WebGRID DIAGRAMS IN HEEGAARD FLOER THEORY 3 with xi ∈αi∩βj ⊂Σ. Given two such intersection points x,y, a Whitney disk from x to y is defined to be a map u from the unit disk D2 to Symg(Σ), such that u maps the lower half of the boundary ∂D2 to Tα, the upper half to Tβ, and u(−1) = x,u(1) = y.The space of relative homotopy classes WebRenewQuantum seminar, April 13, 2024 3 Yan Soibelman (KANSAS STATE UNIVERSITY) Introduction to Holomorphic Floer Theory: brane quantization, exponential integrals /and …

Takagi Lectures on Donaldson–Thomas theory SpringerLink

WebYan Soibelman (Kansas State University) Title: Exponential integrals, Holomorphic Floer theory and resurgence Recording (Passcode: WcrGN=$\$$0) Slides. Abstract: … WebJul 28, 2004 · Kontsevich and Soibelman [KS06] ... we propose a conjecture relating holomorphic Floer theory of Hitchin integrable systems and Donaldson-Thomas invariants of non-compact Calabi-Yau 3-folds. simpson strong tie concrete to wood

Affine Structures and Non-Archimedean Analytic Spaces

WebOzsv´ath-Szab´o (2000’s): developed Heegaard Floer theory, based on counts of holomorphic curves in symplectic manifolds. Their mixed HF invariants of 4-manifolds are conjecturally the same as the Seiberg-Witten invariants, and can be used for the same applications (in particular, to detect exotic smooth structures). WebHeegaard Floer homology is a relatively recent and incredibly fruitful technique in low-dimensional topology. The invariants associated to 3- and 4-manifolds come from the … WebHere "counting" happens within the powerful framework of motivic Donaldson-Thomas theory as developed by Kontsevich-Soibelman, Joyce, and others. For meromorphic quadratic ... I will describe a generalization of their result. I will explain how, by replacing holomorphic differentials by meromorphic differentials, one is naturally led to ... simpson strong tie cpd