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Topological%20Strings%20and%20Knot%20Homologies

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Title: Topological%20Strings%20and%20Knot%20Homologies


1
Topological StringsandKnot Homologies
  • Sergei Gukov

2
Outline
  • Introduction to Topological String Theory
  • Relation to Knot Homologies

based on
S.G., A.Schwarz, C.Vafa, hep-th/0412243
N.Dunfield, S.G., J.Rasmussen, math.GT/0505662
S.G., J.Walcher, hep-th/0512298
joint work with E.Witten
3
Perturbative Topological String
X Calabi-Yau 3-fold
map from a Riemann surface to Calabi-Yau
3-fold X is characterized by
  • genus g of

4
Perturbative Topological String
Topological string partition function
A-model
Kahler moduli
number of holomorphic maps of genus
g curves to X which land in class
5
Perturbative Topological String
B-model
symplectic basis of 3-cycles
holomorphic Ray-Singer torsion
6
Holomorphic Anomaly
M.Bershadsky, S.Cecotti, H.Ooguri, C.Vafa
(determines up to holomorphic ambiguity)
7
Wave Function Interpretation
E.Witten
quantization of
symplectic structure
Wave Function
8
Mirror Symmetry
9
Applications
  • Physical Applications
  • compute F-terms in string theory on X
  • Black Hole physics
  • dynamics of SUSY gauge theory
  • Mathematical Applications
  • Enumerative geometry
  • Homological algebra
  • Low-dimensional topology
  • Representation theory
  • Gauge theory

H.Ooguri, A.Strominger, C.Vafa,
R.Dijkgraaf, C.Vafa,
10
D-branes
Open topological strings
A-model Lagrangian submanifolds in X
( coisotropic branes)
B-model Holomorphic cycles in X
11
Open String Field Theory
N D-branes
E.Witten
A-model U(N) Chern-Simons gauge theory
B-model 6d holomorphic Chern-Simons
R.Dijkgraaf, C.Vafa
2d BF theory 0d Matrix Model
12
Homological Mirror Symmetry
A-branes objects in the Fukaya category
Fuk (X)
homological mirror symmetry
M.Kontsevich
Fuk (X)
13
Matrix Factorizations
B-branes at Landau-Ginzburg point are described
by matrix factorizations
Topological Landau-Ginzburg model with
superpotential W
CY-LG correspondence
MF (W)
14
Large N Duality
R.Gopakumar, C.Vafa
15
Large N Duality
R.Gopakumar, C.Vafa
N D-branes
Closed topological string on resolved conifold
U(N) Chern-Simons theory on
16
Counting BPS states 5d
R.Gopakumar, C.Vafa
M-theory on
M2-brane on
Example (conifold)
17
Counting BPS states 4d
H.Ooguri, A.Strominger, C.Vafa
Type II string theory on X
number of BPS states of 4d black hole with
electric charge q and magnetic charge p
evaluated at , the attractor value
18
Large N Dualities
Open Closed
A-model 3d Chern-Simons theory Gromov-Witten theory
B-model holomorphic Chern-Simons theory Matrix model Kodaira-Spencer theory
Mirror Symmetry
19
Computing
non-compact (toric) compact
holomorphic anomaly small g (ambiguity)
relative Gromov-Witten (in practice only small g)
large N duality ?
heterotic/type IIA duality partial results for all g
gauge theory ?
20
Gromov-Witten Invariants via Gauge Theory
X symplectic 4-manifold
C.Taubes
topological twist of N2 abelian gauge theory
with a hypermultiplet
21
Gromov-Witten Invariants via Gauge Theory
D.Maulik, N.Nekrasov, A.Okounkov,
R.Pandharipande
X Calabi-Yau 3-fold
topological twist of abelian gauge theory in six
dimensions localizes on singular U(1) instantons
(ideal sheaves)
22
Enumerative Invariants
Rational (maps) Integer (gauge theory, embeddings) Refinement
Closed GW (stable maps) DT/GV (ideal sheaves) Equivariant
Open open GW (relative stable maps) BPS invariants Knot Homologies
23
Polynomial Knot Invariants
  • In Chern-Simons theory

E.Witten
Wilson loop operator
polynomial in q
  • Quantum groups R-matrix

24
Polynomial Knot Invariants
  • Jones polynomial

unknot
Example
25
Polynomial Knot Invariants
  • Quantum sl(N) invariant

unknot
26
Polynomial Knot Invariants
  • HOMFLY polynomial

unknot
27
Polynomial Knot Invariants
  • HOMFLY polynomial

unknot
Example
28
Polynomial Knot Invariants
  • Alexander polynomial

unknot
Example
29
  • Question (M.Atiyah)

Why integer coefficients?
Two recent developments - Categorification -
Integer BPS invariants
30
Categorification
categorification
categorification
Number
Vector Space
Category
dimension
Grothendieck group
31
Categorification
categorification
categorification
Number
Vector Space
Category
dimension
Grothendieck group
Example
Category of branes on the flag variety
N!
32
Categorification
categorification
categorification
Number
Vector Space
Category
dimension
Grothendieck group
  • Knot homology

Euler characteristic polynomial knot invariant
33
Knot Homologies
  • Knot Floer homology

P.Ozsvath, Z.Szabo J.Rasmussen
Example
34
Knot Homologies
  • Khovanov homology

M.Khovanov
Example
35
Knot Homologies
  • sl(N) knot homology

N3 foams (web cobordisms)
M.Khovanov
Ngt2 matrix factorizations
M.Khovanov, L.Rozansky
36
A general picture of knot homologies
G Knot Polynomial Knot Homology
U(11) Alexander knot Floer homology .
SU(1) Lees deformed theory .
SU(2) Jones Khovanov homology .
SU(N) sl(N) homology .
37
sl(N) knot homology
  • is a functor (from knots and cobordisms to
    bigraded abelian groups and homomorphisms)
  • is stronger than
  • is hard to compute (only sl(2) up to crossings)
  • cries out for a physical interpretation!

38
Physical Interpretation
S.G., A.Schwarz, C.Vafa
space of BPS states
M-theory on
(conifold)
Lagrangian
M5-brane on
Earlier work H.Ooguri, C.Vafa J.Labastida,
M.Marino, C.Vafa
BPS state membrane ending on the Lagrangian
five-brane
39
  • Surprisingly, this physical interpretation leads
    to a rich theory, which unifies all the existing
    knot homologies

N.Dunfield, S.G., J.Rasmussen
40
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41
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42
Families of Differentials
  • differentials
  • cohomology

sl(N) knot homology N gt 2 Lees theory
N1 knot Floer homology N0
43
Matrix Factorizations, Deformations, and
Differentials
44
a
q
Non-zero differentials for the trefoil knot.
45
Differentials for 8 . The bottom row of
dots has a-grading 6. The leftmost dot on that
row has q-grading -6.
19
46
Differentials for 10 . The bottom row of
dots has a-grading -2.
153
47
Whats Next?
  • Generalization to other groups and
    representations
  • The role of matrix factorizations
  • Finite N (stringy exclusion principle)
  • Realization in topological gauge theory

S.G., J.Walcher
  • Boundaries, corners,
  • Surface operators
  • Braid group actions on D-branes

48
Gauge Theory and Categorification
gauge theory on a 4-manifold X
number Z(X)
(partition function)
49
Gauge Theory and Categorification
gauge theory on a 4-manifold X
number Z(X)
(partition function)
gauge theory on
vector space
(Hilbert space)
3-manifold
50
Gauge Theory and Categorification
gauge theory on a 4-manifold X
number Z(X)
(partition function)
gauge theory on
vector space
(Hilbert space)
3-manifold
gauge theory on
category of branes
(boundary conditions)
surface
51
gauge theory on X
Z(X) counts solutions
self-duality equations
0
gauge theory on
monopole equations
F MM 0
A
topological A-model/B-model
gauge theory on
vortex equations
0
52
Gauge Theory with Boundaries
In three-dimensional topological gauge theory
vector
vector
vector space
Z
Z
53
Gauge Theory with Boundaries
In three-dimensional topological gauge theory
vector
vector
vector space
Z
Z
Z
Z
Z
Y
54
Gauge Theory with Corners
In four-dimensional topological gauge theory
time
brane
brane
category of branes on
55
Gauge Theory with Corners
In four-dimensional topological gauge theory
time
brane
brane
category of branes on
A-model
(Atiyah-Floer conjecture)
56
From Lines to Surfaces
  • A line operator lifts to an operator in 4D gauge
    theory localized on the surface
    where the gauge field A has a prescribed
    singularity

Hol (A) C
fixed conjugacy class in G
57
Braid Group Actions on D-branes
  • Any four-dimensional topological gauge theory
    which admits supersymmetric surface operators
    provides (new) examples of braid group actions on
    D-branes


58
Moduli space
complex surface with three singularities

59
a-brane
a-brane corresponds to the static configuration
of surface operators below (time direction
not shown)
60
s(a)-brane
s(a)-brane corresponds to the static
configuration of surface operators with a
half-twist
61
3
s (a)-brane corresponds to the static
configuration of surface operators with
three half-twists
62
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63
Topological Twists of SUSY Gauge Theory
  • N2 twisted gauge theory
  • N4 twisted SYM (adjoint non-Abelian monopoles)
  • Partial twist of 5D super-Yang-Mills

64
The End
65
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