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27280 - Seminars (1) (G.A)

Academic Year 2024/2025

                
                        Docente:
                        Daniele Molinini
                    
                        Credits:
                        6
                    
                        Language:
                        Italian
                    
                        Teaching Mode:
                        Traditional lectures
                        
                            Campus:
                            Bologna
                        
                            Corso:
                            First cycle degree programme (L) in
                            Philosophy (cod. 9216)

                            Teaching resources on Virtuale
                        
                                    Course Timetable
                                
from Apr 01, 2025 to May 15, 2025

Learning outcomes

The philosophy Seminars propose general objectives, which are those specific teaching seminar: (1) to train the students to philosophical discussion urging participation in conferences and presentations of Italian and foreign scholars; (2) deepen the topics of the courses through participation in philosophical lectures by specialists also of other universities; (3) broaden their thematic and methodological horizons to complete offered teaching.

Course contents

The seminar Numbers, elephants, reality: mathematical representation and explanation provides the student with an overview of the philosophical debate concerning the representational and explanatory role of mathematics in the empirical sciences. By the end of the course, the student will have acquired the ability to identify the historical roots of this debate and she/he will be able to recognize some of the issues involved in the philosophical study of the processes of mathematization of reality. Furthermore, she/he will be able to identify some connections between the topics covered in the course and other discussions that are central to the philosophy of science.

The seminar has three parts:

1) In the first part it is outlined, historically and philosophically, the so-called 'problem of the applicability of mathematics', namely the philosophical problem of accounting for the effectiveness of mathematics in describing and predicting the phenomena dealt with within the empirical sciences. In this part, the following issues are addressed:

The applicability problem as a metaphysical problem (numbers vs elephants)

The historical roots of the applicability problem (numbers and Pythagorean harmonics)

The discovery of incommensurability ('not everything is number').

2) The second part focuses on the philosophical analysis of the notion of mathematical explanation of empirical phenomena. The topics covered are as follows:

Description and explanation in the empirical sciences

Descriptive and explanatory knowledge in Aristotle (in particular, excerpts from chapters I and II of the Posterior Analytics will be examined)

Mathematical explanation and case-studies: a) an impossible walk along the seven bridges of Königsberg ; b) hexagons and honeycombs

Mathematical explanation in the empirical sciences

3) In the third part some contemporary issues and philosophical standpoints that relate to the problem of the applicability of mathematics and the debate on the explanatory role of mathematics in the empirical sciences are introduced. This part is devoted to three themes:

Philosophical models of applicability and mathematical explanation

Inference to the best (mathematical) explanation and mathematical realism

Converse applicability

Important information regarding the Seminar:

-- Access to the seminar is not limited in number, so there is no need to enroll via Studenti Online or to contact the instructor regarding enrollment.

-- Students are invited to sign up for the Seminar on Virtuale to access the teaching materials.

Readings/Bibliography

Required readings (mandatory):

Carrara, M., De Florio, C., Lando, G., & Morato, V. (2021). Introduzione alla metafisica contemporanea. Il Mulino. [Capitolo 13]

Laudisa, F., & Datteri, E. (2013). La natura e i suoi modelli. Un'introduzione alla filosofia della scienza. ArchetipoLibri. [Capitoli 3 e 7]

Molinini, D. (2014). Che cos’è una spiegazione matematica. Carocci.

Molinini, D., & Panza, M. (2014). Sull’applicabilità della matematica. In A. Varzi & C. Fontanari (a cura di), La matematica nella società e nella cultura - Rivista della Unione Matematica Italiana, Serie I (Vol. VII, pp. 367–395).

Morganti, M. (2016). Filosofia della fisica. Carocci. [pp. 115–131]

Suggested readings (not mandatory):

Aristotele (2007). Analitici secondi (M. Mignucci, a cura di). Laterza. [Introduzione "Conoscenza dimostrativa" di Jonathan Barnes]

Feynman, R. (1971). La legge fisica. Bollati Boringhieri. [Capitolo 2 "La relazione fra matematica e fisica"]

Frajese, A. (1954). La scoperta dell'incommensurabile nel dialogo Menone. Bollettino dell'Unione Matematica Italiana, Serie 3, 9, 74–80.

Molinini, D. (2020). Il ruolo della matematica nell’ideale aristotelico di conoscenza scientifica. In G. Lolli & F. S. Tortoriello (a cura di), L’arte di pensare. Matematica e filosofia(pp. 1–39). UTET Università.
Tarantino, P. (2012). L'applicazione della dottrina aristotelica della scienza all'armonica. Rivista di Filosofia Neo-Scolastica, 104(2/3), 289–309.

Tarantino, P. (2014). Sapere che e sapere perché (Arist. APo. A 13, 78a23-b34). Rivista di Storia della Filosofia, 69(1), 1–25.

Wigner, E. (1960). The unreasonable effectiveness of mathematics in the natural sciences. Communications on Pure and Applied Mathematics, 13(1), 1–14.

The required readings, along with some readings suggested during the course, will be made available online in Virtuale.

Teaching methods

The teaching consists of presentations delivered by the teacher on the topics covered in the seminar, group discussions and short lectures by Italian and foreign scholars. Students will also be provided with articles and book extracts to present and discuss (both individually and in groups).

Assessment methods

Students are required to attend in-person classes and attend at least 11 meetings out of the total 15. The attendance will be verified by signature.

Only the following are exempt from the attendance requirement:

Students who are currently abroad on Erasmus program

Working students, who must document, by a declaration of their employer, that their working time makes attendance impossible for them

Students who have certification of disability

Students who have certification of illness

Students who meet one or more of these conditions must contact the teacher. For these students, the eligibility (idoneità) will be determined by taking a short oral exam after the Seminar concludes. The oral exam will focus on the content of the required readings listed in the bibliography.

Students with disabilities and Specific Learning Disorders (SLD)

Students with disabilities or Specific Learning Disorders are entitled to special adjustments according to their condition, subject to assessment by the University Service for Students with Disabilities and SLD. Please do not contact teachers or Department staff, but make an appointment with the Service. The Service will then determine what adjustments are specifically appropriate, and get in touch with the teacher. For more information, please visit the page: https://site.unibo.it/studenti-con-disabilita-e-dsa/en/for-students

Teaching tools

Lecture slides, handouts and further readings will be used during classes and will be made available to students through the virtuale.unibo.it portal.

Office hours

See the website of Daniele Molinini