Izvorni znanstveni članak

https://doi.org/10.31341/jios.46.2.7

Evaluating Compromise in Social Choice Functions

Aleksandar Hatzivelkos orcid.org/0000-0003-4759-7177 ; University of Applied Sciences Velika Gorica, Velika Gorica, Croatia
Marcel Maretić ; Faculty of Organization and Informatics, University of Zagreb, Varaždin, Croatia

Sažetak

We investigate the notion of compromise in the strict preferential voting setting. We introduce divergence as an inverse measure of compromise in a collection of strict preferential votes. Classical functions of social choice theory are analyzed with respect to divergence. New social welfare functions and new social choice functions with the objective of compromise are defined directly from optimization of divergence and later analyzed with respect to the common desiderata of social choice theory. For a very natural function, a simple divergence minimizer, we prove it satisfies the properties of anonymity, neutrality, consistence, and continuity. Consequently, according to Young’s theorem of characterization it follows that this function is a scoring point function. Its scoring point vector is also given. Finally, we discuss the parameter p in the divergence measure which was introduced to address vagueness and fuzziness of compromise and to control for a variety of intended levels of compromise.

Ključne riječi

Social choice function; Social welfare function; Strict preferential voting; Compromise; Borda count

Hrčak ID:

291087

URI

https://hrcak.srce.hr/291087

Datum izdavanja:

22.12.2022.

Posjeta: 537 *