Web1943–1959: S-matrix theory [ edit] String theory represents an outgrowth of S-matrix theory, [1] a research program begun by Werner Heisenberg in 1943 [2] following John Archibald Wheeler 's 1937 introduction of the S-matrix. [3] Many prominent theorists picked up and advocated S-matrix theory, starting in the late 1950s and throughout the 1960s. Web感觉微分几何上要研究模空间(Moduli space)技术上比代数几何上更加麻烦。 一般来讲我们考虑的是一个PDE的解空间,特别的考虑比如稳定全纯映射模空间(Moduli of stable maps)就相当于解一个一阶椭圆PDE。 我听说分析上的办法主要还是在椭圆算子满足横截性(transversality)的情况下得到模空间是一个(带边)流形,或者有时候得到一个轨 …
The moduli space of Riemann surfaces is K¨ahler hyperbolic
WebNew Perspectives on Integrable Hamiltonian Systems via the Algebraic Geometry of Twisted Hitchin Moduli Spaces: A Case Study on the Calogero-Franc¸oise Integrable System. dc.contributor.advisor: Rayan ... as differential and algebraic geometry, partial differential equations, statistical mechanics, quantum field theories, string theory and ... Web1 dag geleden · Higher Geometric Structures on Manifolds and the Gauge Theory of Deligne Cohomology. We study smooth higher symmetry groups and moduli -stacks of generic higher geometric structures on manifolds. Symmetries are automorphisms which cover non-trivial diffeomorphisms of the base manifold. We construct the smooth higher … oval chest
JHEP02(2024)001
Web• String Theory: global symmetry on the 2D word-sheet → gauge theory in 10D target space If one seems to detect one, it actually needs to be gauged or broken • Gauging a continuous symmetry in d dimensions means: d⋆Fd−n+1 = Jn • Breaking a continuous symmetry means: dJn = In+1 Abu Dhabi, 18.03.2024 – p.3/23 Web11 apr. 2024 · String-Math is an annual conference covering the most significant progress at the interface of string theory and mathematics. ... and conformal nets to moduli spaces of curves, representations, instantons, and harmonic maps, with applications to spectral theory and to the geometric Langlands program. Product Identifiers. Publisher. WebP. Aspinwall: "The moduli space of complexified Kähler forms and mirror symmetry". I. Dolgachev: "Moduli of K3 surfaces (with emphasis on families of K3's with Picard number 19 and more)" R. Donagi: "Moduli spaces of super Riemann surfaces and perturbative super string theory". S. Grushevsky: "Moduli of abelian varieties, Siegel modular forms ... oval channel