3.1. Key assumptions

A population of agents live in a temporally varying environment which can change between generations with probability, γ (0 ≤ γ ≤ 1). The parameter γ is a measure of environmental volatility; for example, γ = 10% implies that the environment changes, on average, once every 10 generations. We assume the environment can take an infinite number of states. If the environment changes then the new environment renders all prior knowledge obsolete. Put another way, a change implies an environmental state that has never been experienced before (Feldman et al., Reference Feldman, Aoki and Kumm1996). Each environmental state requires its own uniquely tailored behaviour, where any other behaviour is assumed to be equally ineffective.

Each agent has a baseline fitness, which we assume to be zero. As is customary in evolutionary models, the baseline fitness is a scaling parameter. A baseline fitness of zero might not imply that the agent in question does not survive (Maynard Smith, Reference Maynard Smith1982: 11). Resources that enable the achievement of the baseline fitness are determined by the carrying capacity of the environment. If the agent acquires the appropriate behaviour for their current environment they receive a fitness benefit of one unit over and above the baseline fitness. An agent who does not have the appropriate behaviour receives no fitness benefit beyond the baseline fitness. The agents’ goal is to maximise their fitness, which is accomplished by inferring (learning) the uniquely appropriate behaviour for each environment that they live in. Agents are genetically determined (hard-wired) to be either individual learners or social learners. An individual learner is an agent who can and will only acquire knowledge and behaviour through their own independent discovery. In contrast, a social learner is an agent who can only acquire new knowledge and behaviour through imitation. Social learners imitate a random agent of the previous generation. Naturally, a social learner can only acquire the appropriate behaviour when the agent who they imitate has already acquired the appropriate behaviour for the current environmental state in a prior generation, which is only possible when the environmental state has not changed.

Individual learners expend c amount of resources (the individual learning ‘cost’), which guarantees that they acquire the appropriate behaviour for the current state of the environment, and this allows them to achieve a fitness of 1 − c. A social learner imitates the behaviour of a random member of the previous generation by expending s amount of resources (the social learning ‘cost’). Since social learners are not guaranteed to acquire the appropriate behaviour, their fitness is either, 1 − s if they happen to imitate an agent from the previous generation who had already acquired the appropriate behaviour and the environment has not changed, or their fitness is −s (i.e. the agent achieves zero benefit but expends the social learning cost). We assume that 1 > c > s ≥ 0 to reflect the fundamental premise that social learning is efficient from a resources standpoint, also known as the costly information hypothesis (Henrich & Henrich, Reference Henrich and Henrich2007).

We explore the notion that even when learning resources are expected to be sufficient at the population level, this does not necessarily translate to an adequate provision of resources at the agent level. Indeed, variability in the provision of learning resources to individuals (manifested as random individual resource endowments) implies that some agents obtain sufficient resources to perform their desired mode of learning, while others may not. The probability that an agent obtains their required resources is determined by their type. Thus, neither type of agent is guaranteed resources but the likelihood an agent obtains sufficient resources depends on their type.

The manifestation of such an assumption appears straightforward. The reason resources at a population level translate to a random resource endowment at an agent level reflects the reality of private and public organisations alike. Organisations must cater to many diverse, and often conflicting, -objectives. For example, a local government must decide how to allocate their resources to a range of activities (segments) such as healthcare, infrastructure, education, social support, etc. This requires some population-level allocation mechanism, where the total resource pool is split amongst the different segments. How the overall pool of resources is split between the different objectives (i.e. population level allocation mechanism) is fairly stable, i.e. it is an infrequent decision (see Si et al., Reference Si, Kavadias and Loch2022, and references therein). In contrast, within each segment individuals frequently seek to attain resources for their specific initiatives. For example, division managers in private companies regularly meet to consider potential project ideas for the organisation to pursue. Naturally, only some of these are fully funded, and others are not funded at all (Rajan & Zingales, Reference Rajan and Zingales2001; Harris et al., Reference Harris, Kriebel and Raviv1982; Bower, Reference Bower1972). The lack of guaranteed project funding is captured by a random endowment of resources to each agent.

Rudimentary forms of allocating resources across various objectives, such as public works or military campaigns, can be traced back to elementary budgeting activities in the ancient civilisations of Egypt and Mesopotamia (Eyre, Reference Eyre2013; Silver, Reference Silver1995). Modern concepts of budgeting in governments began to take shape in Victorian Britain. The British Chancellor of the Exchequer William Gladstone played a significant role in developing the parliamentary budgeting process, where detailed annual budgets were presented to the Parliament for scrutiny (Matthew, Reference Matthew1979). This process was diffused amongst businesses in the early 1920s when James McKinsey, an accounting professor at the University of Chicago and founder of the namesake consulting company, promoted the idea of using budgets as a means to plan and control business operations (McKinsey, Reference McKinsey1923). Despite the lack of evidence in support or against the existence of such ‘budgeting’ activities in ancestral societies, it is not beyond reason to expect that some similar process to those of more modern times could have taken place within smaller group settings, such as groups, e.g. how many members should pursue hunting vs. staying behind for the group's protection.

Critically, individuals from different divisions or segments may not face the same probability of obtaining their required resources. The population-level allocation mechanism is meant to reflect the objectives and or standards of a particular society and/or organisation. There is no universally ‘correct allocation’ of resources across all organisational settings. To some ‘correct’ may imply that all individuals have an equal likelihood of obtaining their required resources, independent of which segment or division they are in. To others, the correct allocation might imply that all individuals must draw from the same distribution, such that those individuals with greater needs would have a lower chance of fulfilling their demand for resources. Alternatively, the opposite could be true, where the allocation is based on needs or consumption. We do not argue the benefits or appropriateness of one allocation mechanism or another, rather, our conceptualisation accommodates all of these options and assumes that the population-level mechanism is given. What matters to us is that the individual-level endowment is random and determined by the organisation's group level allocation decision.

We formalise the resource allocation mechanism as follows. We denote by x the frequency of the social learners and 1 − x the frequency of individual learners in the population. We assume that R is the average amount of total resources to be shared among all the agents in the population. We assume that R > c to ensure that the overall population-level quantity of learning resources is on average sufficient to support all individual agents, even if the entire population were individual learners each expending the maximum resources c. The total resources R must be shared between the two types of agents in the population. Let λ be the share of the resources allocated to the x social learners, and likewise, 1 − λ, be the share of the resources allocated to the 1 − x individual learners. In this manner, λ characterises the population-level allocation of resources, which directly translates to the likelihood that each type of agent will obtain sufficient resources to carry out their desired learning function. Notably, this conceptualisation of the allocation mechanism is general enough to capture settings when individual (social) learners have a higher probability of obtaining sufficient resources as compared with social (individual) learners, or when either type of agent has an equal probability of obtaining their desired resources. We formally define the ranges of λ that correspond to the aforementioned settings below.

Based on the group-level allocation mechanism, individual learners receive a random endowment of resources, u _i, which is drawn from a uniform distribution with an interval [0, ^2(1−λ)R/_(1−x)]. Likewise, each social learner draws a random endowment, u _s, from a uniform distribution with an interval [0, ^2λR/_x]. Our modelling of the random endowment reflects that agents of the same type will on average obtain the same resources, where the sum of these individual endowments will, on expectation, equal the share of the total resources allocated to the focal type. A similar setting has been studied by Requejo and Camacho (Reference Requejo and Camacho2011, Reference Requejo and Camacho2012) in the context of the evolution of cooperation.

3.2. Analysis

When resources are uncertain, only a fraction of the population of agents will receive sufficient resources for their desired activity. The probability that an individual learner will be endowed with enough resources, $\Pr ( {u_i > c} )$, is δ _i(x) and the probability that a social learner will be endowed with enough resources, $\Pr ( {u_s > s} )$, is δ _s(x), where

(3.1)$$\eqalign{\delta _i( x) & = 1-\displaystyle{c \over {2( 1-\lambda ) R}} + \displaystyle{{cx} \over {2( 1-\lambda ) R}} \cr \delta _s( x) & = 1-\displaystyle{{sx} \over {2\lambda R}}} $$

Note that δ _i(x) is increasing in x whereas δ _s(x) is decreasing in x. The intuition for this is as follows: when the resources need to be split between fewer agents, the probability of obtaining sufficient resources increases. In other words, an increase in x means fewer individual learners but more social learners, which increases δ _i(x) and decreases δ _s(x). We can now formally characterise the allocation point λ = Λ_d where the two types of agents have the same likelihood of obtaining sufficient resources to carry out their desired activity, $\Pr ( {u_i > c} ) = \Pr ( {u_s > s} )$, which equivalently translates to δ _i(x) = δ _s(x). This yields Λ_d = sx/[sx + c(1 − x)]. Consequently, when λ < Λ_d (λ > Λ_d) it implies an individual (a social) learner will have a higher probability of obtaining their required resources than a social (an individual) learner would.

Let q(x) denote the frequency of tuned agents in the current generation, i.e. agents who have acquired the appropriate behaviour for the current state of the environment. Assuming the frequency of the tuned agents in the next generation, to be q ^′(x) we can derive the recursion that governs the evolution of the tuned population. If the environment does not change in the next period, an event with probability 1 − γ, then the frequency of tuned agents in the next generation, q ^′(x), will comprise all of the individual learners with enough learning resources, and the fraction of social learners with enough learning resources who copied a tuned agent from the current generation. If the environment changes, an event with probability γ, only the individual learners who have sufficient learning resources will be tuned to this new environment and all social learners become non-tuned. Therefore, the frequency of the tuned agents in the next generation, q′, is:

(3.2)$$\eqalign{{q}^{\prime} & = ( 1-\gamma ) [ \delta _i( x) ( 1-x) + \delta _s( x) q( x) x] + \gamma \delta _i( x) ( 1-x) \cr & = \delta _i( x) ( 1-x) + ( 1-\gamma ) \delta _s( x) q( x) x} $$

The fixed point q*(x) of the above recursion is

(3.3)$$q^\ast ( x ) = \displaystyle{{( {1-x} ) \delta _i( x ) } \over {1-( {1-\gamma } ) \delta _s( x ) x}}$$

When access to resources is uncertain, not all individual learners are able to acquire the appropriate behaviour. Specifically, the fraction 1 − δ ₁(x) of them who do not obtain sufficient resources are unable to perform their learning function. We assume that these individual learners get the baseline fitness of zero (an assumption we relax in Section 4). Therefore, the average fitness of individual learners depends on the fraction of individual learners who obtain sufficient resources. The average fitness of the individual learners is then

(3.4)$$W_i( x ) = ( {1-c} ) \delta _i( x ) $$

Following a similar logic, a social learner's ability to acquire the appropriate behaviour depends on the number of tuned agents in the population and the availability of sufficient resources. Thus, a social learner's expected fitness is (1 − γ)q*(x) − s when they have sufficient resources available (an event with probability δ ₂(x)), and zero if they are unable to obtain sufficient resources. Hence, the average fitness of the social learners is:

(3.5)$$W_s( x ) = \delta _s( x ) [ {( {1-\gamma } ) q^\ast ( x ) -s} ] = \displaystyle{{( {1-\gamma } ) \delta _s( x ) \delta _i( x ) ( {1-x} ) } \over {1-( {1-\gamma } ) \delta _s( x ) x}}-\delta _s( x ) s$$

The evolutionary stable strategies (ESS) condition dictates that the long-run equilibrium frequency of social learners, x*, satisfies W _i(x*) = W _s(x*) (Maynard Smith, Reference Maynard Smith1982; Weibull, Reference Weibull1997; Hofbauer & Sigmund, Reference Hofbauer and Sigmund1998). Therefore, x* is given by

(3.6)$$( {1-c} ) \delta _i( {x^\ast } ) + s\delta _s( {x^\ast } ) = \displaystyle{{( {1-\gamma } ) \delta _s( {x^\ast } ) \delta _i( {x^\ast } ) ( {1-x^\ast } ) } \over {1-( {1-\gamma } ) \delta _s( {x^\ast } ) x^\ast }}$$

At the equilibrium frequency x* > 0, the values of fitness of the individual and social learners are equal and therefore the mean fitness of the population $\bar{W}( {x^\ast } )$ is $\bar{W}( {x^\ast } ) = W_i( {x^\ast } ) > W_i( 0 )$. Hence, social learning offers an improvement to the mean fitness at the population level. This holds when the condition W _s(0) ≥ W _i(0) is satisfied, which translates into an upper bound for the splitting parameter λ, given by

(3.7)$$\lambda \le 1-\displaystyle{{c( {c-\gamma } ) } \over {2R( {c-s-\gamma } ) }}$$

Figure 1 provides a graphical depiction of the equilibrium fraction of social learners when the access to the resources at the individual agent level is guaranteed (red colour) or uncertain (blue colour); the individual (social) learners’ fitness is represented by dashed (solid) lines.

Figure 1.

Fitness of individual and social learners as a function of social learners’ frequency. In this example γ = 0.10, c = 0.50, s = 0.20, R = 0.60 and λ = 0.25. Red lines are the guaranteed resources model (Rogers) and blue lines are the uncertain resources model. The ESS frequency is at the intersection of individual learning and social learning curves.

It is important to note under what conditions our model will revert to the same results as derived in the original Rogers model (Rogers, Reference Rogers1988). The condition is straightforward: when the overall population resources are large enough (R → ∞) to guarantee individual agent access to their required resources (δ _i(x) → 1 and δ _s(x) → 1). When R → ∞ then the fixed point of tuned agents of (3.3) becomes $q_r^\ast{ = } ( {1-x} ) {\rm /}[ {1-( {1-\gamma } ) x} ]$, the fitness of social learners of (3.5) becomes $W_{s, r} = ( {1-\gamma } ) q_R^\ast{-}s$, the fitness of individual learners is W _i,r = 1 − c, and the equilibrium frequency of social learners becomes

(3.8)$$x_r^\ast{ = } \displaystyle{{c-s-\gamma } \over {( {1-\gamma } ) ( {c-s} ) }}$$

Note that $\bar{W}_r( x_r^\ast ) = \bar{W}_r( 0) = W_{i, r}$, i.e. social learners do not improve the overall population's average fitness. This last observation is a key result of Rogers’ (1988) paper. However, note that our derivation is different because we analyse an infinite environmental states setting.

There is another, less obvious, condition for which our model also reverts to the Rogers result. It emerges from a specific division of the population resources: when the percentage of the overall population resources allocated to social learners, λ, is exactly the same as the fraction of social learners x*, then the distributions from which each type of agent draws their resource endowment are the same. In this special case, the probability that each agent obtains their required resources becomes independent of the frequency of each type of agent. When this happens, our model produces the same results as the Rogers analysis, i.e. the presence of social learners do not provide a benefit to the fitness of the overall population.

Figure 2 depicts the mean fitness of the population at equilibrium as a function of the maximum total resources allocated to the population R for various choices of the environmental variability γ and the cost of social learning s. We also show how the population fitness converges to the Rogers fitness at equilibrium in the limiting case when R is large enough.

Figure 2.

Fitness at equilibrium as a function of the expected population level resources, R. The dashed blue line shows Rogers’ equilibrium fitness (invariant to all parameters but c), the solid blue lines represent the baseline of c = 0.50, λ = 0.25, γ = 0.1, and -s- = 0.1 and the red line depicts (A) a 0.1 increase in γ and (B) a 0.1 increase in s.