Related literature

The workhorse model for legislative bargaining is developed in Baron and Ferejohn (Reference Baron and Ferejohn1989) (BF), which in turn builds upon the political structure of Romer and Rosenthal (Reference Romer and Rosenthal1978), and the equilibrium structure in Rubinstein (Reference Rubinstein1982). For the infinite-horizon BF bargaining model, Eraslan (Reference Eraslan2002) shows that the stationary subgame perfect equilibrium (SSPE) payoffs are non-decreasing in recognition probability. In particular, given any distribution of recognition probabilities, the agent with a greater recognition probability earns a (weakly) higher expected payoff than the agent with a smaller recognition probability. On the other hand, we experimentally test the opposite prediction that, in finite-horizon bargaining that is otherwise similar to the Eraslan (Reference Eraslan2002) setup, the agent with a greater recognition probability might earn a strictly lower equilibrium payoff. Montero (Reference Montero, Kurz, Maaser and Mayer2022) shows that, in infinite-horizon bargaining, an agent might increase her SSPE payoff by donating part of her recognition probability to another agent. The reasoning behind this result is similar to the one that underlies our finite-period prediction; the donation reduces the donor’s continuation value relative to the other agents, which increases the donor’s chance of inclusion in the winning coalition. Other theoretical studies that investigate the value of recognition probability include Plott and Levine (Reference Plott and Levine1978), Bendor and Moe (Reference Bendor and Moe1986), Knight (Reference Knight2005), and Sethi and Verriest (Reference Sethi and Verriest2020).

Our study belongs to the substantial body of experimental literature that tests the theoretical predictions of the Baron-Ferejohn model. Our experiment confirms many common patterns in previous experiments, as identified in Baranski and Morton (Reference Baranski and Morton2022)’s meta-analysis: experienced subjects propose minimal winning coalitions and reach an agreement without delay as predicted, although the within-coalition allocations are more equal than predicted.

Despite the large number of BF bargaining experiments, to the best of our knowledge, no existing study addresses the potentially negative value of recognition probability or provides a suitable setup to test that hypothesis. A majority of BF bargaining experiments focus on infinite-horizon cases (McKelvey, Reference McKelvey1991; Fréchette et al., Reference Fréchette, Kagel and Lehrer2003, Reference Fréchette, Kagel and Morelli2005a, Reference Fréchette, Kagel and Morelli2005b, Reference Fréchette, Kagel and Morelli2005c; Reference Fréchette2009; Miller et al., Reference Miller, Montero and Vanberg2018), which are irrelevant to the negative value prediction. Our baseline treatment considers the minimal number of periods within finite multi-period bargaining (i.e., two-period) to minimize dynamic inconsistency caused by a longer horizon (J. G. Johnson and Busemeyer, Reference Johnson and Busemeyer2001). Miller and Vanberg (Reference Miller and Vanberg2015), Diermeier and Morton (Reference Diermeier, Morton, Austen-Smith and Duggan2005), Drouvelis et al. (Reference Drouvelis, Montero and Sefton2010), and Miller and Vanberg (Reference Miller and Vanberg2013) respectively study 4-, 5-, 20-, and 22-period bargaining, and most of them assume only symmetric recognition probability. The asymmetric recognition probability assumed in Diermeier and Morton (Reference Diermeier, Morton, Austen-Smith and Duggan2005) does not allow us to test our negative value hypothesis. Other experimental studies consider asymmetric disagreement value or voting weight. Diermeier and Gailmard (Reference Diermeier and Gailmard2006) and Kim and Kim (Reference Kim and Kim2022) show that a high disagreement value might induce unfavorable offers from other agents, which can result in lower expected payoffs (Miller et al. Reference Miller, Montero and Vanberg2018). Maaser et al. (Reference Maaser, Paetzel and Traub2019) find that inexperienced subjects’ bargaining behavior is sensitive to the nominal differences in voting weights, when there is no difference in real bargaining power defined by pivotality.

The design of our other experimental treatments is motivated by the findings from previous experiments on bargaining and extensive form games. For example, our implementation of the reduced-form, single-period equivalent of the two-period bargaining is motivated by the failure of backward induction observed in various experimental contexts (McKelvey and Palfrey, Reference McKelvey and Palfrey1992; Busemeyer et al., Reference Busemeyer, Weg, Barkan, Li and Ma2000; Costa-Gomes et al., Reference Costa-Gomes, Crawford and Broseta2001; J. G. Johnson and Busemeyer, Reference Johnson and Busemeyer2001; E. Johnson et al., Reference Johnson, Camerer, Sen and Rymon2002). In particular, compared to the subjects in multi-period bargaining experiments, such as Diermeier and Morton (Reference Diermeier, Morton, Austen-Smith and Duggan2005), the subjects in single-period bargaining experiments (Kim and Kim, Reference Kim and Kim2022; Diermeier and Gailmard, Reference Diermeier and Gailmard2006) seem more likely to make favorable offers to members with lower continuation values as predicted by the BF model – a pattern crucial to attaining the negative value of recognition probability. By directly comparing the baseline and the single-period treatment, we intend to determine the share of non-equilibrium outcomes and behavior that can be attributed to the multitude of interactions. Similarly, our Automated Vote treatment was designed to rule out the frequent rejection of offers above their continuation value by the non-proposer, a commonly observed behavior in bilateral bargaining (e.g., Güth and Tietz, Reference Güth, Tietz, Brandst’atter and Kirchler1985; Ochs and Roth, Reference Ochs and Roth1989; Forsythe et al., Reference Forsythe, Horowitz, Savin and Sefton1994) as well as multilateral bargaining.

Finally, our elicitation of subjects’ preference for recognition probability in our paper relates to theoretical and experimental studies that endogenize recognition probability, for example, through contests (Baranski and Reuben, Reference Baranski and Reuben2023; Kim and Kim, Reference Kim and Kim2022; Yildirim, Reference Yildirim2007, Reference Yildirim2010), all-pay auctions(Ali, Reference Ali2015), voluntary contribution (Baranski, Reference Baranski2016), and history dependence in recognition probability (Yildirim, Reference Yildirim2010; Agranov et al., Reference Agranov, Cotton and Tergiman2020). In bilateral bargaining, Güth and Tietz (Reference Güth, Tietz and Scholz1986) find that paying for proposal rights makes the subjects’ bargaining behavior closer to the theoretical prediction. We also relate our finding of suboptimal investment in high recognition probability to an intrinsic preference for power/decision rights documented in previous experiments (Bartling et al., Reference Bartling, Fehr and Herz2014; Pikulina and Tergiman, Reference Pikulina and Tergiman2020).

Model

We consider a two-period, three-player version of the BF model with a simple majority rule. The players, indexed in decreasing order of their recognition probability, $i \in \left\{ {1,2,3} \right\}$ , must divide a budget of $b$ among themselves. Let $X$ denote the set of feasible allocations, that is, $X = \left\{ {x \in {\mathbb R}_ + ^3:\mathop \sum \nolimits_{i = 1}^3 {x_i} \le b} \right\}$ , where ${x_i}$ is the amount allocated to player $i$ . Each player’s utility is simply the amount allocated to her. The players are assumed to be perfectly patient, with a discount factor equal to one.

Each player gets recognized in either period according to her recognition probability $p_i^t \in \left[ {0,1} \right]$ . In each period, we require that the recognition probabilities add up to one. $\mathop \sum \nolimits_i p_i^t = 1$ for all $t \in \left\{ {1,2} \right\}$ . Note that we allow agents to have different recognition probabilities in each period. However, we require that the order of the recognition probabilities in either period is descending according to the index of the player, that is, $p_3^t \lt p_2^t \lt p_1^t$ for each $t \in \left\{ {1,2} \right\}$ . We denote the profile of recognition probabilities in the two periods as $p = {(p_i^1,p_i^2)_{i \in \left\{ {1,2,3} \right\}}}$ .

The timing of the game is such that in each period, one agent is selected randomly according to her recognition probability to propose a feasible allocation. All players vote for or against the proposal. A proposal is accepted if and only if it receives at least two affirmative votes. If a proposal is accepted, all players receive the allocation proposed for them, and the game ends. If a proposal is not accepted in the first period, the process is repeated in the second period. If a proposal is not accepted in the second period, the game ends with all players receiving a payoff of zero.

The solution concept we use is proposer-optimal subgame perfect equilibrium. ^{Footnote 2} In the second period, a player is chosen according to the recognition probability distribution, $\left( {p_1^2,p_2^2,p_3^2} \right)$ , to propose a division of the budget, $b$ . If that proposal is voted in by a majority of players, the allocations are disbursed and the game ends. If the proposal fails to receive the required votes, all agents receive zero and the game ends. In the second period, the unique proposer-optimal subgame perfect strategy is for an agent to vote to accept any proposal. The proposer in the second period would optimally allocate herself the full budget and offer the other agents zero. ^{Footnote 3} In the second period, then, it is clearly valuable to be endowed with higher recognition probability. After the first period ends (assuming the proposal is rejected in the first period), and before the second period begins, each player’s continuation value is $p_i^2b$ .

Since the agents are risk-neutral, in the first period, no agent would vote for a proposal that offers her less than $p_i^2b$ . The proposer in the first period needs only one vote other than her own in order to get her proposal passed. Therefore, the dominant strategy in the first period is for the proposer to offer the amount $p_i^2b$ to the non-proposing agent with the lower recognition probability, and to offer zero to the non-proposing agent with the higher recognition probability. The optimal minimal winning coalition is, therefore, the coalition between the proposer and the non-proposing agent with the lower recognition probability.

This tension clearly highlights the dual nature of the value of recognition probability. It endows the agent with a higher continuation value, but it also may make the agent a less popular coalition partner. Based on the strategies described above, we can calculate the expected payoffs of the agents as a function of their recognition probabilities in each period.

(1) $${V_1}\left( p \right) = \left[ {p_1^1 \cdot \left( {1 - p_3^2} \right) + p_2^1 \cdot 0 + p_3^1 \cdot 0} \right] \cdot b$$

(2) $${V_2}\left( p \right) = \left[ {p_1^1 \cdot 0 + p_2^1 \cdot \left( {1 - p_3^2} \right) + p_3^1 \cdot p_2^2} \right] \cdot b$$

(3) $${V_3}\left( p \right) = \left[ {p_1^1 \cdot p_3^2 + p_2^1 \cdot p_3^2 + p_3^1\left( {1 - p_2^2} \right)} \right] \cdot b$$

As is evident in the equations above, the equilibrium prediction is that the game ends in the first period. If player 1 is selected as the proposer, which happens with probability $p_1^1$ , she offers $p_3^2 \cdot b$ to player 3 and nothing to player 2. Similarly, if player 2 is selected as the proposer, she offers $p_3^2 \cdot b$ to player 3 and nothing to player 1. Finally, the chance that player 3 is selected as the proposer is $p_3^1$ , and, as the proposer, she offers $p_2^2 \cdot b$ to player 2 and nothing to player 1. In each case, the proposer allocates the residual amount to herself.

Negative returns to recognition probability: From the expected payoff calculated above, it is easily shown that the returns to recognition probability need not be positive for the entire parameter space. For some parameter values, the effect on expected payoffs can be negative. For instance, suppose that the recognition probability of agents is constant over time, that is, $p_i^1 = p_i^2 = {p_i}$ for all $i \in \left\{ {1,2,3} \right\}$ . Then ${V_1}\left( p \right) \lt {V_2}\left( p \right) \lt {V_3}\left( p \right)$ simply implies that ${p_1}\left( {1 - {p_3}} \right) \lt {p_2} \lt {p_3}\left( {1 + {p_1}} \right)$ , which can hold for a substantial subset of parameters. ^{Footnote 4} The simplicity of these expected payoffs and the simple conditions for negative returns are due to the fact that we are considering a two-period game. Similar non-monotonic returns may exist in other finite-period versions of the BF model; however, with more periods, calculating the expected payoffs and evaluating the non-monotonicities in returns gets exponentially more difficult. ^{Footnote 5} The potentially negative returns to recognition probability in this setup were first noted in Baron and Ferejohn (Reference Baron and Ferejohn1989). Therefore, even though the BF model is primarily about the infinite-period version of the game, we refer to this result of non-monotonic returns to recognition probability as the BF prediction.

Experiment design

The experiment was conducted at the Center for Research in Experimental Economics and Political Decision-making at the University of Amsterdam. A total of 198 subjects recruited from the student subject pool participated in eight experimental sessions. Table 1 shows the number of subjects in each session. The experiment was coded on Otree (Chen et al., Reference Chen, Schonger and Wickens2016) based on the codes written by Nunnari (Reference Nunnari2019).

Table 1. Number of subjects

The experiment has a between-subject design with four treatments: Baseline, Modified Period 2, Automated Period 2, and Automated Vote treatments.

Baseline treatment

Each session in the baseline treatment is divided into two parts, each consisting of 15 bargaining rounds (i.e., 15 repetitions of the experimental game). Each bargaining round consists of up to two proposal periods.

At the beginning of each round, subjects are randomly assigned to groups of three members. In each group, the members are randomly assigned three roles that are labeled as colors – green, orange, or purple – as well as recognition probabilities – 36%, 33%, or 31%. ^{Footnote 6} The subjects are shown their own assigned colors and recognition probabilities, but they do not see any identifying information for the other members.

In each proposal period, all three members submit a proposal on how to allocate €60 among the three members. The allocated amounts should be in whole euros and should add up to €60. Once all members submitted their proposals, one of the group members is randomly selected according to the recognition probability. Only the recognized member’s proposal and identity (shown as her color label) are revealed to the three members of the group. Then, the three members vote for or against the proposal. A proposal is accepted if two or more members vote for the proposal. Otherwise, the proposal is rejected.

If a proposal is accepted in the first proposal period, then the bargaining round is over and the proposed allocation is implemented. If a proposal is rejected in the first proposal period, then the group moves on to the second proposal period, in which each of the three members submits a proposal again. One member is newly recognized at random according to the recognition probabilities, and the group votes again. If a proposal is accepted in the second proposal period, then the bargaining round is over and the accepted proposal is implemented. If a proposal is rejected in the second proposal period, then the bargaining round is over and all three members get €0.

Once all members vote, the subjects are shown the identity of the proposer, the recognized member’s proposed allocation, each member’s vote, and the resulting allocation, if applicable. The same information for all past bargaining rounds is summarized on a history table, which is displayed on all screens that require the subject’s decision. After each bargaining round is over, the subjects are randomly re-assigned to three-member groups for the next bargaining round. In any of the first 15 bargaining rounds, the ex-ante expected payoff according to the proposer-best subgame perfect equilibrium of the game is such that ${V_1} = 14.90$ , ${V_2} = 19.80$ , and ${V_3} = 25.30$ . The predicted allocations are illustrated in Table 2 below.

Table 2. Predicted allocations in baseline treatment

In the first part of the experiment, the subjects play 15 bargaining rounds. In the second part, they play another 15 bargaining rounds. The subjects are notified at the beginning of the experiment that there will be a second part with another 15 rounds of bargaining (and with a new set of instructions). No other information is given to the subjects about the second part of the experiment.

The 15 bargaining rounds in the second part are identical to those in the first, except for a short procedure added at the beginning of each round. This novel procedure is designed to elicit the direction of subjects’ preference for recognition probability while minimizing strategic concerns. It endogenously determines the assignment of the three roles in each group. More specifically, each subject receives an endowment of €1 and is shown the recognition probability associated with each role (labeled by color). Then, the subject is asked to indicate her preferred role and the amount that she would like to pay out of the €1 endowment (in increments of €0.10) to increase the likelihood of being assigned the role that she prefers.

All three members indicate their preferred roles and the amounts they would like to pay. However, only one member is selected at random, and the selected member’s indication determines the role assignments within the group. The three members are equally likely to be selected. If the selected member chooses to pay €0, all three roles are randomly assigned to the selected member with equal probabilities. Every additional €0.10 the selected member pays increases the likelihood of her preferred role being assigned to her by 1/15. If the selected member chose to pay €1, she is assigned her preferred role with certainty. In any case, the two roles not assigned to the selected member are assigned to the two remaining members with equal probability. ^{Footnote 7} For that round, the selected member pays the amount she indicated, whereas the other two members keep the entire €1 endowment.

To clarify, the procedure described above is not an auction or a contest for recognition probability. When the member is not selected in this procedure, her choice of role and payment is irrelevant. If a member chooses to pay nothing towards role allocation and is then selected to influence the allocations, she is allocated any of the three roles with equal probability. Her expected continuation value (outside of the €1 endowment) will be exactly €20 in this case. If the selected member had chosen to pay the whole €1 towards her preferred role, she would have earned the continuation value associated with that role. Therefore, it is optimal for each member to pay the whole €1 to be allocated the role that offers the highest continuation value if that continuation value is at least €21. If no role offers a continuation value of at least €21, then it is optimal for the member to pay 0 towards role allocation. In other words, the procedure incentivizes the subjects to express their preference for recognition probability without facing the strategic concerns present in bid/effort choices in auctions or contests. ^{Footnote 8}

The proposer-best subgame perfect equilibrium predicts that the continuation values for each role (outside of the €1 endowment) are ${V_1} = 14.90$ , ${V_2} = 19.80$ , and ${V_3} = 25.30$ in all treatments other than the Modified Period 2 treatment. In these treatments, paying the entire endowment of €1 for the role with the smallest recognition probability (role 3) is the dominant strategy. Conditional on being selected for paying, this strategy yields an expected continuation value of €25.30, whereas paying €0 allows the member to keep the €1 endowment but results in an expected continuation value of €20.

At the end of the experiment, one of the 30 bargaining rounds is randomly selected for all subjects, with equal probability. The subjects are paid in cash a €10 participation fee in addition to the payoff they earned in the randomly selected round: the allocation from the bargaining plus any remaining endowment from that round, if applicable.

Modified Period 2 Treatment

Modified Period 2 Treatment is identical to the baseline treatment except that the recognition probabilities in the second period differ. In particular, the three members in each group are assigned the following recognition probabilities:

• 36% in period 1 and 70% in period 2

• 33% in period 1 and 26% in period 2

• 31% in period 1 and 4% in period 2

These recognition probabilities provide stronger incentives for the proposer to form a minimal winning coalition with the player who has the lowest recognition probability.

Using the equations described in “Model,” we find that the equilibrium continuation values for each role are ${V_1} = 20.74$ , ${V_2} = 23.84$ , and ${V_3} = 15.42$ . The predicted allocations are provided in Table 3 below. Following similar reasoning, paying the entire endowment of €1 for the role with the middle recognition probability is the dominant strategy in this treatment. ^{Footnote 9}

Table 3. Predicted allocations in Modified Period 2 treatment

Hypotheses

Let ${V_1}$ , ${V_2}$ , and ${V_3}$ denote the expected payoffs of the members with the high, middle, and low recognition probability respectively. We test the following hypotheses:

1. a. In Baseline treatment: ${V_1} \lt {V_2} \lt {V_3}$

2. b. In Modified Period 2 treatment: ${V_3} \lt {V_1} \lt {V_2}$