교원프로필

박재석 사진
교원에 대한 정보를 나타내는 표입니다.
성명 박재석
소속 수학과
전화번호 279-2331
E-mail jaesuk@postech.ac.kr
Homepage http://math.postech.ac.kr/

학력

  • 1995.10 ~ 1999.11 UNIVERSITEIT VAN AMSTERDAM (박사-Theoretical Physics)
  • 1994.10 ~ 1995.09 UNIV. OF WALES AT SWANSEA (석사-물리학)

주요경력

  • 2009.03 ~ 2012.08 : 연세대학교 수학과
  • 2005.09 ~ 2009.02 : 연세대학교 수학과

전문분야

학술지

국제전문학술지

  • Enhanced homotopy theory for period integrals of smooth projective hypersurfaces, Communications in Number Theory and Physics, , 10, 235-337 (2016)
  • Homotopy probability theory I, JOURNAL OF HOMOTOPY AND RELATED STRUCTURES, , 10, 425-435 (2015)
  • Homotopy probability theory II, JOURNAL OF HOMOTOPY AND RELATED STRUCTURES, , 10, 623-635 (2015)
  • Topological sigma B model in 4-dimensions, JOURNAL OF HIGH ENERGY PHYSICS, , 11, - (2008)
  • Semi-classical quantum field theories and Frobenius manifolds , LETTERS IN MATHEMATICAL PHYSICS, , 81, 41-59 (2007)
  • Deformations of coisotropic submanifolds and strong homotopy Lie algebroids, INVENTIONES MATHEMATICAE, , 161, 287-360 (2005)
  • BV quantization of topological open membranes, COMMUNICATIONS IN MATHEMATICAL PHYSICS, , 249, 249-271 (2004)
  • Higgs bundles and four manifolds , NUCLEAR PHYSICS B, , 621, 689-711 (2002)
  • Cohomological Yang-Mills theories on Kahler 3-folds, NUCLEAR PHYSICS B, , 600, 133-162 (2001)
  • Cohomological field theories with Kähler structure, Advances in Theoretical and Mathematical Physics, , 4, 823-889 (2000)
  • Sigma models for bundles on Calabi-Yau: a proposal for Matrix string compactifications, NUCLEAR PHYSICS B, , 561, 125-156 (1999)
  • Monads, strings, and M-theory, NUCLEAR PHYSICS B, , 520, 229-260 (1998)
  • Topological QCD, NUCLEAR PHYSICS B, , 454, 199-224 (1995)
  • Holomorphic Yang-Mills theory on compact Kähler manifolds, NUCLEAR PHYSICS B, , 423, 559-579 (1994)
  • Complex geometrical interpretation of BRST algebra in topological Yang-Mills theory, PHYSICS LETTERS B, , 277, 119-122 (1992)
  • Quantum backgrounds and QFT, INTERNATIONAL MATHEMATICS RESEARCH NOTICES, , , 765-801 (0020)
  • Monads and D-instantons , NUCLEAR PHYSICS B, , 493, 198-230 (0019)
  • N = 2 topological Yang-Mills theories and Donaldson's polynomials, JOURNAL OF GEOMETRY AND PHYSICS, , 20, 31-53 (0019)
  • N=2 topological Yang-Mills theory on compact Kähler surfaces, COMMUNICATIONS IN MATHEMATICAL PHYSICS, , 163, 113-139 (0019)

국내전문학술지

일반학술지

학술회의논문

학회발표

  • Coalgebraic Principles of Quantum Field Theory II, ., 0, 0, - (2017)
  • Coalgebraic Principles of Quantum Field Theory I, ., 0, 0, - (2017)
  • Prounipotent Fundamental Affine DG Group Scheme of a Space and Its Quantization, ., 0, 0, - (2017)
  • Homotopy Theory of Probability Spaces II, ., 0, 0, - (2017)
  • Homotopy Theory of Probability Spaces I, ., 0, 0, - (2017)
  • A quantization of the unipotent fundamental group, ., 0, 0, - (2017)
  • Quantization of the Rational Homotopy Theory, ., 0, 0, - (2016)
  • Quantization of the Rational Homotopy Theory, ., 0, 0, - (2016)
  • Homotopy probability theory of A∞-algebra, ., 0, 0, - (2016)
  • Mastering quantum correlation functions in quantum field theory, ., 0, 0, - (2016)
  • Homotopy theory of probability spaces, ., 0, 0, - (2015)
  • Homotopy Theory of Probability Spaces, ., 0, 0, - (2015)
  • Homotopy Theory of Probability Spaces, ., 0, 0, - (2015)
  • Homotopy Theory of Probability, ., 0, 0, - (2015)
  • On the deformation of Peudo-representation, ., 0, 0, - (2015)
  • Geometry of Homotopy Probability Theory, ., 0, 0, - (2015)
  • Quantization of Toric Calabi-Yau Hypersurfaces, ., 0, 0, - (2015)
  • Homotopy Theory of Quantum Fields II, ., 0, 0, - (2015)
  • Homotopy T heory of Quantum Fields I, ., 0, 0, - (2015)
  • (2) Category of CQFT Algebras and Quan- tum Deformation T heory, ., 0, 0, - (2015)
  • (3) Example Related with Mirror Symmetry, ., 0, 0, - (2015)
  • (1)Algebraic Probability Theory and its Homotopical Enhancement, ., 0, 0, - (2015)
  • Homotopy Theory of Probability Spaces, ., 0, 0, - (2015)
  • Classical and Quantum Symmetries, ., 0, 0, - (2014)
  • When two quantum field theories are physica y equivalent, ., 0, 0, - (2014)
  • Period Integrals in Quantum Field Theory, ., 0, 0, - (2014)
  • Algebraic Probability Spaces and Representation of Lie algebras, ., 0, 0, - (2014)
  • Lectures on Algebraic Quantum Field Theory III, ., 0, 0, - (2014)
  • Lectures on Algebraic Quantum Field Theory II, ., 0, 0, - (2014)
  • Lectures on Algebraic Quantum Field Theory I, ., 0, 0, - (2014)
  • What is an Algebraic Quantum Field Theory: via an (0+0)-dimensional example, ., 0, 0, - (2014)
  • CQFT Algebra and Qauntum Correlation Functions, ., 0, 0, - (2014)
  • Pseudo Representations and Homotopy Lie Algebra, ., 0, 0, - (2014)
  • What is homotopy correlated space?, ., 0, 0, - (2013)
  • Quantization of Deformation Functor and attached Invariants of Homotopy Types, ., 0, 0, - (2013)
  • Homotopical Probability Theory, ., 0, 0, - (2012)
  • Homtopical Probability Theory, ., 0, 0, - (2012)
  • Homotopical Probability Theory, ., 0, 0, - (2012)
  • Homotopical Probability Theory, ., 0, 0, - (2012)

단행본

  • Symplectic Geometry and Mirror Symmetry, World Scientific, 489, PARK, JS (2001)

연구실적

IP