When modeling a nonequilibrium economy, the behavior of participants is described by the same optimization problems, including the criterion and internal technological and budgetary constraints, as in the theory of Walrasian equilibrium. They are only supplemented by external restrictions on the purchase (or sale) of scarce (slow-moving) products. Various principles are known for establishing these boundaries. They can be fixed (a rigid scheme of rationing) and not depend directly on the decisions of the participant, or be determined by the demand expressed by them (flexible scheme). The presented demand for rationable products, as a rule, does not coincide with the Walrasian one. We will call it an order. In well-known models, the order is considered equal to active demand. The concept of active demand has been successfully used in price control models. However, it is not the object of the choice of participants aimed at optimizing their criteria. Meanwhile, it seems natural that manufacturers and consumers, seeking to maximize utility, are free to choose order sizes at their own discretion. Modeling of the situation arising with this approach is the goal of the present work and is based on a modification of the rationing scheme proposed by J.P. Benassi The work also considers equilibrium models at fixed prices, in which participants, when forming demand, take into account the scarcity of products and the level of satisfaction of orders. Models are used to assess the impact of taxes, government spending, and other macro-regulators on employment and national income. The paper provides an overview of literary sources in the subject area, as well as an economic interpretation of the results.

product, industry, parameters, function, balance, balance

1. van Huellen S., Qin D., Lu S., Wang H. et al. Modelling Opportunity Cost Effects in Money Demand due to Openness. 2019.

2. Gozgor G., Ongan S. Economic policy uncertainty and tourism demand: Empirical evidence from the USA. International Journal of Tourism Research. 2017. vol. 19. no. 1. pp. 99–106.

3. Lapshina M.L. Analog solutions of inverse problems of modeling linear economic systems. Control Systems and Information Technology. 2003. no. 1–2 (12). pp. 23–25. (in Russian).

4. Nelson R., Winter S. The evolutionary theory of economic change. Moscow, Finstatinform, 2000. 98 p. (in Russian).

5. Modern economic dictionary. Moscow, Infra-M., 2017. 508 p. (in Russian).

6. Na N. Mathematical economics. Springer, 2016.

7. Blecker R. A., Setterfield M. Heterodox macroeconomics: models of demand, distribution and growth. Edward Elgar Publishing, 2019.

8. Lukina O.O. A paradigm shift in the management of innovation in the conditions of economic transformation. Proceedings of VSUET. 2016. no. 4 (70). pp. 345–349. (in Russian).

9. Kleiner G.B. To the methodology of decision-making modeling by economic agents. Economics and mathematical methods. 2003. vol. 39. no. 2. pp. 167–182. (in Russian).

10. Sumin V.I., Nikitin A.E., Smolentseva T.E. Optimization of the composition of the supporting information for the development of control actions. Modern problems of science and education. 2015. no. 2. pp. 194. (in Russian).

11.