2.1.1. Method

Participants. Thirty participants were recruited using Prolific (Palan & Schitter, Reference Palan and Schitter2018). All participants were native US English speakers with no history of cognitive impairment. All participants responded correctly to the control items; therefore, all were included in the analysis (age range: 18–45, M = 32.5, SD = 7.53, 15 females). All participants gave informed consent prior to participation.

Materials and procedure. We used the same experimental items and controls as van Tiel et al.’s (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016) Experiment 2: quantifiers (2), adverbs (1), auxiliary verbs (2), main verbs (6), adjectives (32, +1 additional <possible, certain> _-b scale]), and controls (7), with modifications as detailed in the introduction. For each experimental scale, we used the same three statements as van Tiel et al.’s (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016) Experiment 2. Thus, for example, the scale <intelligent, brilliant> could have appeared in any of the following statements: ‘The assistant is intelligent’, ‘That professor is intelligent’, or ‘This student is intelligent’. Control items (from van Tiel et al.) were either antonym expressions (e.g., <clean, dirty>) or unrelated adjectives (e.g., <tall, single>). The complete list of statements can be found in the Supplementary Materials.

The procedure largely followed that used by van Tiel et al. with the addition of a continuous confidence question, using a slider between ‘very confident’ and ‘not confident’. We added this question because ‘Yes’ responses to the main task, which indicate an SI derivation, may be associated with different degrees of confidence (see the use of a continuous scale for SI derivation in Sun et al., Reference Sun, Tian and Breheny2018). Thus, the measuring of confidence could provide an alternative (indirect) measurement of SI diversity (following a paradigm used in several cognitive studies, e.g., Kanai et al., Reference Kanai, Walsh and Tseng2010 for vision and Sternau et al., Reference Sternau, Ariel, Giora and Fein2015; and Orr et al., Reference Orr, Ariel, Peleg and Chiluwa2017 for language).

Participants saw all scales but only one statement per scale. This setup yielded three lists, with ten participants assigned to each list, in accordance with van Tiel et al. (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016). Items in each list were randomized for each participant, apart from the additional <possible, certain>_-b scale, which was always the last item in the list (Figure 2).

Figure 2. A trial example from Experiment 1-a using the <intelligent, brilliant> scale. A ‘yes’ response indicates that an SI was drawn.

2.1.2. Results

In this analysis, and throughout the following analyses, we used R version 4.1.3 (R Core Team, 2021), RStudio (RStudio Team, 2020), and the tidyverse package (Wickham et al., Reference Wickham, Averick, Bryan, Chang, McGowan, François, Grolemund, Hayes, Henry, Hester, Kuhn, Pedersen, Miller, Bache, Müller, Ooms, Robinson, Seidel, Spinu and Yutani2019). SI rates in Experiment 1-a successfully replicated the SI rates in van Tiel et al.’s Experiment 2 (r = 0.88, p < 0.001). To test the correlation between the studies when using the exact same stimuli, we removed the scales for which we made modifications (<participate, win> and <start, finish>) and performed a second correlation. As expected, this resulted in a higher correlation rate (r = 0.94, p < 0.001). All three lists correlated with one another (rs > 0.86, ps < 0.001), indicating that the different statements either contributed or did not contribute to SI rates in a fairly similar manner. Turning to the three modifications we made to the original design: (1) SI rates in the modified scales increased dramatically compared to van Tiel et al.’s Experiment 2 (from 18% to 46% (χ ²(1) = 4.9, p < 0.05) for <participate, win>, and from 21% to 86% (χ ²(1) = 24.2, p < 0.001) for <start, finish>) (see further discussion in the Supplementary Materials). (2) The new <possible, certain>_-b scale did not yield any significant difference from the original <possible, certain >_-a in this task. (3) Confidence scores were high for all scales (M = 78, SD = 6.61, and always above 65). Therefore, we could not derive new insights concerning SI diversity from this measurement. Figure 3 and Table 1 provide a detailed description of these results.

Figure 3. The percentages of ‘Yes’ responses from our Experiment 1-a (indicating the probability of deriving an SI).

Table 1. Results from Experiments 1-a, 2, and 3, as well as the cluster analysis, ordered by SI rates

Note: The SI rate column provides the results from Experiment 1-a and shows the average likelihood of deriving a scalar inference for each scale; The Boundedness score column provides the results from Experiment 2 and shows the mean boundedness score for each scale; The Distance score column provides the results from Experiment 3 and shows the mean distance score between scale mates for each scale; The Cluster column provides the associated cluster of each scale, determined based on the cluster analysis.

2.2.1. Method

Participants. A different group of 32 participants was recruited using Prolific. All participants were native US English speakers with no history of cognitive impairment. Two participants were excluded from the analysis because they failed in more than two control items. Therefore, 30 participants were included in the final analysis (age range: 18–45, M = 31.5, SD = 7.35, 15 females). All participants gave informed consent prior to participation.

Materials and procedure. We used the same materials and procedure as in Experiment 1-a; the only change was in the task. Here, instead of asking: ‘Would you conclude from this that, according to Mary, he is not brilliant?’ as in our Experiment 1-a and the original van Tiel et al. (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016) experiment, we asked, ‘Would you conclude from this that possibly, according to Mary, he is brilliant?’ Now, a negative response, ‘No’, reflects the derivation of an SI, whereas a positive response, ‘Yes’, testifies that an SI was not derived. Crucially, by eliminating the ‘not’ and adding ‘possibly’ to the task, we were able to eliminate the possible interference of negative strengthening (Figure 5).

Figure 5. A trial example from Experiment 1-b using the <intelligent, brilliant> scale.

We hypothesized that if negative strengthening does not interfere with the derivation of SI rates, Experiment 1-a and this experiment would be (negatively) correlated (because, in this task, the selection of ‘No’, rather than ‘Yes’, indicates that an SI is derived). Note that this experiment does not directly test for negative strengthening but only whether SI rates in our Experiment 1-a (and by implication, those in van Tiel et al.) were affected by the presence of ‘not’, the possible source of negative strengthening.

2.2.2. Results

Our results show that the SI rates of Experiment 1-a and this experiment demonstrate a negative correlation (r = –0.89, p < 0.001). In other words, SIs were derived with a relatively similar frequency. We thus conclude that it is even less likely that negative strengthening interfered with the SI rates obtained in Experiment 1-a.Footnote ¹ Therefore, we will use the results obtained in the previous experiment in the following analyses, wherein we explore two of the structural properties that were found to predict SI derivation, namely Boundedness and Distance.

2.3.1. Method

Participants. A different group of 34 participants was recruited using Prolific. All participants were native US English speakers with no history of cognitive impairment. Four participants were excluded from the analysis because they failed in more than two control items. Therefore, 30 participants were included in the final analysis (age range: 18–45, M = 28.9, SD = 7.65, 15 females). All participants gave informed consent prior to participation.

Materials and procedure. We used the same 44 experimental and 7 control items from Experiment 1-a. For each experimental item, we used the same three statements as in Experiment 1-a. However, we replaced the weak scalar expression with its stronger alternative in these statements (the target sentences) because boundedness is the property of the stronger scalar expression. To measure boundedness, we built on the observation that expressions biased towards boundedness are overall more infelicitous in comparative constructions (see Paradis, Reference Paradis2001, Section 3). We therefore asked participants to indicate, for example, how likely it is for anyone described as ‘brilliant’ to be even ‘more brilliant’ than ‘brilliant’ (Figure 6). Note that while this observation refers to adjectives, we applied it to all items, ensuring that the task was appropriate for non-adjectival scalar expressions.Footnote ²

Figure 6. A trial example from Experiment 2 using the <intelligent, brilliant> scale. A response towards the left end, ‘Yes, of course’, indicates that the scalar expression in the target sentence is biased towards a non-bounded conceptualization, and vice versa.

2.3.2. Results

Boundedness scores in Experiment 2 showed substantial variability (M = 41, SD = 30.66, ranging from the lowest boundedness score of 4.3 for <cool, cold> to the highest 92.8 for <few, none>). All three lists correlated with one another (rs > 0.92, ps < 0.001), indicating that the different statements either contributed or did not contribute to boundedness scores in a fairly similar manner. We note here that all items considered bounded by van Tiel et al. received scores higher than the median score (and vice versa; see the ordered boundedness scores in the Supplementary Materials). In fact, a strong point-biserial correlation was observed between our boundedness scores and the either-or distinction assumed in van Tiel et al. (r = 0.9, p < 0.001) (using the ltm package; Rizopoulos, Reference Rizopoulos2006). If we indeed treat boundedness as a categorical property, an interesting pattern is evident. For expressions with boundedness scores higher than the median, the mean was relatively far from the edge of the maximal score (M = 68.23, SD = 17.7). In contrast, for expressions with boundedness scores lower than the median, the mean was relatively close to the edge of the minimal score (M = 13.75, SD = 7.5). We will develop this point further in Section 4.

2.4.1. Method

Participants. A different group of 33 participants was recruited using Prolific. All participants were native US English speakers with no history of cognitive impairment. Three participants were excluded from the analysis because they failed in more than two control items. Therefore, 30 participants were included in the final analysis (age range: 18–45, M = 30.63, SD = 7.12, 15 females). All participants gave informed consent prior to participation.

Materials and procedure. We used the same 44 experimental and 7 control items from Experiment 1-a. While we used the paradigm from van Tiel et al.’s (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016) Experiment 4, we applied three changes: (1) Whereas van Tiel et al. (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016) used the neutral version of the materials when measuring distance (with the pronouns and generic predicates; Figure 7), we used the contextually richer version of the materials. This was motivated by a desire to make the comparison with our Experiment 1-a more reliable; (2) We used a continuous scale rather than a 1–7 Likert scale (see Dillon & Wagers, Reference Dillon, Wagers and Goodall2021 for a discussion); (3) Most importantly, to avoid the presupposition of distance, and hence scalarity, we changed the task used in van Tiel et al. (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016) from ‘Is statement 2 stronger than statement 1?’ to ‘Is statement 2 interchangeable with statement 1?’ (Figure 8).

Figure 8. A trial example from Experiment 3 using the <intelligent, brilliant> scale. A response towards the left-end, ‘Not interchangeable’, indicates that the two scale mates are perceived as distant, and vice versa.

2.4.2. Results

Scores in Experiment 3 showed substantial variability (M = 44.7, SD = 24.5; ranging from the highest distance score of 95.6 for <start, finish> to the lowest 10.1 for <snug, tight>). We note that the scores, which we refer to as ‘Distance scores’, are reported as the inverse of the interchangeability scores (Distance score = 100 – interchangeability score). Thus, for example, a 4.4 interchangeability score for <start, finish> reflects the distance score of 95.6. These scores correlate with the measurement of distance in van Tiel et al. (r = 0.4, p < 0.05), but note that in Section 4, we provide a more nuanced analysis of this correlation. All three lists correlated with one another (rs > 0.92, ps < 0.001), indicating that the different statements either contributed or did not contribute to distance scores in a fairly similar manner.

4.2.1. The relationship between boundedness and distance

Van Tiel et al. (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016) considered boundedness and distance as ways to operationalize the distinctness between scale mates. According to van Tiel et al., if distinguishing between scale mates is challenging, it is less likely that an SI will be derived. The association between distinctness and distance is apparent: The greater the distance between the lower bounds of two scale mates, the easier it is to distinguish between them. As for boundedness, van Tiel et al. suggested that ‘[…] scalar expressions on bounded scales are easier to distinguish than on non-bounded scales’ (p. 163, emphasis added). This accords with other suggestions in the literature (Beltrama & Xiang, Reference Beltrama and Xiang2013; Leffel et al., Reference Leffel, Cremers, Gotzner and Romoli2019). Based on our findings, specifically on the pattern of interaction between boundedness and distance and the prominent role played by distance in our model, we can offer an explanation as to why boundedness makes the distinction between scalar expressions easy.Footnote ³

The interaction between our measurements of boundedness and distance demonstrates that an SI is derived when there is a high distance score between scalar expressions regardless of the boundedness of the stronger expression. However, when the distance score is low or medium, boundedness increases SI rates. We suggest that this is because boundedness helps to fix distance. That is to say, a scale mate conceptualized as bounded imposes an absolute distance, regardless of the size of the distance. This is because in scales conceptualized as bounded, the lower bounds of the weak and strong scale mates necessarily do not overlap. To illustrate, consider the scale <rare, extinct>. The stronger scale mate ‘extinct’ denotes an endpoint, and its value (both lower and upper bounds) corresponds to ‘no existence’ (=0-existence). The weaker scale mate ‘rare’ denotes an interval. The lower bound of ‘rare’ corresponds to ‘at least some existence’ (>0-existence; more than zero). Clearly, there is no overlap between the lower bounds of the two expressions (the points between which distance is measured), making the distance necessary and absolute. Importantly, by imposing an absolute distance, we also impose a scalar construal (see Section 1).

Moreover, we argue that in the absence of a structural property that fixes a distance, as for non-bounded scales, distance is more unstable. To support this argument, we integrate two independent observations. First, while overall, our distance scores (Experiment 3) correlated with the distance scores in van Tiel et al.’s study (see Section 3.1), a closer examination reveals a difference between bounded and non-bounded scales. The distance scores of non-bounded scales, i.e., scales that received a boundedness score below the median score, do not correlate with the distance scores in van Tiel et al. (r = 0.27, p = 0.28). However, the distance scores of bounded scales, i.e., scales that received a boundedness score above the median score, do correlate with distance scores in van Tiel et al. (r = 0.5, p < 0.05). In other words, the distance scores of the non-bounded scales fluctuated between the two experiments: many of the non-bounded scales that were given low distance scores in our study were perceived as distant in van Tiel et al.’s study. Although this may initially appear to suggest an inconsistency between the results of the two experiments—ours and that of van Tiel et al. (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016)—we propose that it actually mirrors the volatile nature of distance between expressions in non-bounded scales. Put differently, regardless of the suitability of one task over the other for measuring distance, the observed differential effect is itself informative, supporting our proposal that the distance between some scalar expressions, on the same scale, is more volatile.

As a second observation in support of our proposal—that in the absence of a structural property that fixes the distance between scale mates, distance is unstable—we consider the only different factor between the measurement of distance in our study and van Tiel et al.’s study: the task. The two tasks posed different contextual manipulations, or highlighted different Questions Under Discussion (QUDs) (Roberts, Reference Roberts1996). Based on the fact that the two tasks yielded differential results, we suggest that QUD, like boundedness, plays a role in forming distance (also see Ronai & Xiang, Reference Ronai and Xiang2022). The QUD can promote a construal of the distance as negligible (when asked about interchangeability, as in our Experiment 3), but, alternatively, it can promote a construal of a significant distance (when asked about strength, as in van Tiel et al., Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016). Notably, the QUD affected the distance scores in a subset of the scales. More specifically, while it did not (significantly) affect the distance scores between expressions in bounded scales, it did have an effect on the distance scores between expressions in non-bounded scales (as discussed above).Footnote ⁴ We take this task effect to reflect the nature of non-bounded expressions rather than to be inherent to the task itself. In other words, this effect indicates that the distance between adjacent scale mates in non-bounded scales is not sufficiently distinctive/stable to remain consistent across contexts because nothing in the structure of these scales forces it to do so.

In sum, our results highlight the three factors that prompt distinctness: (1) large distance (as discussed in van Tiel et al. (Reference Van Tiel, Van Miltenburg, Zevakhina and Geurts2016) and demonstrated here as well); (2) a conceptually fixed/absolute distance imposed by a structural property (as developed here with respect to boundedness); and (3) contextual manipulations (see, e.g., Doran et al., Reference Doran, Ward, Larson, McNabb and Baker2012 and Ronai & Xiang, Reference Ronai and Xiang2022 for the role of the QUD in triggering SIs, or Breheny et al., Reference Breheny, Katsos and Williams2006 for the effect of different contexts in triggering SIs).Footnote ⁵

4.2.2. The relationship between scales and inferences

Our cluster analysis suggested that the data consists of two clusters, based on boundedness and distance scores. To explain the sorting principle that distinguishes items in Cluster 1 from items in Cluster 2, we here develop the suggestion proposed above: boundedness imposes an absolute distance.

Cluster 1 comprises scales that receive higher-than-average distance and boundedness scores, in other words, scales in which distance is large or fixed, hence the scalar construal of these scale mates is entrenched. To emphasize, a large distance between two scale mates results in an entrenched scalar construal (regardless of boundedness). Moreover, even when the distance between two scale mates is low or medium, an entrenched scalar construal occurs when the scale is bounded (see Section 4.2.1). Scales with an entrenched scalar construal can be conceived of as Given-scales (in the sense suggested in Gazdar, Reference Gazdar1979, p. 58). Cluster 2 primarily comprises scales that received lower-than-average boundedness and distance scores. These properties, and possibly others not addressed in this study, contribute to the fact that their scalar construal fluctuates. We refer to these scales as Volatile-scales. Thus, while previous suggestions focused on grammatical categories as a sorting principle, separating adjectival scales from the other scales (Beltrama & Xiang, Reference Beltrama and Xiang2013; Doran et al., Reference Doran, Baker, McNabb, Larson and Ward2009; Gotzner et al., Reference Gotzner, Solt and Benz2018), and although Cluster 2 is primarily comprised of adjectival scales, we propose that what essentially sets the items in Cluster 2 apart from those in Cluster 1 is a structural property, namely, distance. The distance in Given-scales (Cluster 1) is conceptualized as entrenched, while in Volatile-scales (Cluster 2) it is fluctuant.

Our perspective here diverges from the standard view, thus necessitating clarification. We distinguish between the scalar construal of Given- and Volatile-scales. Given-scales have a rigid scalar construal, due to the large or even fixed distance between the relevant paired expressions. However, we propose that paired expressions on Volatile-scales can be conceptualized either as scalars or possibly even as near-synonyms, in light of the instability of distance between them. In the latter case, the construal one adopts depends on various factors, such as the QUD, individual differences, language-specific considerations, etc. In other words, it is context-dependent. Importantly, the boundary between Given- and Volatile-scales is not rigid. It is possible that some items are harder to classify into one category or another. This may relate to how different individuals perceive distance. In other words, it is important to avoid fixating on assigning specific items to particular clusters while acknowledging the existence of two scale types.

When considering the inferential patterns associated with each of these types of scales, it is not surprising that Given-scales, with a fixed distance, and hence an entrenched scalar construal, trigger SIs robustly (~80% on average), whereas Volatile-scales, with a fluctuant distance, and hence an unstable scalar construal, trigger SIs inconsistently (only ~20% on average). If the two scale mates are not perceived as sufficiently distinct, there is no reason to reject the ‘stronger’ scale mate. For instance, if the participant perceived ‘snug’ and ‘tight’ as close in meaning, there is no reason to reject ‘tight’ when ‘snug’ is expressed. Notably, it follows that the fundamental trigger for scalar inferences is the ability to conceptualize a scale, that is, the ability to view the two scale mates as distinct. After all, you cannot have a scalar inference if you do not first have a scale.

4.2.3. The coexistence of scalar diversity and SI uniformity

Previous research on scalar diversity extended the set of scales to achieve a better understanding of the mechanism underlying SIs. Consequently, when faced with SI diversity, this diversity was attributed to the inferential mechanism, which could no longer be regarded as consistent or uniform (but see Benz et al., Reference Benz, Bombi and Gotzner2018; Gotzner et al., Reference Gotzner, Solt and Benz2018). While the findings in this study affirm the diversity of SIs (Figure 3), we suggest an alternative explanation to account for it. Specifically, we suggest that by acknowledging that some scalar construals are entrenched (those we refer to as Given-scales), while others are fluctuant (those we refer to as Volatile-scales), a different, more plausible explanation for SI diversity arises.

Considering that scalar inferences involve the rejection of a stronger alternative, it is clear why statements including ‘Volatile’ scalar expressions do not necessarily trigger an SI. When the alternative scalar expression is perceived as equivalently strong, that is, as denoting a close meaning, there is no reason to reject it. This is unlikely to happen in statements that include ‘Given’ scalar expressions, where the construal forces a difference in strength/distance. Accordingly, a fundamental trigger for scalar inferences is the ability to first conceptualize a scale, that is, a difference in distance between the (lower bounds of the) two scalar expressions. Once a scalar construal has been conceptualized, even for Volatile scales, one can assume that an SI will be derived, that is, the stronger alternative will be rejected.

If this is so, we propose that SI diversity arises from the fluctuant scalar construal of certain scales. When two scale mates are not easily distinguishable, an SI will be triggered only when a scale is construed. However, once there is a scale, either intrinsically through structure (as in Given-scales) or extrinsically through context (as might happen in Volatile-scales), it is likely that an SI will be derived using the same processing procedure, of stronger alternative rejection. In other words, diversity arises from the process of conceptualizing the scale and not from the derivation of the inference. Currently, the existing literature on SI diversity sets out from the assumption that two scalar expressions, at least the items in this study, invariably form a scale. We argue that some of these ‘scale mates’ are not always construed as forming a scale. We therefore impose a preliminary step for SI derivation: namely, a scale must first be construed.

The idea that constructing a scale is essential for deriving an SI has been raised in the literature concerning the development of this linguistic ability. Several studies using various tasks have shown that children succeed in deriving SIs using numbers (i.e., arriving at the exact meaning) but not quantifiers (Huang & Snedeker, Reference Huang and Snedeker2009; Hurewitz et al., Reference Hurewitz, Papafragou, Gleitman and Gelman2006; Noveck, Reference Noveck2001; Papafragou & Musolino, Reference Papafragou and Musolino2003). One explanation for this dissociation is attributed to differences in the ease of scale conceptualization (Barner et al., Reference Barner, Brooks and Bale2011). For numerals, children find it easy to conceptualize a scale because they are well-familiar with the number line (at least in Western societies). However, when it comes to quantifiers, children struggle to establish the connection between ‘some’ and ‘all’ and, hence, have difficulties forming the scale, hindering their access to the strong alternative. This is compatible with our proposal that the derivation of SIs necessarily builds on the preliminary step of construing the scale.

For the current discussion, we wish to stress that by acknowledging the preliminary step of scale construal, we can, in fact, account for the diversity across scales based on whether or not a scalar construal was conceptualized, while maintaining the uniformity of the inferential mechanism for all scales once this scalar construal was conceptualized.