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- °¿¬ 1. °¼øÀÌ (°¿ø´ëÇб³) q-series and integer partiion from Euler to prime detection (13:30-14:20)
- Integer partition is a fundamental and natural topic in mathematics, appearing across various fields such as combinatorics, modular form theory, representation theory, and mathematical physics and so on. In this talk, we provide a comprehensive survey of the contributions by Euler, Ramanujan, and MacMahon, who are regarded as pioneers in the development of partition theory. The main emphasis is on gap partitions, partition congruences, and prime-detecting partitions.
- °¿¬ 2. Àӹ̰æ (KAIST) The Neumann-Poincar