Submitted:
28 July 2025
Posted:
20 August 2025
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Abstract
Keywords:
1. Introduction
2. Dichotomous Valuation
2.1. Equality of Employment Opportunity
- First Layer: The size of the employed subset follows a binomial distribution with parameters , where p is the probability that any given individual is employed.
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Second Layer: The employment probability p is treated as a random variable with a beta prior distribution characterized by hyperparameters . The joint probability density of p and is given by:This implies that the marginal probability of observing t employed individuals is:for any
- Third Layer: Given an employment size t, all subsets of size t are equally likely to be the employed group . Since there are such subsets, the probability of a specific employment scenario is:
2.2. Aggregate Values of the Employed and the Unemployed
- Event 1: (i.e., the individual is currently employed). In this case, the marginal contribution of i is given by the difference , referred to as the marginal gain. This represents the value added by individual i due to their presence in the employed group . The expected marginal gain is defined as:where “” denotes definition and “” represents the expectation with respect to the probability distribution of .
- Event 2: (i.e., the individual is currently unemployed). This may occur if the individual has just entered the labor market (e.g., after completing school) or is experiencing cyclical, structural, or frictional unemployment. In this case, the marginal contribution is , representing the marginal loss due to the absence of i from the workforce. If i were included in , production would increase by this amount. The expected marginal loss is defined as:
- Compensation for Human Capital: In addition to receiving employment welfare, employed individuals are compensated for their labor. This compensation reflects the value of human capital used in generating . Human capital is developed not only through current employment but also through prior work experience and pre-employment education. In contract, unemployed individuals receive only unemployment benefits.
- Observability of Marginal Contributions: When , the value is unobservable; we can only observe . Similarly, when , we cannot simultaneously observe both and . Therefore, it is necessary to transform aggregate marginal values into observable forms, as outlined in Theorem 1.
- Redistribution of Surplus: The total employment welfare, , does not equal the total value . As a result, some of the surplus is redistributed to the unemployed individuals in . This redistribution occurs not through direct transfers, but via government taxation and unemployment benefit systems. This mechanism also supports national-level welfare and benefits, as formalized in Theorem 1.
3. Accounting Identities for a Balanced Budget
3.1. A Real-Time Balanced Budget Rule
- Public Reserve: A reserved proportion is set aside for collective societal and economic purposes. This portion is not distributed directly to individuals.
3.2. The Set of Feasible Solutions
4. An Optimal Fair Tax Rate
4.1. Asymptotic Risk-Free Tax Rate
- Limit Behavior: The stability described is achieved only in the limit as , where the variance approaches zero. In practice, remains subject to exogenous shocks, as discussed by Pissarides (1992) and Blanchard (2000). Therefore, the minimum limiting variance is greater than zero.
- Practical Adjustment: While is the limiting tax rule, for large but finite n, a small positive adjustment may be added to ensure the positivity of and . For example,ensures that the denominators in Eq. (11) remain positive, thereby guaranteeing and . This adjustment becomes negligible as n grows large.
- Labor Mobility: With near-zero variance in the unemployment rate, labor mobility implies that layoffs and new hires nearly offset each other, keeping the total employment size s nearly constant. It also means that the number of employed individuals s changes proportionally with the labor market size n. Consequently, the employment rate remains stable.
- Asymmetric Risk Minimization: Although the posterior distribution is skewed, the -rate tax rule minimizes both total and one-sided risks in , as further elaborated in Theorem 4. Policymakers are particularly concerned with downside risk.
4.2. Consistency and Robustness
5. Labor Productivity and Equality of Outcome
- for any ; and
- for any with .
6. Applications and Labor Costs
6.1. Voting Rights
6.2. Health Insurance
6.3. Dynamic Highway Toll
6.4. Feature Selection in Machine Learning and Econometrics
| Algorithm 1:Feature Selection by a Fair Division Rule |
|
6.5. Labor Costs
7. Discussion and Conclusions
Supplementary Materials
Funding
Conflicts of Interest
Abbreviations
Appendix A. Proof of Theorem 1
Appendix B. Proof of Lemma 1
Appendix C. Proof of Theorem 2
Appendix D. Proof of Theorem 3
- if ;
- if .
Appendix E. Proof of Theorem 4
Appendix F. Proof of Theorem 5
Appendix G. Proof of Theorem 6
Appendix H. Proof of Theorem 7


Appendix I. Proof of Theorem 8
Appendix J. Proof of Corollary 2
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