project |
project_id |
1M0572 |
agency |
GA MŠk |
ARLID |
cav_un_auth*0001814 |
|
project |
project_id |
GA102/08/0567 |
agency |
GA ČR |
ARLID |
cav_un_auth*0239566 |
|
research |
CEZ:AV0Z10750506 |
abstract
(eng) |
Coalition games are generalized to semisimple MV-algebras. Coalitions are viewed as [0,1]-valued functions on a set of players, which enables to express a degree of membership of a player in a coalition. Every game is a real-valued mapping on a semisimple MV-algebra. The goal is to recover the so-called core: a set of final distributions of payoffs, which are represented by measures on the MV-algebra. A class of sublinear games are shown to have a non-empty core and the core is completely characterized in certain special cases. The interpretation of games on propositional formulas in Łukasiewicz logic is introduced. |
reportyear |
2012 |
RIV |
BA |
mrcbC52 |
4 A 4a 20231122134547.1 |
permalink |
http://hdl.handle.net/11104/0197545 |
mrcbT16-e |
COMPUTERSCIENCETHEORYMETHODS|LOGIC |
mrcbT16-f |
0.567 |
mrcbT16-g |
0.038 |
mrcbT16-h |
8.5 |
mrcbT16-i |
0.00218 |
mrcbT16-j |
0.486 |
mrcbT16-k |
424 |
mrcbT16-l |
52 |
mrcbT16-s |
0.804 |
mrcbT16-4 |
Q1 |
mrcbT16-B |
38.951 |
mrcbT16-C |
57.709 |
mrcbT16-D |
Q3 |
mrcbT16-E |
Q2 |
arlyear |
2011 |
mrcbTft |
\nSoubory v repozitáři: kroupa-0359839.pdf |
mrcbU14 |
79956159799 SCOPUS |
mrcbU34 |
000290588300006 WOS |
mrcbU63 |
cav_un_epca*0253859 Journal of Logic and Computation 0955-792X 1465-363X Roč. 21 č. 3 2011 479 492 |