dollase distribution. Three SPOs were considered: equiaxed grains; elongated grains and a mixture of equiaxed and elongated grains. Three different grain sizes were considered: fine grains of order 200 μm (only calcitic marble); medium size grains of order 1 mm (calcitic and dolomitic marbles); and large grains of order 2 mm (only dolomitic marble). The fracture surface energy for the grain boundaries, γig, was chosen to be 20 and 40 % of the fracture surface energy of a grain, γxtal, so that both intergranular and transgranular fracture were possible. Studies were performed on these idealized marble microstructures to elucidate the range of microcracking responses. Simulations were performed for both heating and cooling by 50 °C in steps of 1 °C. Microcracking results were correlated with the thermoelastic responses, which are indicators related to degradation. The results indicate that certain combinations of LPO, SPO, grain size, grain‐boundary fracture toughness and marble composition have a significant influence on the thermal-elastic response of marble. Microstructure with the smallest grain size and the highest degree of SPO and LPO had less of a tendency to microcrack. Additionally, with increasing SPO and LPO microcracking becomes more spatially anisotropic. A significant observation for all microstructures was an asymmetry in microcracking upon heating and cooling: more microcracking was observed upon cooling than upon heating. Given an identical microstructure and crystallographic texture, calcite showed larger thermal stresses than dolomite, had an earlier onset of microcracking upon heating and cooling, and a greater microcracked area at a given temperature differential. Thermal expansion coefficients with and without microcracking were also determined.
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Introduction
Marble has been used as decorative and constructive material since ancient times. However, marbles can be extremely sensitive to weathering and to degradation, and hence can have limited durability. The Taj Mahal, the famous masterpiece of architectural art (see Fig. 1), is a white marble mausoleum situated in Agra, India. Due to acid rain generated from an oil refinery and foundries, the marble façades on the Taj Mahal have been losing their luster, brightness, and white color into a sickly shade. Siegesmund et al. (2000, 2007) pointed out that physical weathering is thought to be the initial stage of marble degradation.
Many historical marble sculptures and monuments show clear evidence of deterioration, which is visible as a loss of relief structure (Fig. 2a) or façade bowing (Fig. 2b). The reason for the degradation is mainly due to climate. Many studies have shown that increases and decreases of temperature can induce these degradation phenomena in marbles, e.g., Kessler (1919), Battaglia et al. (1993), Winkler (1994), Siegesmund et al. (2000), Zeisig et al. (2002).
Calcite and dolomite, the rock-forming minerals in marble, have a large anisotropy in their coefficients of thermal expansion along the different crystallographic directions. Consequently, in a polycrystalline structure the stochastic misfit strains produced by this thermal expansion anisotropy can produce large internal stresses, which occur mainly at triple junctions and along the grain boundaries (Siegesmund et al. 2000). Independently, or in combination with environment (e.g., moisture-assisted fracture), these stresses can result in degradation phenomena, such as microcracking and granular disintegration (Koch and Siegesmund 2004; Siegesmund et al. 2008). Hot-stage environmental scanning electron microscopy (ESEM) can be used to provide direct evidence of such degradation phenomena during thermal cycling. In Fig. 3 one can directly observe the formation and propagation of microcracks near a triple junction in marble during the first heating and then cooling cycle. Such in situ experiments provide great in-depth knowledge of degradation processes, e.g., the loss of cohesion and concomitant microcrack formation along grain boundaries, and confirms that the initial decay process in marbles results from temperature changes and the misfit strains that result from the anisotropy in thermal expansion of the marble crystals. Such thermal expansion anisotropy degrades calcitic marbles more than dolomitic marbles, and the degradation is more severe if the marbles have straight grain boundaries, e.g., Weiss et al. (2002), Siegesmund et al. (2000), Luque et al. (2011).
Many fabric parameters influence this thermal degradation, notably, lattice preferred orientation (LPO), shape preferred orientation (SPO), grain size, grain-boundary toughness, grain-to-grain misorientation (Siegesmund et al. 2000; Weiss et al. 2002, 2003, 2004; Saylor et al. 2007; Siegesmund et al. 2008; Zeisig et al. 2002; Shushakova et al. 2011) and marble composition (Royer-Carfagni 1999; Siegesmund et al. 2000), as well as the single-crystal properties of the rock-forming minerals. Additionally, as has already been mentioned, the type of grain boundaries is an important factor that determines the behavior of marbles during thermal tests. Simple grain boundaries indicate a lower binding energy between them and interlobate or seriate grain boundaries reflect higher binding energy between grains (see Siegesmund et al. 2000; Grelk et al. 2004).
The goal of the present study is to establish the influence of fabric parameters on the propensity and degree of microcracking in marble structures, and to relate the degradation to microstructural indicators, such as stored energy strain density and maximum principal stress. Two-dimensional finite-element simulations are used to elucidate microcracking initiation and propagation in calcitic and dolomitic marbles. The influence of fabric parameters include: extremes of crystallographic texture, a random orientation distribution function (ODF) and crystallographic texture 20 times a random ODF; three morphological types of microstructures; different grain sizes; different grain-boundary toughness; and different marble composition.
Methods
Microstructure
Two-dimensional hypothetical rock microstructures were used as input micrographs for the finite-element simulations. They were generated by using a nucleation and growth algorithm, which is described elsewhere (Ito and Fuller 1993; Miodownik et al. 1999; Saylor et al. 2004, 2007; Shushakova et al. 2011). Three types of SPO were examined: equiaxed grains; elongated grains; and a mixture of equiaxed and elongated grains (see Fig. 4). The microstructural images used for this study have a resolution of 1,000 × 1,000 pixels. The number of grains in the equiaxed, mixed, and elongated microstructures are 382 grains, 347 grains, and 312, respectively.
When fracture is included as a phenomenon in finite-element simulations, the material now has a length scale (namely, the fracture surface energy divided by an elastic modulus), by which to measure grain size. Heretofore (e.g., Shushakova et al. 2011), outputs from microstructure-based simulations (e.g., elastic strain energy density and maximum principal stress) were independent of grain size; the only units being those of strain energy density (kJ m−3 = 10−6 GPa) or stress (GPa). Now, grain size, or equivalently, the size of the microstructural image, is important as it influences the parameter that is input into the simulation for the fracture surface energy. Accordingly, we introduce grain size as an important fabric, or microstructural parameter. We consider here three grain sizes: 200 μm; 1 mm; and 2 mm. However, due to the complexity of three SPOs in the present simulations (e.g., two different grain distributions in the mixed microstructure and non-equiaxed grains in the elongated microstructure), a better dimensional metric is the size of the microstructural image. Thus, the grain diameters for equiaxed grains and the grain widths for elongated grains were measured for a representative number of grains in each SPO microstructure. Using an average of these values to compute a nominal average grain size, the size of the microstructure was adjusted to give the three nominal average grain sizes. For a nominal average grain size of 1 mm, the size of the micrograph for the equiaxed and the mixed microstructure is 16.13 mm × 16.13 mm, and the size for the elongated microstructure is 13.89 mm × 13.89 mm. Similarly, when the nominal average grain size is 200 μm and 2 mm, the sizes of the micrographs (edge lengths), respectively, are 3.125 and 31.25 mm for the equiaxed and mixed microstructure, and 2.778 and 27.78 mm for the elongated microstructure.
The laboratory reference frame is specified in Fig. 4 by the Cartesian vectors e i , i = 1, 2, 3. The e 1- and e 2-directions are in the plane of the microstructure, and generally point perpendicular and parallel to the SPO, respectively, if shape orientation is present. The e 3-direction is out of the plane of the microstructure and points perpendicular to the SPO.
Crystalline texture
To assign orientations to each grain, orientation distributions were generated via the March–Dollase distribution (Dollase 1986; Blendell et al. 2004). The applied algorithm here is described in detail elsewhere (Saylor et al. 2007; Shushakova et al. 2011). Given a texture direction, the crystallographic c-axes are distributed within a cone of half angle θ about the texture direction. The polar angle of the orientation, θ, with respect to the texture direction is given by
where M is a “texture” parameter that characterizes the degree of texture and gives the value of the maximum in the distribution in units of multiples of random distribution (MRD). P is a random number selected between 0 and 1.
After determining the polar angle, the two azimuthal angles of the orientation, φ and ω, are selected randomly in the range of 0–2π. Two different types of LPO were generated using M values of 1 and 20. With increasing value of M, the orientations become more textured, i.e., if M = 1 the distribution is random, when M = 20 we have a strong crystallographic texture.
Typical LPOs for marbles, as described in Leiss and Ullemeyer (1999), are textured with the c-axes perpendicular to the SPO. Accordingly, while there are many ways to align LPO with respect to SPO (e.g., three mutually orthogonal idealized configurations were considered by Shushakova et al. 2011), in the current simulations we have aligned the c-axes perpendicular to the shape fabric and out of plane, i.e., parallel to the e 3 direction. A representative pole figure for such texture is shown in Fig. 5 along with a pole figure for a random ODF. The pole figures show the individual poles of the crystallographic c-axis for each grain in the microstructure. The contour lines are selected MRD contours from the March–Dollase distribution, from which the orientations were chosen.
Finite-element simulations
For the finite-element simulations the microstructure-based object-oriented finite-element program (OOF), developed at the National Institute of Standards and Technology (Langer et al. 2001), was used. The OOF software is in the public domain. Executables, source code, and manuals are available at: http://www.nist.gov/mml/ctcms/oof/. The OOF1 software was used here.
An adaptive meshing algorithm was used to create a finite-element mesh with a grain-boundary phase that has the same thermoelastic properties and orientations as the host grains, but with a different fracture toughness, i.e., the grain-boundary toughness, γig. The meshing procedure is described elsewhere (Langer et al. 2001; Weiss et al. 2002; Chawla et al. 2003; Saylor et al. 2007; Wanner et al. 2010). The final mesh consisted of 140,358 triangular elements for the equiaxed microstructure; 207,208 triangular elements for the mixed microstructure; and 163,668 elements for the elongated microstructure.
After creating the mesh, thermoelastic properties were assigned to the grains and to the grain boundaries according to which marble composition (calcite or dolomite) was being considered. The single-crystal elastic constants for both minerals, C ij , (Bass 1995) and the crystalline coefficients of thermal expansion for calcite (Kleber 1959) and dolomite (Reeder and Markgraf 1986) were used (see Table 1).
Thirty unique configurations specified by SPO, LPO, grain size, grain-boundary toughness and marble composition were used in the simulations. Three different sets of orientations were generated for the calcite microstructures with equiaxed, mixed and elongated grains, random and 20 times random texture, a nominal grain size of 1 mm, and a grain-boundary toughness of 40 % of that for the grains. For other microstructural configurations only one replication of the ODF was used in the simulations. Thus, with replications, 42 configurations were used as the basis for the finite-element simulations.
Strain energy density and maximum principal stress were calculated for all microstructure configurations on heating and cooling by 50 °C. Simulations were done with and without allowing microcracking to occur.
The fracture surface energy of single crystals is typically of order 0.3–1.1 Jm−2 (Becher and Freiman 1978; White et al. 1988). Accordingly, in the present simulations the crystalline or grain fracture toughness, γxtal, for both calcite and dolomite was assumed to be 0.5 Jm−2, and isotropic. Little is known about experimental values for the grain-boundary toughness. Accordingly, to examine the influence of the intergranular fracture resistance, the grain-boundary toughness was assumed to be 40 and 20 % of γxtal, thus the fracture resistance energy of the grain boundaries was γig = 0.2 Jm−2 and γig = 0.1 Jm−2, respectively. For simulations of microcrack initiation and crack propagation a Griffith-type fracture criterion was used. This criterion is based on the energy balance between mechanical and surface energy (Griffith 1921). How it is implemented in OOF is described in detail in Zimmermann et al. (2001) and Galal Yousef et al. (2005). Since the elastic constants input into OOF have units of GPa, the fracture surface energy has units of GPa times the size of the microstructure. Thus, by varying the input value of the fracture surface energy, one can vary the size of the microstructure, and hence, the nominal average grain size, as discussed above.
Fracturing in OOF is accomplished by reducing the directional elastic moduli (both the tensile and shear moduli) across the fracture plane by a multiplicative factors (Carter et al. 1998; Zimmermann et al. 2001; Galal Yousef et al. 2005). Multiplicative factors were chosen to be 1 × 10−6 and 2 × 10−6 in this study.
The finite-element simulations used two-dimensional elasticity with a plane-stress assumption, thereby simulating a free surface.
Results and discussion
Effect of SPO and LPO
The influence of SPO and LPO are illustrated for a calcitic marble with a nominal grain size of 1 mm and a grain-boundary toughness of 40 % of the single crystal toughness. Nonetheless, the results are general for all compositions and grain sizes. The results for this configuration are averaged over three replications of orientations (i.e., the ODFs) for the LPO distribution. For the equiaxed microstructure with a random ODF (M = 1) the onset of microcracking on heating occurs at an average temperature change of ΔT = 15 ± 2 °C. For the mixed grain microstructure microcracking commences at ΔT = 16 ± 1 °C, while for the elongated microstructure microcracking commences at ΔT = 20 ± 2 °C. The elastic strain energy density and the maximum principal stress were monitored during heating and cooling for temperature step changes of 1 °C for both cracked and uncracked samples. The uncracked simulations are those for which the microcracking algorithm was not activated. The thermoelastic response values are plotted for the temperature interval from 10 to 50 °C during heating and from −10 to −50 °C during cooling (see Fig. 6). The strain energy density and the maximum principal stress for the cracked state show a strong dependence on SPO for random crystallographic texture.
Microcracking in simulations with a highly textured LPO (M = 20) commences at a larger temperature increment from the unstressed state compared to the simulations with no texture, i.e., a random ODFs (M = 1). The equiaxed microstructure begins to microcrack at average of ΔT = 18 ± 1 °C, while the microstructure with mixed-shape fabric starts to crack at ΔT = 18 ± 4 °C, and the elongated microstructure commences to crack at an even higher temperature differential of ΔT = 23 ± 4 °C. The strain energy density and maximum principal stress for the fabric parameters are plotted in Fig. 7. A significant influence of SPO on the response of the cracked microstructures is observed upon heating; upon cooling the responses are similar.
The decrement in elastic strain energy density on microcracking (i.e., the difference between the strain energy density of the uncracked state and the cracked state) is the largest in the equiaxed microstructure with random texture (see Fig. 8). Since elastic strain energy is converted to fracture surface energy on microcracking, this result would suggest more microcracking in the equiaxed microstructure with random texture. To verify this conjecture, the averaged percentage of microcracked elements from three replications of the ODF are shown in Fig. 9 for a temperature change of 50 °C in both heating and cooling. The greatest extent of microcracking is observed in the equiaxed microstructure with random texture upon cooling (i.e., 9.1 ± 0.3 % of the total area at ΔT = −50 °C). This is closely followed by the same microstructure upon heating (i.e., 7.8 ± 0.2 % at ΔT = +50 °C). In the mixed grain-type microstructure only 7.2 ± 0.5 % of whole area is microcracked upon cooling and 5.9 ± 0.3 % upon heating. Even fewer microcracks are observed in the elongated microstructure: 6.8 ± 1.3 % and 4.0 ± 0.6 % upon cooling and heating, respectively. In all microstructures more microcracking is observed upon cooling, than upon heating. The asymmetry is shown in Fig. 10 for an elongated-grain microstructure with random texture. An apparent reason for this asymmetry is not obvious.
When the crystallographic texture is 20 times random, the least amount of microcracking is observed in the elongated grain-type microstructure upon heating. Only 0.3 ± 0.1 % of the total area microcracks for a temperature change of ΔT = +50 °C. In contrast, cooling the same microstructure results in 2.8 ± 0.4 % of the total area microcracking for a temperature change of ΔT = −50 °C. In the mixed grain-type microstructure the amount of microcracking is 2.2 ± 0.4 % and 3.4 ± 0.3 % of the total area upon heating and cooling, respectively. For the highly textured material the most amount of microcracking is observed in the equiaxed microstructure with 3.8 ± 0.1 % of whole area upon heating and 4.0 ± 0.2 % upon cooling (See Fig. 9). The influence of SPO on the degree of microcracking is quite apparent upon heating: there is a sevenfold increase in microcracking when changing from the elongated grain-type to the mixed grain-type microstructure. Upon cooling, the amount of microcracking is greater, but does not increase as significantly with decreasing SPO (only about 20 % for each grain-type change).
The amount of stored elastic strain energy of the uncracked state, as measured by the strain energy density, decreased approximately twofold with increasing LPO. However, the amount of stored strain energy of the cracked state decreased only slightly with increasing LPO (Figs. 6, 7). Accordingly, the decrement in elastic strain energy (Fig. 8) and the percentage of microcracked area (Fig. 9) both decrease approximately by 60 % with increasing LPO. Figure 11 provides visualization of the onset and degree of microcracking and of the influence of SPO and LPO.
In the present simulations initiation of microcracks was generally observed to occur at grain triple junctions and along single grain-boundary facets or partial facets. Subsequent microcracking was mixed mode with a combination of intergranular and transgranular fracture.
Spatial distribution of microcracks
To investigate the relation between maximum principal stress and microcrack initiation and propagation, high-stress regions in an uncracked material were compared to the microcracks in the cracked material. Microstructural response maps show the spatial dependence of microcracking and maximum principal stress for an equiaxed microstructure with a random ODF (Fig. 12) and for a mixed grain microstructure with a high degree of LPO texture (M = 20) (Fig. 13). Microstructural response maps are shown for ΔT = 50 °C and ΔT = −50 °C in both uncracked and cracked materials. As was pointed out by Weiss et al. (2002) cracks that occurred in microstructure upon heating do not form upon cooling and vice versa. Regions with high maximum principal stress in the uncracked state correspond to microcracks in the cracked material. Most of these regions in cracked material have high maximum principal stress as well but the values are smaller than those in the uncracked state. For the uncracked state in a mixed grain microstructure with M = 20 texture there are fewer regions with high maximum principal stress than in the equiaxed-grain microstructure with random texture, i.e., the propensity for microcracking is less.
Effect of grain size and marble composition
Extensive microcracking is expected to occur in coarse grain microstructures composed of grains that have a high thermal expansion anisotropy (Cleveland and Bradt 1978). Indeed, given a temperature change, one expects the amount of microcracking to diminish with grain size until a critical grain size is reached, below which microcracking does not occur in finer grain materials. For a temperature change of ΔT = 50 °C the critical grain size for calcite is approximately 45 μm and that for dolomite is approximately 80 μm. Thus, in all the grain sizes considered here microcracking is expected to occur for temperature changes of ±50 °C. However, decreasing amounts of microcracking are expected as the grain size decreases from 2 mm to 1 mm to 200 μm.
Accordingly, simulations were performed for calcitic marbles with nominal grain sizes of 200 μm and 1 mm, and for dolomitic marbles with nominal grain sizes of 1 and 2 mm. The percentages of microcracked area for the different grain sizes and marble compositions are presented in Table 2. For the 1 mm grain-size calcitic marble the results are averaged over three replications of the ODF to give a mean and standard deviation. For all others fabric configurations the results are only for one replication of the ODF, but one expects similar variability as that for the 1 mm grain-size calcite.
As expected, the percentage of microcracked area for a total temperature change of ΔT = 50 °C is significantly reduced for the 200 μm nominal grain-size calcite material in comparison to the 1 mm grain-size material. In the equiaxed-grain material with random crystallographic texture the microcrack percentage is only 0.5 % of whole area upon heating compared to 7.8 % for the 1 mm grain-size material. Upon a negative temperature change (cooling) the microcrack percentage is dimensioned even more from 9.1 to 0.4 %. While the amount of microcracking for a highly textured material (M = 20) is less than that for a material with random texture (M = 1), and is not as asymmetric in heating versus cooling, the reduction in the amount of microcracking with grain size is more pronounced: approximately one fortieth when reducing the grain size from 1 mm to 200 μm. The mixed grain-shape materials exhibit an even greater decrease in the percentage of microcrack area with grain-size reduction (see Table 2). Moreover, the amount of reduction is strongly dependent on the LPO. The 200 μm grain size, elongated grain-shape microstructure showed the most significant reduction in microcracking compared to the 1 mm grain-size material. Almost no microcracking was observed for the 50 °C temperature change. Furthermore, the reduction in the amount of microcracking for these fabric conditions was strongly dependent on the LPO. For the 200 μm elongated-grain microstructure the percentage of microcracked area was 0.007 % upon heating and 0.03 % upon cooling when the texture is random; and basically 0 % upon heating and 0.1 % upon cooling when there is high LPO texture.
The percentage of microcracked area is also reduced for the 1 mm nominal grain-size dolomite material compared to the 2 mm grain-size material (see Table 2). Furthermore, the 1 mm grain-size dolomite marble was observed to have less propensity for microcracking than the 1 mm grain-size calcite marble, i.e., microcracking begins at higher temperature differential and the percentage of cracked area is less (see Table 2). For instance, upon heating an equiaxed microstructure with random texture (M = 1) the onset temperature for thermal microcracking occurs at 14 °C for calcite marble, while the dolomite marble does not begin to crack until 19 °C. While dolomite is stiffer than calcite, calcite has a greater thermal expansion anisotropy resulting in a higher microstructural maximum principal stresses. The percentage of microcracked area in dolomitic marbles with a nominal grain size of 2 mm is comparable with results for calcitic marble with a nominal grain size of 1 mm.
The simulations also reveal a significant influence of the SPO and LPO fabric parameters on the temperature change (ΔT) require for microcrack initiation. The equiaxed-grain calcite microstructure with random texture and a nominal grain size of 200 μm begins to crack upon heating at ΔT = 31 °C and upon cooling at ΔT = −37 °C. In the mixed grain-shape calcite with random texture microcracking commences at ΔT = 34 °C upon heating and at ΔT = −34 °C upon cooling. Microcracking in the elongated-grain calcite commences at ΔT = 45 °C and at ΔT = −40 °C upon heating and cooling, respectively. For the highly textured calcite (M = 20) a larger temperature differential is required for microcracking, namely, ΔT = 38 °C and at ΔT = −41 °C in the equiaxed microstructure, ΔT = 48 °C and ΔT = −34 °C in mixed-shape microstructure, and ΔT = 50 °C and ΔT = −44 °C in the elongated-shape microstructure. Indeed, for the elongated-shape fabric microcracking was just initiated at these temperatures, i.e., the first mutated elements in OOF (the procedure in OOF1 for modifying element properties to simulate fracture) occurred at these temperatures.
Effect of grain-boundary toughness
Simulations for dolomite marble with grain size 1 mm have been performed. The fracture algorithm assumes that the critical fracture energy of the grain boundary is different from that of the grain interior. Simulations with two grain boundaries toughness are presented, to study the transition from the intergranular to the transgranular mode of crack growth.
More microcracking was observed when the grain-boundary toughness (γig) was 20 % of the grain fracture surface energy (γxtal) than when it was 40 % of γxtal. Additionally, the microstructure with γig = 0.2 γxtal commences to crack at a smaller temperature differential. Spatial maps of the extent of microcracking for a total temperature change of +50 °C are shown in Fig. 14. When the grain-boundary toughness is as weak as 20 % of that of the grains, transgranular cracking is essentially reduced completely. Microcracks initiate on single grain-boundary facets or on partial grain-boundary facets, and then propagate along the grain boundaries.
Coefficients of thermal expansion
The thermal expansion coefficients were computed for a given total temperature change, i.e., for ΔT = 50 °C and ΔT = −50 °C, and a given microstructure configuration, i.e., for a calcitic and a dolomitic marble with a nominal grain size of 1 mm and a grain-boundary toughness 0.40 γxtal. The thermal expansion coefficient in the e 1-direction, denoted as α x , is computed from the relative displacement change of the right and left sides of the microstructure. The thermal expansion coefficient in the e 2-direction direction, denoted as α y , is computed from the relative displacement change of the top and bottom of the microstructure. Figure 15 illustrates the influence of LPO and SPO on α x and α y . Numerical results are presented in Table 3 for the calcitic and dolomitic marbles upon heating and cooling for a total temperature differential of 50 °C. Results are also shown for the case when no microcracking occurs. For these simulations fracture, or microcracking, was inhibited by turning off the cracking algorithm in OOF.
In microstructures with no microcracking the coefficients of thermal expansion (the natural polycrystalline values) are constant during heating and cooling, and the same for both conditions. When microcracking is allowed the coefficients of thermal expansion in the cracked microstructure are greater than the natural polycrystalline values during heating and less than the natural polycrystalline values during cooling (see Fig. 15 and Table 3). This result is indicative of the extra expansion of the microstructure upon microcracking. Microcracks expand the microstructure. So, on heating this additional extension adds to the thermal expansion of the microstructure, thereby giving a larger result. On cooling, this additional expansion due to the microcracks subtracts from the thermal contraction of microstructure, thereby giving a diminished result. With increasing SPO (i.e., equiaxed grains to mixed grain shapes to elongated grains) and increasing LPO (i.e., random crystallographic texture, M = 1, to highly textured, M = 20), microcracking becomes more spatially anisotropic. When this happens, the difference between α x and α y , i.e., (α x − α y ), increases (see Fig. 15). Numerical results in Table 3 for both calcitic and dolomitic materials show a strong dependence on the degree of LPO, and almost no dependence on SPO.
Summary and conclusions
The thermoelastic response of marble and concomitant degradation by microcracking depend on many fabric parameters. The present study revealed certain combination of shape preferred orientation (SPO), lattice preferred orientation (LPO), grain size, grain-boundary toughness, and marble composition that have significant influence on the thermomechanical and degradation behavior of marble.
The elastic strain energy density and the maximum principal stress that result from the thermal expansion anisotropy of the marble crystalline grains and their spatial distribution in the microstructure are excellent indicators of microcracking. Regions in the microstructure with high values of these two microstructural properties in the uncracked state are expected to indicate regions with a propensity for microcracking (Shushakova et al. 2011). It was observed that regions with high maximum principal stress in the uncracked state correspond to microcracks in the cracked material. The onset and degree of microcracking strongly depend on the fabric parameters. With decreasing grain size and increasing LPO and SPO microcracking is less prominent and occurs at a larger temperature differential. Microcracking upon heating is predominantly less than that upon cooling (see Fig. 9). For the case of the mixed-grain and the elongated-grain microstructures with strong crystallographic texture, this asymmetry is significant. The percentage of microcracked area upon heating is one-tenth of that upon cooling.
Marble composition plays an important role in the degree of microcrack degradation. Microcracking in a dolomitic marble commences at higher temperature differential and exhibits less of a tendency to microcrack than for a calcitic marble with the same microstructure and texture. Thus, finite-element simulations indicate that dolomitic marbles are more resistant against thermal degradation. While dolomite is stiffer than calcite, calcite has a greater thermal expansion anisotropy, resulting in higher maximum principal stresses. In agreement, Zeisig et al. (2002) showed experimentally that dolomitic marbles do not have residual strains after thermal treatment. To illustrate the influence of fabric parameters such as marble composition, SPO and LPO on microcracking Fig. 16 is created.
Another fabric parameter that affects microcracking is the grain-boundary toughness (γig). In the simulations the grain-boundary toughness was chosen to be 40 and 20 % of the grain fracture surface energy (γxtal) to elucidate the fracture behavior of both transgranular and intergranular crack-growth modes and to bracket the value of the grain-boundary fracture toughness that delineates the transition from transgranular fracture to intergranular fracture. For the case of γig = 0.4 γxtal microcracking initiated as a grain-boundary microcrack either along a single grain-boundary facet or partially along such a facet. Subsequent microcrack extension occurred predominantly along grain boundaries, i.e., intergranular fracture, but occasional excursions through some grains were observed, i.e., intragranular cracks. When the grain-boundary toughness decreased to 20 % of γxtal, the amount of intragranular cracks was greatly reduced, or vanished all together (e.g., see Fig. 14).
Finally, microstructure-based finite-element modeling provides excellent insight and elucidation of influences of rock fabric and crystal texture on the thermoelastic behavior and microcracking response of marbles.
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Acknowledgments
The authors gratefully acknowledge David M. Saylor for generating the artificial microstructures used in this study with the Microstructure Builder program, which he was developing in collaboration with Carnegie Mellon University and Alcoa Technical Center. Thomas Weiss is gratefully acknowledged for providing the ESEM figures and B.Middendorf as well as B.Grelk for Fig. 1 and Fig. 2b. Financial support for E.R. Fuller, Jr. at Universität Göttingen was provided by the Deutsche Forschungsgemeinschaft grant: SI 438/39-1, and is gratefully acknowledged. Victoria Shushakova gratefully acknowledges a long-term DAAD fellowship grant.
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Shushakova, V., Fuller, E.R. & Siegesmund, S. Microcracking in calcite and dolomite marble: microstructural influences and effects on properties. Environ Earth Sci 69, 1263–1279 (2013). https://doi.org/10.1007/s12665-012-1995-2
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DOI: https://doi.org/10.1007/s12665-012-1995-2