A long line of work has documented the existence of gender-based wage and salary gaps in many markets (Jones, Makepeace and Wass, 2018; Schirle, 2015; Blau and Kahn, 2006). Such gaps are often associated with other gender-based disparities in positioning in workplaces, industries and societies (e.g., Samkharadze et al., 2015; Jacobsen, 2007). Such difference in positioning, termed gender segregation, has been described as “one of the most important and enduring aspects of labour markets around the world” (Anker, 1997: 315).

One market, for university faculty, has been the focus of considerable study, perhaps because it is an international labour market in which participants typically have high levels of education and perform similar tasks. Analyses have established the persistence of salary gaps between male and female academic employees in Canada and abroad, often pointing to gender-based segregation as a significant explanatory factor (Brower and James, 2020; Brown and Troutt, 2017; Catalyst, 2017; Carlin et al., 2013; Goastellec and Pekari, 2013; Brown, Troutt and Prentice, 2011; Takahashi and Takahashi, 2011; Warman, Woolley and Worswick, 2010). Because gender-based pay gaps have been shown to be slow to change in different kinds of organizations, there is a need for studies and policies on how to close these gaps.

The most effective but challenging method by which to decrease a gender-based salary gap may be to eliminate positional segregation, that is, to change the distribution of workers in such a way that males and females are equally represented in all ranks, positions and salaries, and then to maintain such equality until any experience premium is equally distributed by gender. However, the distribution of men and women by position and experience is slow to change in workplaces, such as universities, where careers are long. For example, if women start by disproportionately occupying lower paid positions than men, this will create a gap and slow progress towards salary equality for the duration of the cohort’s careers. Even the most conscientious efforts to change the positional distribution of men and women take time, relying on retirements after long careers with limited opportunities for hiring due to low turnover rates. This carries obvious implications for perpetuating pay gaps.

In this paper, we posit that employers can adopt a less direct method to reduce the salary gap: altering pay grids to mitigate the effect of persistent positional segregation. In particular, we compare two types of salary grid compression: compression in salary ranges within positions (and ranks) and compression in salaries across positions (and ranks). We show that, while both have a decreasing effect on the gap, the latter is more effective in the context of long careers in a workplace where women tend to have less experience and are more likely to occupy lower-paying positions than men. In light of the seeming intractability of gender-based pay gaps, our results point to a possible means of speeding their reduction through relatively small adjustments to an organization’s salary grid. As well, the simulation method we use in our analysis provides a tool, which employers can use in order to monitor gaps and the equity effects of their compensation policies.

The employer of focus in this paper is a typical Canadian research university with a formal pay grid for its academic staff. Two findings about the university provide context for our analysis. First, gender-based positional segregation characterizes the distribution of the university’s male and female academic staff among the ranks. Despite gains in the number of female academics at the university and gains in their representation at the higher-paying ranks over time, the distribution of employees remains segregated (Brown and Troutt, 2017). Second, the university had a longstanding gender-based salary gap (Brown and Troutt, 2017; Brown, Troutt and Prentice, 2011; Haignere and Lin, 1994), which underwent a marked decrease following a period of near constancy (Brown and Troutt, 2017). Specifically, the gap in average male and female salaries was 24% in 1993, 22% in 2003, and 12% in 2013 (Brown and Troutt, 2017). These two findings, or characteristics, are common with firms and industries.

The university uses a grid structure to guide the setting and advancement of academic employees’ salaries. The university’s academic staff have been unionized since the mid-1970s, as have the academic staff of most Canadian universities. The academic salary grid at the university is regularly negotiated through collective bargaining between the university administration and the academic staff’s union. With few exceptions, each bargaining round produces a three-year agreement, with that agreement including a specific salary grid for each of the years covered.

While the general principles and logic of the salary grid have remained the same over time, some of the relationships between salaries within the grid display two distinct periods of adjustment, each approximately a decade long. These periods of contrasting grid adjustment form the basis of our study. Across one decade, within-rank compression of the grid occurred, shrinking the range between each rank’s minimum and maximum salaries. In the next decade, the grid underwent across-rank compression, decreasing the ratio of the highest- to lowest-paid ranks’ salaries. Whether these compressions were purposeful and, if so, in pursuit of what goal are uncertain. Despite general concern with respect to the gender salary gap, neither the union nor the university made any public pronouncements to indicate that either period of compression was explicitly aimed at reducing the gap. However, since women at the institution tend to be at the lower end of some ranks’ salary range and overrepresented in lower-paying ranks, when we noticed the distinct types of compression, their effects on the salary gap seemed worthy of examination.

This paper makes a unique contribution to the discussion of salary determination through both the focus of its inquiry, comparing the effects of specific types of grid compression on the gender salary gap, and through its method of analysis, simulation. While our study uses data from a university, its methodology applies generally to organizations with a defined salary grid.

Our work provides an innovative approach to the current understanding of pay inequality. Most work to date attempts to explain various dimensions of the pay gap (Blau and Kahn, 2017; Heinz and Wolf, 2010), identifying the role of salary structure, collective bargaining and various characteristics of firms and workers in affecting the gender gap. In Canada, the Canadian Association of University Teachers (2011: 7) identified pay practices as a possible contributor to the persistent pay gaps found in Canadian academia, stating, “[w]omen may…be disadvantaged by the traditional academic salary grid system” and pointing to the “need to assess how current … salary grid systems may be contributing to the gender pay gap.” Recent work also examines the weakness of traditional explanations in explaining the academic gender salary gap (Brower and James, 2020), noting that research output and age explain less than 50% of the current gap. However, while the underlying causes of gender gaps are debated, few studies propose and road test tools to reduce these gaps. Our study provides and defends a strategy for reducing pay gaps through across-rank compression and demonstrates a forecasting method, which any organization with a set pay grid could use to consider the equity effects of its pay practices, including anticipated changes to its pay practices.

Research on pay gaps commonly theorizes that formalized pay policies limiting discretion benefit marginalized groups such as female employees and may play a role in narrowing or preventing inequitable pay gaps (Kessler and Pendakur, 2015; Doucet, Smith and Durand, 2012; Canadian Association of University Teachers, 2011; Elvira and Saporta, 2001). With respect to Canadian universities, Warman, Woolley and Worswick (2010) found that larger pay gaps existed at Canadian academic institutions where pay increases were based on more subjective judgements of an employee’s merit. Doucet, Smith and Durand (2012) found pronounced gender-based disparities in more discretionary processes such as promotion and pay supplementation, while they found no significant gender-based difference in base salaries, which were determined through a highly transparent, formalized grid system. Bakker et al. (2010:9) also point to the potential contribution of any “discretionary component” to the emergence, persistence, or widening of a gender salary gap at a Canadian university. Our study supports the finding that a formal salary grid can be a useful tool to temper a gender-based salary gap.

Like other researchers studying gender salary gaps (e.g., Brower and James, 2020; Blau and Kahn, 2017), we have found that the pace of improvement toward salary equity is painfully slow, with positional segregation a contributing factor (Brown and Troutt, 2017). Brower and James (2020) find evidence that the segregation and gender pay gap in New Zealand’s academic sector will not diminish through attrition of long-serving senior men, as is commonly speculated. Our university’s use of a formal salary structure should limit the creation of gender-based salary differences. However, it does not correct gaps created by historical practices or unconscious biases, such as segregated hiring and promotion rates. This is because, aside from time of hire and promotion in rank, an academic’s annual salary at the university is determined almost entirely by increases that depend on where their salary falls within the grid structure. Therefore, without concrete intervention, the grid structure can perpetuate gaps formed by the commonly persistent segregation of employees within it.

Given the importance of formalized pay structures and practices in reducing gender pay gaps, the university’s grid serves as an excellent jumping off point to examine how salary compression can be used to reduce gaps. The periods of contrasting types of grid compression provide a chance to test the effect of each in turn on the institution’s gender salary gap. In this paper, we use simulation methodology to explore the effect of each period of grid compression on the gap. By applying the changing salary grid to a common cohort of employees with a fixed positional distribution, we show how the two types of compression reduce the gap to differing extents. Such a use of salary simulation illustrates how workplaces could target salary compression to reduce gender pay gaps.

It is important to recognize both the strengths and weaknesses associated with compression of salaries. Bellas, Ritchey and Parmer (2001) express concern about the degree to which market forces have compressed salaries in academia, even while recognizing compression’s role in decreasing the gender salary gap. They speculate that the relatively faster growth they observed in female faculty salaries at a United States university could result from women’s greater likelihood of being more recently hired. Women’s (starting) salaries reflected increases due to market forces, while the salaries of men with long tenures had stagnated due to institutional and government practices limiting annual increases. At another U.S. university, Hampton et al. (2000) found that similarly driven salary compression was sufficiently pronounced to offset the factors that would lead to a gender-based salary gap. More widely, Harmon et al. (2018) report that, as of the 2017-18 year, 99 out of 892 American post-secondary institutions in their analysis also exhibited such compression. At 22 of those, average (entry-level ranking) assistant professor salaries exceeded average (mid-ranking) associate professor salaries, representing salary inversion (Harmon et al., 2018).

Business management and human resources experts caution that a high degree of salary compression may lead to low employee morale and reduced employee productivity (e.g., ERI Economic Research Institute, 2017). However, the degree of grid compression that we highlight in this paper helps to narrow gender-based salary gaps and is sufficiently mild to avoid these negative effects. Furthermore, compression within a grid plays a different role than compression imposed by the market. In the former case, the progression of salaries through the ranks continues to follow an upward trajectory. In the latter, compression is the result of starting salaries that are well above the minimum starting salary at the lowest rank, and, in the case of inversion, as Harmon et al. (2018) note, above the mean salary of higher ranks.

The compression we examine in this study is applicable well beyond the university sector. It is “consistent with international evidence that unions compress the distribution of wages of their members by securing relatively higher premiums” for employees at the lower-end range of the pay grid (Casale and Posel, 2010: 31). Similarly, Edin and Richardson (2002) attribute the substantial decrease in Sweden’s gender pay gap from the 1960s through the early 1980s to the compression achieved in the country’s overall wage structure during that same period. A women’s activist group of the United Steelworkers, Women of Steel (2017: 7) also advocates grid compression as a solution to pay inequity in workplaces where “women are concentrated in the lower end of the grid.” Furthermore, Schäfer and Gottschall (2015: 491) assert, “there is still room for [measures such as]…pay raises in low-paid and female-dominated sectors or gender-sensitive monitoring of pay dynamics.”

The salary compression at the university has taken place in a unionized environment where collective bargaining determines pay practices for each year. However, we would argue that unionization is not essential to our methods and results.

Unionization itself has yielded mixed results with respect to its effect on equity, including on gender-based wage and earnings gaps. The collectively bargained policies and practices in unionized workplaces tend to reduce the potential for individualized, arbitrary, discretionary and/or opaque or otherwise hidden decisions concerning an employee’s pay (Elvira and Saporta, 2001; Sosin, Rives and West, 1998), thereby providing the context for harnessing the benefits provided by a formalized remuneration structure in reducing the gender salary gap. Elvira and Saporta (2001) find unionization to be associated with lower gender-based wage gaps in a wide swath of the U.S. manufacturing sector. Casale and Posel (2010: 30) also point to the “inequality-reducing effect” commonly found in empirical studies on the effects of unionization in the South African workforce. With respect to academia, Sosin, Rives and West (1998: 28) state, “[s]tudies of the impact of unions in American higher education conclude that the positive impact on salaries is, at best, relatively small, unlike the positive effect found in the industrial relations literature.”

The present work builds on previous research on the gender salary gap. We recognize that the gap exists, that its causes are a matter of debate, and that the gap in academia and other stratified workplaces is not expected to close in the foreseeable future, despite unionization and the existence of a formalized pay structure. We contribute to existing knowledge of the gender pay gap by using a simulation method to project salaries through an evolving grid to see the effects on the university’s salary gap over time. Our method enables a direct comparison of the effects of two dimensions of grid compression on the gender salary gap in an organization with a clearly defined salary grid. This provides a tool that employers using a pay grid can use to forecast the equity effects of their pay practices and policies. Our results show that a small amount of compression across ranks is more effective than within-rank compression to reduce a persistent gender pay gap.

Academic staff at the university hold either a teaching-focused position or a research-focused position. There are three ranks within each of these positions, for a total of six ranks. Employees ascend through the ranks within their position, only rarely moving from one position to the other. Employees holding teaching-focused positions occupy ranks 1 through 3 of the annual salary grid, while those holding research-focused positions occupy ranks 4 through 6. Ranks 1 and 6 of the grid are, respectively, the lowest and highest paid.

The salary grid defines key parameters for employees’ salaries at each rank and plays a central role in determining an employee’s annual pay increase. A sample salary grid[1] in Table 1 represents the historic annual grids we used in this study. It is noteworthy that the structure and logic of the grid have not changed.

For each rank, the grid specifies a binding floor and a soft ceiling. No employee new to a rank may be paid a salary lower than that rank’s floor. However, an employee may receive a salary above the ceiling for their rank as a result of the annual salary increase process described below. The grid also specifies a threshold salary and steps 1 and 2 for each rank. The threshold salary is used to determine which step the employee will receive in the annual salary increase process. Steps 1 and 2 are lump sum amounts that are normally added to an employee’s salary during the annual salary increase process. Step 1 exceeds step 2, and both steps’ values increase with rank through the teaching and research positions. All five of these parameters are determined through bargaining.

Each year, each employee’s current salary undergoes an increase based on a combination of three determinants: the overall salary increase for the new salary year; the step payment policy for the new salary year; and, the employee’s current salary compared to the floor, threshold and ceiling for their rank (which may be a new rank if they were promoted during the current salary year). These three determinants are products of collective bargaining.

The actual overall salary increases and step payment policies negotiated at the university over the course of the study period appear in Table 2. A given year’s overall salary increase may be a percentage or lump sum amount, though it is typically a percentage. It can also vary by rank, although it is usually the same for all ranks. Typically, a given year’s step payment policy is to pay the step amount specified in the salary grid. However, as seen in Table 2, some years’ step payment policies have deviated from that typical approach. We discuss the salary increases and step payment policies below.

The annual process of increasing each employee’s salary follows a series of actions using the three determinants listed above. First, the overall salary increase for the new year is applied to each employee’s current salary (regardless of whether their current salary exceeds their rank’s ceiling). Next, a step payment is added according to the step payment policy in place for the new salary year. If a step is to be paid, an employee’s eligibility to receive the payment is determined by comparing their current year salary (prior to the overall increase) to the threshold and ceiling salaries stated in the new year’s grid for their continuing or newly-attained rank. If an employee’s current year salary falls below the threshold in the new grid, they receive the higher step 1. If their salary falls at or above the threshold but below the ceiling in the new grid, they receive the lower step 2. If their current salary has reached or surpassed the new grid’s ceiling for their rank, they are not eligible to receive that year’s step payment. The final step of the salary increase process is a check that each employee’s salary is at least at the floor for their rank in the new grid, bumping any salaries up to the floor if needed. Depending on the specifics of the three determinants used in this process, it is possible for a particular employee, or even all employees, to receive a zero increase in a particular year.

To illustrate the salary increase process, imagine an employee currently earning $110,000 who was promoted from rank 5 to 6 during the current year. Imagine too that, in the new year, a 1% overall salary increase and the steps listed in the new year’s grid are to be paid, and that the new grid is the sample grid shown in Table 1. According to the annual salary increase process, this employee’s new salary will be determined as follows. First, the 1% overall salary increase is applied. This brings the employee’s salary to $111,100. Second, a step payment is added to the employee’s salary. The amount of the step payment is determined by comparing the employee’s current salary of $110,000 to the threshold salary stated in the new grid for the employee’s new rank (rank 6). Since the employee’s current salary of $110,000 is less than rank 6’s threshold of $126,325, the employee receives rank 6’s step 1 payment of $3,510, bringing their new salary to $114,610. Lastly, because this employee received a promotion in the current year, their new salary of $114,610 is checked to ensure that it is at least at the floor level for their new rank. In this case, it is, so no further adjustment is made.

The salary grid, and changes to it, can critically influence an employee’s salary trajectory. This is because each employee’s salary moves according to salary levels in the grid, which themselves may move, or not, across time periods, as well as to relationships among those levels which have undergone changes as the grid has evolved.

This study examines how the grid has changed across a period of 24 years, and the implications of the changes for the gender salary gap at the university. In particular, we identify two different types of grid compression that took place over this time. During roughly the first decade, the grid underwent within-rank compression, while it underwent across-rank compression during roughly the following decade.

Figure 1 charts ratios of key salary levels in the grid annually, within and across ranks. For example, the top line shows that, in year 1, rank 6’s floor and ceiling salaries were each 2.2 times rank 1’s corresponding salaries. Similarly, the lowest line shows that, in year 1, each rank’s threshold was 1.7 times its floor.

Figure 1 shows that within-rank compression of the grid occurred during roughly the first decade of our analysis. The solid line in Figure 1 depicts the ceiling-to-floor ratio for a representative rank (rank 6). In Figure 1, we see this line drop midway through the first decade and then level off across the second decade. Specifically, this ratio started at 1.7, rose to 1.8 in year 4, then fell to 1.5 by year 6, where it remained through year 24. This drop shows that the range from each rank’s floor to its ceiling shrank, or underwent compression, midway through the first decade. This within-rank compression resulted primarily from a relatively greater nominal increase in the ranks’ floors than in their thresholds and ceilings during this period. The increase in the ranks’ floors was almost 80% greater than the increase in their thresholds and ceilings.

In contrast, across-rank compression is evident only in the second decade, as shown in the upper (patterned) set of lines in Figure 1. Each of these lines charts the ratio of a rank 6 to rank 1 salary parameter. The dashed line represents the ceiling ratios. It illustrates that the ratio of rank 6’s ceiling to rank 1’s was constant at 2.2 during years 1 through 14, then fell to 1.9 in year 15 and to 1.8 in year 18. The diamond line represents the ratio of rank 6 to rank 1 floors. It shows that the compression of salary floors between ranks was slightly greater than that of salary ceilings. This was due to increases in the floors at the lowest ranks.

While the general expectation for salary increase is that a percentage overall increase and step payment are both awarded each year, there was variation over time, as shown in Table 2. Overall salary increases have been awarded as percentages in most years. However, they were paid as lump sum amounts in three years and as a combination of percentage and lump sum amounts in four years, and were not awarded during another four years. The usual steps were paid in 20 years of the study horizon. In years 4 and 5, they were withheld along with overall salary increases, and in years 6 and 7, they were only paid to employees whose salaries were below the threshold salary for their rank (those eligible to receive the higher step 1). Furthermore, the amounts paid were inverted by rank, with lower-ranked eligible employees receiving larger steps than higher-paid eligible employees do. The austerity that marks the variation from the norm in the earlier decade offsets the high overall increases to salaries paid in the first three years.

In addition to the annual salary grids, overall pay increases and step payment policies for 24 years, the data for this study include administrative salary data for the full cohort of academic staff at the university in year 24. By year 24, the institution had both hired and promoted a significant number of women. This means the simulations using this cohort should generate the most conservative results in terms of gap reduction effect from salary grid changes. The variables we use from the administrative salary data are gender, real full-time salary net of stipends[2] and rank.

Table 3 shows the rank distributions for men and women in the cohort of employees.

For this cohort, the majority of the university’s academic staff hold research-focused positions; only 17% of the staff work in teaching-focused positions. Women comprise only 36% of the research-focused positions but 61% of the teaching-focused positions. Women are significantly less likely than men to hold the highest paid rank. A woman had an 18.6% probability of holding rank 6, while a man had a 38.7% likelihood of holding this rank (Brown and Troutt, 2017).

Our analysis simulates the annual movement of the year 24 cohort’s salaries over two consecutive decade-long horizons using the salary grid, overall pay increase and step payment policy in effect in each year. The purpose of the simulation is to examine whether the different decades’ respective grid compressions produce different projected effects on the gender-based salary gap.

To perform this analysis, we first deflate the cohort’s actual year 24 salaries to the start year for each decade. We compute the gender-based salary gap in each decade’s start year (deflated) salaries for comparison purposes. We then project each employee’s start year salary forward annually for 10 years by applying the overall salary increases and step payment policies within the year’s salary grid. This yields projected salaries at the end of each decade of the simulation, when we again compute the gender-based salary gap. Comparing the starting and ending salary gaps in each decade allows us to check which decade experienced the greatest decrease in the simulated gap. Although simple to execute, this simulation required a series of decisions.

First, since we needed to apply two decades worth of nominal annual salary increases and grids to the cohort’s salaries, we had to determine a process to convert salaries, or grids’ salary parameters and overall increases, to like terms. This necessitated both choosing whether to deflate salaries versus salary increases and grids, and choosing a deflator. We chose to deflate the salaries to each simulation start year rather than deflate grid parameters and salary increases because deflating fewer items would introduce less error to the simulation.

Second, we sought a deflation method that, as much as possible, ensured that the cohort’s deflated salaries fit the salary grid in place in each simulation decade’s respective start year. Ideally, the deflation method would also produce similar salary gaps at the start of each decade to provide a clear starting point for the simulation.

Because the salary data fit the internal structure of the year 24 grid, which is markedly different from the grids in place 20 or even 10 years earlier, a simple GDP deflator or consumer price deflator was not sufficient to achieve a good fit between the deflated salaries and the starting year grids. Indeed, applying a single common deflator to all salaries led to start year salaries that were unworkable, with a large proportion of salaries below floors or above ceilings. This suggested we needed to use rank-specific deflators based on the salary grids. We deflated the salaries to their decade start years using rank-specific ratios of floors from the grids. For example, to deflate a rank 4 salary to year 4, we multiplied it by 0.5056, which is the ratio of rank 4’s floor salaries of $31,393.80 and $62,091 in, respectively, years 4 and 24. This resulted in a distribution of starting salaries with similar salary gaps in the base year for each decade that also fit the starting salary grid for the simulation. As a robustness check, we also ran the simulation using comparable ceiling deflators.

Third, we needed to choose start years for the decades in the simulation from among our 24 years of data on the university’s salary increase process. Given our observations about the changes in the grids, overall salary increases and step payment policies, as well as the political changes in our province, testing the sensitivity of our results to the specific simulation start year also seemed warranted as a further robustness check. Therefore, we ran the simulation over two different choices of decades for analysis. The first compared the decades spanning years 1 through 11 and 11 through 21; the second compared the decades spanning years 4 through 14 and 14 through 24.

Table 4 describes the fit between deflated salaries and starting year grids for our simulation and robustness checks, according to choices of deflation factor and definition of decades. Both deflation method and decade definition inevitably produce variation in salary distributions for a simulation. The proportions of employees whose salaries exceed the threshold or ceiling for their rank differ based on the choices made. For example, using floor ratios to deflate the year 24 salaries back to year 1 rather than year 4 to start a simulation means that 24.4% rather than 15.8% of employees in the simulation begin the first decade with salaries above threshold for their rank, meaning they are eligible to receive the lower step 2. This means that differing portions of the cohort will experience particular salary increase trajectories over the decade, which could have implications for the closure of the simulated gap. In light of this, when we present our results in the next section, we show the gap reduction outcomes for both choices of deflation factors applied to both sets of simulation decades.

Finally, we needed to make decisions about the cohort’s career progression over time. Men and women enter, leave and retire from the institution at differing rates, and men and women at rank 5 experience differing rates of promotion to rank 6, which is consistent with the empirical literature in this area (Brown and Troutt, 2017). However, introducing hiring, promotions through ranks and departures to the simulation would necessitate assumptions that would likely blur the effects of the grid compressions. Therefore, in order to highlight the effects of the grid, we chose not to advance employees through the ranks and not to have any of the cohort retire or otherwise exit the simulation. That is, in the simulations presented, all members of the cohort remain in the cohort holding their rank throughout the two separate decades of their salary projection.