A first introduction to S-Transitional Lotteries
AbstractIn this paper I shall introduce a new method by which it is possible to study the dynamical decision maker's behaviour. It can be tought of as an application of the S -Linear Algebra of Professor David Carfì, thus this theory it is assumed to be known. I shall focus on the Feynman's propagator and thus the Feynman-Strati propagator. The latter stems form the former. It will be of utmost importance so as to give a meaning to both the evolution and the H-operator by which I shall derive the probability density of this kind of tempered distribution
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Bibliographic InfoPaper provided by University Library of Munich, Germany in its series MPRA Paper with number 39399.
Date of creation: 12 Jun 2012
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Feynman diagram; Feynman propagator; Green's function; Decision Theory; Lotteries;
Find related papers by JEL classification:
- C02 - Mathematical and Quantitative Methods - - General - - - Mathematical Economics
- D8 - Microeconomics - - Information, Knowledge, and Uncertainty
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- Strati, Francesco, 2012. "The nature of the S-linear algebra: For an S-propagator," MPRA Paper 39525, University Library of Munich, Germany.
- Strati, Francesco, 2012. "From the Bochner integral to the superposition integral," MPRA Paper 39615, University Library of Munich, Germany.
- Strati, Francesco, 2013.
"Le Preferenze Condizionate: Una Introduzione
[Conditional preferences: an introduction]," MPRA Paper 46782, University Library of Munich, Germany.
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