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Much of our understanding of human thinking is based on probabilistic models. This innovative book by Jerome R. Busemeyer and Peter D. Bruza argues that, actually, the underlying mathematical structures from quantum theory provide a much better account of human thinking than traditional models. They introduce the foundations for modeling probabilistic-dynamic systems using two aspects of quantum theory. The first, ´contextuality´, is a way to understand interference effects found with inferences and decisions under conditions of uncertainty. The second, ´quantum entanglement´, allows cognitive phenomena to be modeled in non-reductionist ways. Employing these principles drawn from quantum theory allows us to view human cognition and decision in a totally new light. Introducing the basic principles in an easy-to-follow way, this book does not assume a physics background or a quantum brain and comes complete with a tutorial and fully worked-out applications in important areas of cognition and decision.
Proposes a new way to build probabilistic and dynamic models of cognition and decision, challenging the traditional concepts of logic and probability theory
Applies mathematical principles from quantum theory to cognitive and decision sciences - one of the first attempts to apply principles of quantum theory to fields outside of physics
Includes an elementary tutorial of fundamental ideas; detailed applications to empirical findings; and computer programming code for many of the computational examples using MATLAB
Table of Contents
1. Why use quantum theory for cognition and decision? Some compelling reasons
2. What is quantum theory? An elementary introduction
3. What can quantum theory predict? Predicting question order effects on attitudes
4. How to apply quantum theory? Accounting for human probability judgment errors
5. Quantum inspired models of concept combination
6. An application of quantum theory to conjoint memory recognition
7. Quantum-like models of human semantic space
8. What about quantum dynamics? More advanced principles
9. What is the quantum advantage? Applications to decision making
10. How to model human information processing using quantum information theory
11. Can quantum systems learn? Quantum updating
12. What are the future prospects for quantum cognition and decision