[1] |
M. Anokye, F.T. Oduro. Cobweb model with buffer stock for the stabilization of tomato prices in Ghana. J. Manag. Sust., 3(1), 2013. https://doi.org/10.5539/jms.v3n1p155. · doi:10.5539/jms.v3n1p155 |
[2] |
M. Anokye, F.T. Oduro. Maize price stabilization in Ghana: an application of a continuous-time delay differential equation model with buffer stock. British J. Math. Comp. Sci., 6(4):279-296, 2015. https://doi.org/10.9734/BJMCS/2015/14892. · doi:10.9734/BJMCS/2015/14892 |
[3] |
G. Athanasiou, I. Karafyllis, S. Kotsios. Price stabilization using buffer stocks. J. Econ. Dyn. Control, 32(4):1212-1235, 2008. · Zbl 1181.91165 |
[4] |
K. Bradbury, L. Pratson, D. Patino-Echeverri. Economic viability of energy storage systems based on price arbitrage potential in real-time U.S. electricity markets. Appl. Energy, 114(C):512-519, 2014. |
[5] |
D. Brennan. Price dynamics in the bangladesh rice market: implications for pub-lic intervention. Agr. Econ., 29(1):15-25, 2003. https://doi.org/10.1111/j.1574-0862.2003.tb00144.x. · doi:10.1111/j.1574-0862.2003.tb00144.x |
[6] |
R. Franke. Reviving Kalecki’s business cycle model in a growth context. J. Econ. Dyn. Control, 91(C):157-171, 2018. https://doi.org/10.1016/j.jedc.2017.12.00. · Zbl 1401.91277 · doi:10.1016/j.jedc.2017.12.00 |
[7] |
B. Martina, N. Veronika. The use of functional differential equations in the model of the meat market with supply delay. Procedia -Soc. Behav. Sci., 213:74-79, 2015. https://doi.org/10.1016/j.sbspro.2015.11.406. · doi:10.1016/j.sbspro.2015.11.406 |
[8] |
S. Mitra, J.M. Boussard. A simple model of endogenous agricultural commodity price fluctuation with storage. SSRN Electr. J., 2011. https://doi.org/10.2139/ssrn.1908115. · doi:10.2139/ssrn.1908115 |
[9] |
D. Watts, F.L. Alvarado. The influence of futures markets on real time price stabilization in electricity markets. In Proceedings of the |
[10] |
Annual Hawaii International Conference on System Sciences, 2004. https://doi.org/https://doi.org/10.1109/HICSS.2004.1265167. REZIUMĖ Rinkos kainos stabilumo tyrimas taikant Lamberto funkciją I. Jankauskienė, T. Miliūnas Šiame straipsnyje nagrinėsime rinkos kainos stabilumą, kintant rinkos intensyvumo rodikliui ir vėlav-imo argumentui. Rinkos kaina aprašome tiesinę skaliarinę diferencialinę lygtį su vėluojančiu argu-mentu. Taikysime lygtį atitinkančios transcendentinės charakteristinės lygties šaknų radimo metodą, pagrįsta Lamberto funkcijų panaudojimu. Pateiksime metodo taikymo pavyzdžius. · doi:10.1109/HICSS.2004.1265167 |
[11] |
Raktiniai žodžiai: diferencialinė lygtis; vėlavimo argumentas; Lamberto funkcija; rinkos kaina Liet. matem. rink. Proc. LMS, Ser. A, 61:13-17, 2020 · Zbl 1536.91170 · doi:10.15388/LMR.2020.22468 |