Mughal, Adil Ahmad (2022): A Theory of Convex Differentials in Economics.
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Abstract
There are proposed convex and linear functions as convex differentials among subsets of commodity and price spaces in a convex and Euclidean space linearity. These subsets are tied together in the whole commodity and price space through fixed-points' equilibrium structure in the form of nonnegative price functions.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | A Theory of Convex Differentials in Economics |
| Language: | English |
| Keywords: | Convex Differential, Fixed-point, No-Retraction, Farkas' Lemma |
| Subjects: | C - Mathematical and Quantitative Methods > C0 - General C - Mathematical and Quantitative Methods > C6 - Mathematical Methods ; Programming Models ; Mathematical and Simulation Modeling > C68 - Computable General Equilibrium Models D - Microeconomics > D3 - Distribution D - Microeconomics > D4 - Market Structure, Pricing, and Design D - Microeconomics > D4 - Market Structure, Pricing, and Design > D41 - Perfect Competition D - Microeconomics > D5 - General Equilibrium and Disequilibrium F - International Economics > F1 - Trade F - International Economics > F6 - Economic Impacts of Globalization > F61 - Microeconomic Impacts H - Public Economics > H8 - Miscellaneous Issues > H89 - Other O - Economic Development, Innovation, Technological Change, and Growth > O4 - Economic Growth and Aggregate Productivity |
| Item ID: | 114696 |
| Depositing User: | Mr Adil Ahmad Mughal |
| Date Deposited: | 26 Sep 2022 06:31 |
| Last Modified: | 26 Sep 2022 06:31 |
| References: | 1. Buxton, C. (2016). Brouwer Fixed-Point Theorem. 2. Munkres, J. R. (2018). Elements of algebraic topology. CRC press. 3. Bon-Soon, L. (2020). Short Notes. Brouwer Fixed Point Theorem on The Desk. 4. Beg, I., & Abbas, M. (2006). Fixed point theorems for weakly inward multivalued maps on a convex metric space. Demonstration Mathematica, 39(1), 149-160. 5. Lemma, S., & Schwartz, R. (2016). Notes. 6. Le, T., Le Van, C., Pham, N. S., & Sağlam, Ç. (2020). Sperner lemma, fixed point theorems, and the existence of equilibrium. 7. Harper, K. (2009). Exploration of Sperner’s Lemma and its Connections to Brouwer's Fixed Point Theorem. 8. McLennan, A. (2018). Advanced fixed-point theory for economics (Vol. 25). pp 14-15, 38-39 Singapore: Springer. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/114696 |
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