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Examples of Mapping Classes Mapping Class Groups of Infinite-Type Surfaces C. Santana Afton, Sam Freedman, Liping Yin The College of William & Mary, University of Michigan, Georgia State University Homology and Symplectic Structure A finitely group M whose integral homology is isomorphic to the integral stable homology of the big mapping class group. Theorem The integral homology M is isomorphic to the stable integral homology of the mapping class group. Question: Does every automorphism of the homology group of an infinite-type surface come from a mapping class? The sequence in homology: The elements of M described in the picture Theorem The symplectic representation of the mapping class group PM extends to a representation into the restricted symplectic group. Dehn twist and handle shifts generate big mapping class group. The blue and pink curves are all generators of big mapping class group. When are two surfaces the same? Questions Examples of Infinite-Type Surfaces The Mapping Class Group Generating Mapping Class Groups Acknowledgements

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Page 1: Mapping Class Groups of Infinite-Type Surfacespeople.math.gatech.edu/~dmargalit7/reu/BigModPoster.pdfMapping Class Groups of Infinite-Type Surfaces C. Santana Afton, Sam Freedman,

Examples of Mapping Classes

Mapping Class Groups of Infinite-Type SurfacesC. Santana Afton, Sam Freedman, Liping Yin

The College of William & Mary, University of Michigan, Georgia State University

Homology and Symplectic Structure

A finitely group M whose

integral homology is isomorphic

to the integral stable homology

of the big mapping class group.

Theorem The integral

homology M is isomorphic to the

stable integral homology of the

mapping class group.

Question: Does every automorphism of the homology group of an infinite-type

surface come from a mapping class?

The sequence in homology:

The elements of M described in the picture

Theorem The symplectic

representation of the mapping

class group PM extends to a

representationinto the

restricted symplectic group.

Dehn twist and handle shifts

generate big mapping class

group.

The blue and pink curves are

all generators of big mapping

class group.

When are two surfaces the same?

Questions

Examples of Infinite-Type Surfaces

The Mapping Class Group

Generating Mapping Class GroupsAcknowledgements

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