Concave symplectic embeddings and relations in...
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Concave symplectic embeddings and relations in mappingclass groups of surfaces
Laura Starkston
University of Texas at Austin
December 6, 2014
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 1 / 15
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Contact3-manifolds(M3, ⇠)
x
y
z
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 2 / 15
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Contact3-manifolds(M3, ⇠)
x
y
z
Symplectic convexfillings (X 4,!)
X
MMxI
V
LV! = !
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 2 / 15
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Contact3-manifolds(M3, ⇠)
x
y
z
Open bookdecomposition⇡ : M \ L ! S
1
Symplectic convexfillings (X 4,!)
X
MMxI
V
LV! = !
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 2 / 15
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Contact3-manifolds(M3, ⇠)
x
y
z
Open bookdecomposition⇡ : M \ L ! S
1 ⌃ = ⇡�1(0)“page”
� : ⌃ ! ⌃monodromy
Symplectic convexfillings (X 4,!)
X
MMxI
V
LV! = !
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 2 / 15
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Contact3-manifolds(M3, ⇠)
x
y
z
Open bookdecomposition⇡ : M \ L ! S
1 ⌃ = ⇡�1(0)“page”
� : ⌃ ! ⌃monodromy
Symplectic convexfillings (X 4,!)
X
MMxI
V
LV! = !
Lefschetz fibration
vanishing cyclesc
1
, · · · , cn
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 2 / 15
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Contact3-manifolds(M3, ⇠)
x
y
z
Open bookdecomposition⇡ : M \ L ! S
1 ⌃ = ⇡�1(0)“page”
� : ⌃ ! ⌃monodromy
Symplectic convexfillings (X 4,!)
X
MMxI
V
LV! = !
Lefschetz fibration
vanishing cyclesc
1
, · · · , cn
factorization ofmonodromy
� = Dc1
· · ·Dcn
Right-handedDehn twists
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 2 / 15
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Concave boundaryof ⌫(⌃
1
[ · · ·[⌃n)
+1
Contact3-manifolds(M3, ⇠)
x
y
z
Open bookdecomposition⇡ : M \ L ! S
1 ⌃ = ⇡�1(0)“page”
� : ⌃ ! ⌃monodromy
Symplectic convexfillings (X 4,!)
X
MMxI
V
LV! = !
Lefschetz fibration
vanishing cyclesc
1
, · · · , cn
factorization ofmonodromy
� = Dc1
· · ·Dcn
Right-handedDehn twists
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 2 / 15
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Concave boundaryof ⌫(⌃
1
[ · · ·[⌃n)
+1
Contact3-manifolds(M3, ⇠)
x
y
z
Open bookdecomposition⇡ : M \ L ! S
1 ⌃ = ⇡�1(0)“page”
� : ⌃ ! ⌃monodromy
Complement ofembedded surfacesin CP2 #N CP2
Convex filling
+1
Symplectic convexfillings (X 4,!)
X
MMxI
V
LV! = !
Lefschetz fibration
vanishing cyclesc
1
, · · · , cn
factorization ofmonodromy
� = Dc1
· · ·Dcn
Right-handedDehn twists
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 2 / 15
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Concave Caps and Convex Fillings
+1
-2-1 -1
-2
-2
⌃1
, · · · ,⌃n
surfaces in a 4-manifold intersecting positively transversely
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Concave Caps and Convex Fillings
+1
-2-1 -1
-2
-2
⌃1
, · · · ,⌃n
surfaces in a 4-manifold intersecting positively transversely
Theorem (Gay-Stipsicz, Li-Mak)
There exists ! on ⌫(⌃1
[ · · · [ ⌃n) withconvex boundary negative definite
concave boundary with enough b
+
2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 3 / 15
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Concave Caps and Convex Fillings
+1
-2-1 -1
-2
-2
⌃1
, · · · ,⌃n
surfaces in a 4-manifold intersecting positively transversely
Theorem (Gay-Stipsicz, Li-Mak)
There exists ! on ⌫(⌃1
[ · · · [ ⌃n) withconvex boundary negative definite
concave boundary with enough b
+
2
convexfilling
concave capConvex fillings are more rare than concave caps.
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 3 / 15
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Concave Caps and Convex Fillings
+1
-2-1 -1
-2
-2
⌃1
, · · · ,⌃n
surfaces in a 4-manifold intersecting positively transversely
Theorem (Gay-Stipsicz, Li-Mak)
There exists ! on ⌫(⌃1
[ · · · [ ⌃n) withconvex boundary negative definite
concave boundary with enough b
+
2
convexfilling
concave capConvex fillings are more rare than concave caps.
Idea: Use concave caps to find convex fillings.
Theorem [McDu↵]
A closed symplectic manifold containing a symplecticpositive S
2 is symplectomorphic to CP2 #N CP2.
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 3 / 15
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Concave embedding approach
Theorem (S.)
For a Seifert fibered space Y over S
2
with k singular fibers and e
0
�k � 1, withits canonical contact structure ⇠can:
1
Every convex filling of (Y , ⇠can) is the complement of a
symplectic embedding of a concave star-shaped plumbing of
spheres into CP2 #N CP2
.
+1
-2-1 -1
-2
-2
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Concave embedding approach
Theorem (S.)
For a Seifert fibered space Y over S
2
with k singular fibers and e
0
�k � 1, withits canonical contact structure ⇠can:
1
Every convex filling of (Y , ⇠can) is the complement of a
symplectic embedding of a concave star-shaped plumbing of
spheres into CP2 #N CP2
.
2
Every such embedding can be built from
A collection of pseudoholomorphic CP1
’s
+1
-2-1 -1
-2
-2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 4 / 15
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Concave embedding approach
Theorem (S.)
For a Seifert fibered space Y over S
2
with k singular fibers and e
0
�k � 1, withits canonical contact structure ⇠can:
1
Every convex filling of (Y , ⇠can) is the complement of a
symplectic embedding of a concave star-shaped plumbing of
spheres into CP2 #N CP2
.
2
Every such embedding can be built from
A collection of pseudoholomorphic CP1
’s
blow-up at N points, including proper transforms of the
CP1
’s and exceptional spheres into the concave plumbing
+1
-2-1 -1
-2
-2
1-1
-2
-1-1-1
-1 -1-1
1-2
-2
-1-1-1
-1 -1-1
-2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 4 / 15
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Concave embedding approach
Theorem (S.)
For a Seifert fibered space Y over S
2
with k singular fibers and e
0
�k � 1, withits canonical contact structure ⇠can:
1
Every convex filling of (Y , ⇠can) is the complement of a
symplectic embedding of a concave star-shaped plumbing of
spheres into CP2 #N CP2
.
2
Every such embedding can be built from
A collection of pseudoholomorphic CP1
’s
blow-up at N points, including proper transforms of the
CP1
’s and exceptional spheres into the concave plumbing
3
For many such (Y , ⇠can) the isotopy class of the embedding
is determined by combinatorial/homological data
(su�cient conditions: k 5 or e
0
�k � 3).
+1
-2-1 -1
-2
-2
1-1
-2
-1-1-1
-1 -1-1
1-2
-2
-1-1-1
-1 -1-1
-2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 4 / 15
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Monodromy factorization approach
[Gay-Mark] For these Seifert fibered spaces, (Y , ⇠can), there are open bookdecompositions with
Planar pages
Monodromy � = Dc1
Dc2
· · ·Dcn ,c
1
, · · · , cn disjoint
Theorem (Wendl)
Because these contact structures are planar, each (minimal) convex filling of
(Y , ⇠can) corresponds to a di↵erent positive factorization of �.
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 5 / 15
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Comparing and translating the two methods
Monodromy substitution approach
Easy to write down
Good for applications for cut and paste operations
Concave embedding approach
Easy to find interesting examples
Easy (in many cases) to classify all fillings of certain contact manifolds(combinatorial reduction)
Translating between the two approaches: Handlebody decompositions forembedded surfaces and Lefschetz fibrations
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How to draw an embedding of spheres in a 4-manifold
Unknotted circles in S
3 $ equators of spheresFraming $ self-intersection numberLinking $ Pairwise intersections
+1
+1 0 0-1
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Blowing up and down
-1
+1
-1
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How to draw a planar Lefchetz fibration
Dotted circle notation: Attachinga 1-handle is equivalent to carving out a 2-handle– a dotted circle denotes the boundary of this core disk.
1
2
34
5
6
7c1
c2
c3
12 3 4 5 6 7
c1c2
c3
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+1
-n1 -n2 -nd
Concave embeddings: Start with d + 1 pseudoholomorphic CP1’s in CP2.
+1
CP2
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
+1
0
0
0
cancelling 3-handles
CP2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
+1
cancelling 3-handles
+1
+1+1 +1
CP2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
+1
cancelling 3-handles
+1 +1 +1
CP2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
+1
cancelling 3-handles
+1 +1 +1
+1
cancelling 3-handles
+1 0 0-1
Blow up to remove intersections and change framings. CP2 #CP2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
+1
cancelling 3-handles
+1 +1 +1
+1
cancelling 3-handles
0 0 -1-1
-1
Blow up to remove intersections and change framings. CP2 #2CP2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
+1
cancelling 3-handles
+1 +1 +1
+1
cancelling 3-handles
-1 -1 -1-1
-1
-1
Blow up to remove intersections and change framings. CP2 #3CP2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
+1
cancelling 3-handles
-1 -1 -1-1
-1
-1
+1
cancelling 3-handles
-1 -1 -1-1
-1
-1
Notice the embedding of the dual graph into CP2 #3CP2
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
+1
cancelling 3-handles
-1 -1 -1-1
-1
-1
-1
-1
-1
Cut out concave cap from CP2 #3CP2. Turn upsidedown. Simplify
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
-1
-1
-1-1
-1
-1
Lefschetz Fibration!
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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+1
-1 -1-1
Concave embeddings: Start with 3 + 1 pseudoholomorphic CP1’s in CP2.
-1-1
-1
Lantern Relation! D
1
D
2
D
3
D
1,2,3 = D
1,2D1,3D2,3
Laura Starkston (University of Texas at Austin) Concave symplectic embeddings and relations in mapping class groups of surfacesDecember 6, 2014 10 / 15
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The lantern relation concave embeddingcame from blowing up:
By blowing up more interestingconfigurations of lines, we get newrelations:
11
11
D
2
1
D
2
2
D
3
D
2
4
D
2
5
D
1,2,3,4,5 = D
1,2,3D1,4D1,5D2,4D2,5D3,4,5
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D
2
1
D
2
2
D
3
D
2
4
D
2
5
D
1,2,3,4,5 = D
1,2,3D1,4D1,5D2,4D2,5D3,4,5
Concave embedding strategy shows: no other fillings ) no other + factorizations.
Such indecomposable relations are essential relators for elements in Dehn+.
There is an infinite family of indecomposable relations generalizing this example.
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Longer Arms
+1
-2 -2 -2
+1
-2 -2 -2
-2
+1
cancelling 3-handles
-2 -2 -2-1
-1-1
-1-1-1-1-2
-1
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Longer Arms
+1
-1 -1-1
+1
-2 -2 -2
-2
+1
cancelling 3-handles
-2 -1 -2-1
-1-1
-1 -1 -1 -2
-1
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-1-2
-2 -1-1
-1-2
-2 -1-1
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-1-2
-2 -1-1
-1-2
-2 -1-1
-1
-1 -2-1
-1
-2
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D
1
D
2
D
3
D
1,2,3 = D
1,2D1,3D2,3
D
1aD1bD1a1bD2
2
D
3
D
1a,1b,2,3 = D
1a,2D1b,2D1a,1b,3D2,3
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Moving towards a complete dictionary: other moves
What is a complete list of embedding moves, and how do they each translateto moves on mapping class group relations?
How does a sequence of embedding moves translate to a sequence ofmapping class group relations?
a b a-1 b-1
-1
a-1 b-2
-1-2
a-2 b-2
-1 -2-3
-1
a ba-1 b-1
-1
a-1 b-2
-1-3
cc-1 c-2
-1
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