Algebras of Interaction and Cooperation

Ulrich Faigle, Alexander Schonhuth

Abstract


Systems of cooperation and interaction are usually studied in the context of real or complex vector spaces. Additional insight, however, is gained when such systems are represented in vector spaces with ultiplicative structures, i.e., in algebras. Algebras, on the other hand, are conveniently viewed as polynomial algebras. In particular, basic nterpretations of natural numbers yield natural polynomial algebras and offer a new unifying view on cooperation and interaction. For example, the concept of Galois transforms and zero-dividends of cooperative games is introduced as a nonlinear analogue of the classical Harsanyi dividends. Moreover, the polynomial model unifies various versions of Fourier transforms. Tensor products of polynomial spaces establish a unifying model with quantum theory and allow to study classical cooperative games as interaction activities in a quantum-theoretic context.

Keywords


Ctivity System; Cooperative Game; Decision System; Evolution; Fourier Transform; Galois Transform; Interaction System; Measurement; Quantum Game.

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References


U. F AIGLE, Mathematical Game Theory, World Scientific, New Jersey, 2022, ISBN 9789811246692.

L. VAN DER WAERDEN, Algebra I, Springer Heidelberg, DOI https://doi.org/10.1007/978-3-642-85527-6

G. O WEN: Multilinear extension of games, Management Sci. 18 (1972), 64–79.

F AIGLE AND M. GRABISCH: Bases and linear transforms of TU-games and cooperation systems, Int. J. of Game Theory 45 (2016), 875–892.

F AIGLE AND M. GRABISCH: Bases and linear transforms of TU-games and cooperation systems, Int. J. of Game Theory 45 (2016), 875–892.

U. F AIGLE AND M. GRABISCH: Polynomial representation of TU-games, arXiv (2024), https://arxiv.org/abs/2401.12741

U. F AIGLE AND G. GIERZ: Markovian statistics on evolving systems, Evolving Systems 99 (2018), 213-–225. https://doi.org/10.1007/s12530017-9186-8




DOI: http://dx.doi.org/10.30829/zero.v8i1.19947

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Department of Mathematics
Faculty of Science and Technology
Universitas Islam Negeri Sumatera Utara Medan 

Email: mtk.saintek@uinsu.ac.id

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