5.a. Vein networks

The calcite veins show the following characteristics:

• Orientations. The mapped veins all dip at ∼90° to bedding, which has a gentle dip to the north, with vein strike data shown in Fig. 5a, b. These strike data indicate two sets of veins, one set striking ∼ 085° to 115° (Set A, ∼18% of data) and another a dominant set striking ∼ 145° to 185° (Set B, ∼75.5% of data). The sets have a strong and well-defined preferred orientation, with most of the data (∼93.5% of data) within these narrow orientation ranges (Fig. 5a). These two sets have been divided in QGIS using cut-offs of 045–125° (Set A) and 125–225° (Set B), with maps shown in Fig. 6a, b. Sets A and B are therefore defined on the basis of fracture type (calcite veins) and orientation.

• Apertures. The calcite veins of both sets typically have apertures of up to ∼10 mm, although some of the veins in the area have apertures of up to ∼70 mm. When observed with a hand lens, the calcite appears to be sparry with no visible evidence for crack-seal. Wider veins occur, although joints and weathering along these wider veins tend to make aperture measurements ambiguous. Both sets show veins with apertures that are below the ∼ 2 mm × 2 mm pixel size of the imagery.

• Trace lengths. The maximum trace length measured for Set A is at least 3.844 m, with this longest vein extending to the edge of the mapping area. The maximum trace length measured for Set B is at least 6.32 m, with this longest vein extending to the edge of the mapping area. The shortest measured vein of Set A is at the limits of the drone imagery, and the mean length is ∼198 mm (n = 1412). The shortest measured vein of Set B is at the limits of the drone imagery, and the mean length is ∼259 mm (n = 2845). Fracture trace length data are summarized in Table 1. Note, however, that caution is needed with these length measurements, which are likely to be underestimates of true values (see Section 3.c). Set A veins show mean trace lengths per unit area of ∼1.2 m⁻¹, and Set B shows mean trace lengths per unit area of ∼4.7 m⁻¹ (mapped area = 227.358 m²).

• Geometric indicators of kinematics. Veins in Set A commonly show left-stepping, en echelon relationships, indicating a component of ∼ E-W dextral shear. En echelon patterns are less obvious in Set B, although some appear to show shear fractures and pull-aparts (Willemse et al., Reference Willemse, Peacock and Aydin1997; Sanderson & Peacock, Reference Sanderson and Peacock2019) indicating ∼ NNW-SSE sinistral shear.

• Distributions. Both vein sets appear to show spatial relationships to faults. Set A are clustered around the ∼ E-W-striking faults, with most of the veins of this set occurring in the north of the mapped area (Fig. 6a). Set B is more widely distributed in the mapped area (Fig. 6b) but appears to be concentrated along-strike from faults of similar trend (Fig. 3).

• Relationships between veins. Some veins of the same set show en echelon relationships, with some pull-aparts developed in veins of Set B. Veins of Set B cross-cut or show trailing relationships with veins of Set A. Some veins of Set B cross-cut other veins of Set B, with ∼ NNW-SSE-striking veins appearing to cross-cut ∼ N-S-striking veins.

• Relative ages. Crossing and trailing relationships suggest that Set A pre-dates Set B. Crossing relationship of veins of Set B suggests that it may be possible to further divide veins of this orientation on the basis of orientation and relative ages.

Figure 5. Orientation data for the fractures at Lilstock. (a) Rose diagram, weighted to length and area proportional, for the veins (n = 4763). (b) Graph of vein strike vs percentage cumulative branch length for the veins. The straight dashed line, from (0,0) to (180,100), represents a uniform orientation distribution, with deviation of the data from this line providing a useful and unbiased indication of the departure from uniformity (Sanderson & Peacock, Reference Sanderson and Peacock2020). Maximum deviation (D+) = 0.05; minimum deviation (D-) = - 55.09, V = 55.14. The sum V = |D+| + |D-| is independent of the choice of origin, with V = 0 representing a perfectly uniform distribution, and V = 1 representing a parallel alignment of lines (Sanderson & Peacock, Reference Sanderson and Peacock2020). The data indicate a dominant strike of veins at ∼ 145° to 185° (Set B), with a secondary strike of ∼ 085° to 115° (Set A). (c) Rose diagram for the joints (n = 5064). (d) Graph of vein strike vs percentage cumulative frequency for the veins. D+ = 9.1, D- = - 9.5, V = 18.6, V* = 13.26. The data indicate a wider range of strikes than shown by the veins, with a dominant orientation of ∼ 070° to 110°. (e) Rose diagram for the veins and the joints (n = 9827). (d) Graph of vein and joint strike vs percentage cumulative frequency for the veins. D+ = 2.34, D- = - 34.11, V = 36.45, V* = 44.22. The data show intermediate behaviour between the vein and the joint data.

Figure 6. Maps of the different fracture sets at Lilstock. (a) Vein set A strikes approximately E-W and is clustered around a fault zone with an approximate E-W strike. (b) Vein set B strikes approximately N-S to NW-SE and are clustered around faults that strike approximately NNW-SSE. Veins of set B cross-cut or trail through veins of set A. (c) A network of joints is superposed on the pre-existing veins. Some joints cross-cut the veins, while other follow (reactivate) the veins.

5.b. Joint networks

The joints show the following characteristics:

• Orientations. The joints dip at ∼90° to bedding and their strikes are shown in Fig. 5c, d. Two orientations of joint appear to dominate, these being ∼ N-S and ∼ E-W. The joints that follow veins have, however, the same orientations as vein sets A and B. The sets have a much less clearly defined preferred orientation than the veins, with only ∼80% of the data within broad orientation ranges that occupy ∼70% of the total range. Many of the joints curve, creating problems for subdividing the joints into sets based purely on their orientation (e.g., Engelder & Delteil, Reference Engelder, Delteil, Cosgrove and Engelder2004). For simplicity, we consider the entire joint network to be simply one set, based only on fracture type.

• Apertures. The joints generally show sub-millimetre apertures. Some wider joints occur, and this probably is caused by weathering and erosion.

• Trace lengths. The maximum trace length measured for the joints is at least 8.98 m, with this longest joint extending to the edge of the mapping area. The mean length is ∼0.53 m (n = 1881). The joints show a mean trace length per unit area of ∼4.4 m⁻¹.

• Geometric indicators of kinematics. Joints tend to show opening-mode displacement (e.g., Pollard & Aydin, Reference Pollard and Aydin1988), but curvature along many of the joints may suggest a component of shear along portions of such joints.

• Distributions. The joints appear to be fairly evenly distributed across the mapped area, with some appearing to curve into fault zones (Fig. 6c). Such behaviours for joints in the Liassic rocks of the Bristol Channel Basin are described by Rawnsley et al. (Reference Rawnsley, Rives, Petit, Hencher and Lumsden1992, Reference Rawnsley, Peacock, Rives and Petit1998) and Bourne and Willemse (Reference Bourne and Willemse2001). The veins appear to be clustered around faults, so the joints that follow veins are also spatially related to faults.

• Relationships with veins. The joints either cross or follow both sets of veins. The joints that follow the veins do not seem to extend to and beyond the tips of those veins, suggesting that vein aperture is important in controlling whether or not a vein will be reactivated as a joint.

• Relationships between joints. Pairs of joints in the Liassic rocks of the Somerset coast typically show abutting relationships (e.g., Rawnsley et al., Reference Rawnsley, Peacock, Rives and Petit1998; Peacock et al., Reference Peacock, Sanderson and Rotevatn2018). Some crossing relationships occur where one or both joints follow veins.

• Relative ages. The joints cross-cut or follow vein sets A and B, so post-date the veins. Abutting relationships between joints would enable relative ages of different joints (or joint sets) to be determined (e.g., Peacock et al., Reference Peacock, Sanderson and Rotevatn2018). Hancock and Engelder (Reference Hancock and Engelder1989) suggest that many joints in northwestern Europe were created by exhumation in a regional stress field in which maximum horizontal compressive stress was orientated ∼ NW-SE.

5.c. Veins and joints combined

Orientation data for the combined populations of veins and joints (Fig. 5e, f) show intermediate behaviour between the orientations of the veins and of the joints independently. Approximately 57.7% of the fracture lengths (veins and joints combined) fall in the strike range of 145°–185°, while approximately 28% of the fracture lengths fall in the strike range of 060°–105°.

6.a. Vein network

The vein network consists of two sets. Veins in Set A (the older set) are commonly isolated or show en echelon relationships. Set A is dominated by I-nodes (Table 2a, Figs. 6a, 7), which form 92.3% of the nodes. They also have a strong spatial clustering around the faulted margin of the exposed bedding plane.

Table 2. Node types for the superposed fracture network at Lilstock. (a) Numbers (and percentages) of node types for the components. % C = the percentages of connected nodes (i.e., percentage of V-, Y- and X-nodes). (b) Numbers (and percentages) of connected node types at interactions between different components

Figure 7. Ternary plot of I-, Y- and X-nodes for the veins, the joints and both the veins and joints combined. The vein network is dominated by I-nodes, with more X-nodes than Y-nodes. The joint network is dominated by Y-nodes. The veins and joints combined are dominated by Y- and X-nodes.

Veins in Set B (the younger set of veins) appear to form swarms, with en echelon patterns being less common (Fig. 6b). The Vein B network is still dominated by I-nodes (77.4%), but with significantly more Y- and X-nodes (Table 2). X-nodes are created by cross-cutting relationships between veins in Set B (∼ NNW-SSE striking veins appear to cross-cut ∼ N-S striking veins).

Set B is superposed on Set A creating a higher proportion of X-nodes because the two sets cross (Table 2a, all veins). The two sets of veins combined still shows a majority of I-nodes (52.4%), with 31.5% of the nodes being X-nodes (Table 2a, Fig. 7) at which Set B is seen to cut Set A.

Both Set A and Set B veins develop in damage zones related to two different generations of faults, and this spatial clustering results in limited connectivity across the exposure, with a high proportions of I-nodes. Where superposition occurs, Set A veins are generally overprinted by Set B, producing almost four times as many X-nodes as Y-nodes.

6.b. Joint networks

The joint network is dominated by Y-nodes, these forming 84.6% of the nodes and 94% of the connected nodes (Table 2a, Fig. 7). Prabhakaran et al. (Reference Prabhakaran, Urai, Bertotti, Weismüller and Smeulders2021) report that Y-nodes form 70 to 80% of the nodes in Liassic limestones ∼2.3 km to the east at Lilstock. I-nodes are rare (10.3%; Table 2a), with the joints being highly connected in the network. Six V-nodes were identified, but these are not included in the analysis.

A key feature that distinguished the topology of the joint network is the dominance of Y-nodes, indicating that joints nucleate and/or terminate against one another, which is often termed abutment. This strong interaction contrasts with the cross-cutting and overprinting seen within the vein network. We will examine the interactions between the vein and joint network in the next section.

6.c. Combined network of veins and joints

Combining data for all of the veins and the joints produce a superposed network, with orientations intermediate between the veins and the joints (Fig. 5). At the resolution mapped, the total superposed network has a fracture intensity of just over 10 m⁻¹, with the joints forming 42.4% of this (Table 1). The topology of the combined network (Fractures in Table 2a) is different from either the veins or the joints and cannot be predicted simply from the weighted average of the two networks. The superposed network contains a significantly higher proportion of X-nodes (42.4%) (Table 2a, Fig. 7). We can use the node counts to test hypotheses about the character of the interaction between the two networks.

The data for the connected nodes (Y- and X-nodes) in the vein and joint networks are extracted from Table 2a and combined with data on the number of connected nodes for Set A and Set B intersections and for those between the joints and veins (Table 2b). The proportions of X- and Y-nodes vary between the different types of intersections. Y-nodes dominate (94.5%) for joint:joint intersections, whereas X-nodes dominate (82.1%) for joint:vein intersections. The vein:vein intersections are also dominated by X-nodes but to a somewhat lesser extent (66.1% for all intersections and 78.8% for Set A:B intersections). Table 2a is a simple contingency table with almost zero probability of a random distribution of node types. These data strongly support the idea that vein Set A is overprinted by Set B, but interaction of the joints and veins is more complex. The joints both cross-cut the veins (high % of X-nodes) but also run along (and reactivate) the veins, suggesting both overprinting and utilization of the pre-existing network. The joints dominantly abut other joints, either initiating or terminating at pre-existing joints producing mainly Y-nodes.

7.a. Evolution

The analysis presented here enables the following evolution of the fracture network to be determined. Note that connectivity refers to the degree to which fractures are connected within a network, which depends on the size, frequency, orientation, spatial correlation, scaling and topology (Berkowitz et al., Reference Berkowitz, Bour, Davy and Odling2000; Manzocchi, Reference Manzocchi2002). Three main stages can be identified (Figs. 6, 8):

• Stage 1: development of vein Set A, in the damage zones of ∼ E-W-striking normal or oblique-slip faults (Fig. 6a). At this stage, the veins are mostly localized adjacent to the faults that bound the area, with little connectivity across the exposed bedding plane.

• Stage 2: development of vein Set B, in the damage zones of ∼ NW-SE-striking strike-slip faults (Fig. 6b). Some of veins in Set B trail through veins in Set A, while others cross to form X-nodes. At this stage, there was limited connectivity between the Set B veins, but the total vein network is weakly connected across the exposed area.

• Stage 3: development of the joint network (Fig. 6c). The joints reactivate (follow), trail through or cross-cut the earlier veins. The joint network itself is well connected, mainly through Y-nodes, with few I-nodes. The joint network overprints and reactivates the vein network to produce a superposed vein–joint network that is well-connected network.

The sequential evolution of network connectivity has been documented by Park et al. (Reference Park, Kim, Ryoo and Sanderson2010). Determining this evolution requires both identification of the types of fracture involved and examination of their relationships (reactivation, trailing, crossing, etc.).

7.b. Overprinting and reactivation

The superposition of two or more fracture networks can occur in different ways. The N-S veins largely overprint the E-W veins, producing cross-cutting intersections (high proportion of X-nodes in Table 2), with a limited amount of reactivation, as indicated by occasional trailing. The joint network shows both overprinting, abutting (Y-nodes) and much re-utilization of the earlier formed veins (joints along veins), with abundant termination and trailing of joints at veins and particularly at earlier formed joints.

Fracture reactivation is a common form of superposition. Faults are commonly reactivated with a different sense of displacement, with examples given in Table 3. This reactivation can be a component of fracture network superposition. For example, Kelly et al. (Reference Kelly, Peacock, Sanderson and McGurk1999) show that reverse-reactivation of E-W-striking normal faults in the Liassic rocks at East Quantoxhead (∼5 km WSW of the study area at Lilstock) was accompanied by the development of a network of conjugate strike-slip faults. Fracture network superposition can also involve fractures being reactivated as other types of fractures, such as an extension fracture (e.g., a vein or a joint) being reactivated as a contractional structure (e.g., a stylolite). Examples of such reactivation are given in Table 4.

Table 3. Examples of different types of fault reactivation

Table 4. Examples of different types of fracture reactivation

7.c. Implications for analysing and understanding fracture networks

Just as understanding superposed folding helps unravel the deformation history of a region (e.g., Ray, Reference Ray1974; Ramsay & Huber, Reference Ramsay and Huber1987), understanding superposition in fracture networks helps determine the evolution of that network. Rather than analysing the final fracture network as a single entity (e.g., Zhu et al., Reference Zhu, He, Santoso, Lei, Patzek and Wang2022), it is necessary to distinguish the different fracture types present and determine the sequence of development of the components of the network (e.g., Katternhorn et al., Reference Kattenhorn, Aydin and Pollard2000; Gillespie et al., Reference Gillespie, Walsh, Watterson, Bonson and Manzocchi2001), if the geometric and topological development of the network is to be understood. This involves using geometric and topological characteristics to define different classes or ages of fracture that are appropriate for the study (e.g., Peacock & Sanderson, Reference Peacock and Sanderson2018; Andrews et al., Reference Andrews, Shipton, Lord and McKay2020). Such an approach helps deduce how fractures have been controlled by the interplay between palaeostress fields and earlier structures and would lead to better understanding of the kinematic, tectonic and fluid flow history. Simply adding all fractures together in a network would be analogous to not distinguishing between paths, roads, canals, railways and aeroplane flight paths, and lumping them all together to analyse a transport network.

7.d. Other network components and examples

While we have focused on a fracture network created by the superposition of two sets of veins and a joint network, the analysis can be expanded to include other structures in the network. For example, some of the stepping veins of Set B are linked by stylolites or slickolites, with some forming pull-aparts (e.g., Willemse et al., Reference Willemse, Peacock and Aydin1997). At a larger scale, the two vein sets appear to be damage related to a network of superposed faults (Fig. 3). Superposed fault networks can show abutting (e.g., Nixon et al., Reference Nixon, Sanderson, Dee, Bull, Humphreys and Swanson2014, Fig. 11), crossing (e.g., Dart et al., Reference Dart, McClay, Hollings, Buchanan and Buchanan1995; Gonzalo-Guerra et al., Reference Gonzalo-Guerra, Heredia, Farias, García-Sansegundo, Martín-González, Butler, Torvela and Williams2023), reactivating (Table 3) or trailing (Nixon et al., Reference Nixon, Sanderson, Dee, Bull, Humphreys and Swanson2014, Fig. 15) relationships.