Post on 30-Jun-2020
Algebras in representations of the symmetric group St,when t is transcendental
Luke SciarappaMentor: Nathan Harman
5th Annual PRIMES ConferenceMay 16, 2015
Luke Sciarappa Algebras in representations of St PRIMES 2015 1 / 10
Symmetry: groups, actions, representations
Group: associative composition with identity and inverses
Examples
Symmetries of a cube
Sn: ways to shuffle a pack of n cards / permutations of {1, . . . , n}
Action: group elements send objects to other objects
Examples
Symmetries of a cube act on vertices/edges/faces of cube, and on R3
Representation: group acting linearly on a vector space
Luke Sciarappa Algebras in representations of St PRIMES 2015 2 / 10
Symmetry: groups, actions, representations
Group: associative composition with identity and inverses
Examples
Symmetries of a cube
Sn: ways to shuffle a pack of n cards / permutations of {1, . . . , n}
Action: group elements send objects to other objects
Examples
Symmetries of a cube act on vertices/edges/faces of cube, and on R3
Representation: group acting linearly on a vector space
Luke Sciarappa Algebras in representations of St PRIMES 2015 2 / 10
Symmetry: groups, actions, representations
Group: associative composition with identity and inverses
Examples
Symmetries of a cube
Sn: ways to shuffle a pack of n cards / permutations of {1, . . . , n}
Action: group elements send objects to other objects
Examples
Symmetries of a cube act on vertices/edges/faces of cube, and on R3
Representation: group acting linearly on a vector space
Luke Sciarappa Algebras in representations of St PRIMES 2015 2 / 10
Symmetry: groups, actions, representations
Group: associative composition with identity and inverses
Examples
Symmetries of a cube
Sn: ways to shuffle a pack of n cards / permutations of {1, . . . , n}
Action: group elements send objects to other objects
Examples
Symmetries of a cube act on vertices/edges/faces of cube, and on R3
Representation: group acting linearly on a vector space
Luke Sciarappa Algebras in representations of St PRIMES 2015 2 / 10
Symmetry: groups, actions, representations
Group: associative composition with identity and inverses
Examples
Symmetries of a cube
Sn: ways to shuffle a pack of n cards / permutations of {1, . . . , n}
Action: group elements send objects to other objects
Examples
Symmetries of a cube act on vertices/edges/faces of cube, and on R3
Representation: group acting linearly on a vector space
Luke Sciarappa Algebras in representations of St PRIMES 2015 2 / 10
Symmetry: groups, actions, representations
Group: associative composition with identity and inverses
Examples
Symmetries of a cube
Sn: ways to shuffle a pack of n cards / permutations of {1, . . . , n}
Action: group elements send objects to other objects
Examples
Symmetries of a cube act on vertices/edges/faces of cube, and on R3
Representation: group acting linearly on a vector space
Luke Sciarappa Algebras in representations of St PRIMES 2015 2 / 10
Symmetry: groups, actions, representations
Group: associative composition with identity and inverses
Examples
Symmetries of a cube
Sn: ways to shuffle a pack of n cards / permutations of {1, . . . , n}
Action: group elements send objects to other objects
Examples
Symmetries of a cube act on vertices/edges/faces of cube, and on R3
Representation: group acting linearly on a vector space
Luke Sciarappa Algebras in representations of St PRIMES 2015 2 / 10
Symmetry: groups, actions, representations
Group: associative composition with identity and inverses
Examples
Symmetries of a cube
Sn: ways to shuffle a pack of n cards / permutations of {1, . . . , n}
Action: group elements send objects to other objects
Examples
Symmetries of a cube act on vertices/edges/faces of cube, and on R3
Representation: group acting linearly on a vector space
Luke Sciarappa Algebras in representations of St PRIMES 2015 2 / 10
Symmetry: groups, actions, representations
Group: associative composition with identity and inverses
Examples
Symmetries of a cube
Sn: ways to shuffle a pack of n cards / permutations of {1, . . . , n}
Action: group elements send objects to other objects
Examples
Symmetries of a cube act on vertices/edges/faces of cube, and on R3
Representation: group acting linearly on a vector space
Luke Sciarappa Algebras in representations of St PRIMES 2015 2 / 10
Categories
Category: mathematical objects; good notion of ‘the right maps’
Examples
sets; functions
vector spaces; linear maps
G-representations; G-linear maps (linear maps ϕ s.t. ϕ(g · v) = g · ϕ(v))
Luke Sciarappa Algebras in representations of St PRIMES 2015 3 / 10
Categories
Category: mathematical objects; good notion of ‘the right maps’
Examples
sets; functions
vector spaces; linear maps
G-representations; G-linear maps (linear maps ϕ s.t. ϕ(g · v) = g · ϕ(v))
Luke Sciarappa Algebras in representations of St PRIMES 2015 3 / 10
Categories
Category: mathematical objects; good notion of ‘the right maps’
Examples
sets; functions
vector spaces; linear maps
G-representations; G-linear maps (linear maps ϕ s.t. ϕ(g · v) = g · ϕ(v))
Luke Sciarappa Algebras in representations of St PRIMES 2015 3 / 10
Categories
Category: mathematical objects; good notion of ‘the right maps’
Examples
sets; functions
vector spaces; linear maps
G-representations; G-linear maps (linear maps ϕ s.t. ϕ(g · v) = g · ϕ(v))
Luke Sciarappa Algebras in representations of St PRIMES 2015 3 / 10
Categories
Category: mathematical objects; good notion of ‘the right maps’
Examples
sets; functions
vector spaces; linear maps
G-representations; G-linear maps (linear maps ϕ s.t. ϕ(g · v) = g · ϕ(v))
Luke Sciarappa Algebras in representations of St PRIMES 2015 3 / 10
Categories
Category: mathematical objects; good notion of ‘the right maps’
Examples
sets; functions
vector spaces; linear maps
G-representations; G-linear maps (linear maps ϕ s.t. ϕ(g · v) = g · ϕ(v))
Luke Sciarappa Algebras in representations of St PRIMES 2015 3 / 10
Tensor categories
Tensor category: category w/lots of extra structure
incl. tensor product: (X,Y ) 7→ X ⊗ Y ,associative, commutative, unital (ACU)
Examples
Vector spaces
Representations of a finite group
In particular, for n ∈ N, representations of Sn =: Rep(Sn)
For t ∈ C, Rep(St) (‘interpolation’ of Rep(Sn))
Rep(St) early example of tensor category besides reps of a group
Luke Sciarappa Algebras in representations of St PRIMES 2015 4 / 10
Tensor categories
Tensor category: category w/lots of extra structure
incl. tensor product: (X,Y ) 7→ X ⊗ Y ,associative, commutative, unital (ACU)
Examples
Vector spaces
Representations of a finite group
In particular, for n ∈ N, representations of Sn =: Rep(Sn)
For t ∈ C, Rep(St) (‘interpolation’ of Rep(Sn))
Rep(St) early example of tensor category besides reps of a group
Luke Sciarappa Algebras in representations of St PRIMES 2015 4 / 10
Tensor categories
Tensor category: category w/lots of extra structure
incl. tensor product: (X,Y ) 7→ X ⊗ Y ,associative, commutative, unital (ACU)
Examples
Vector spaces
Representations of a finite group
In particular, for n ∈ N, representations of Sn =: Rep(Sn)
For t ∈ C, Rep(St) (‘interpolation’ of Rep(Sn))
Rep(St) early example of tensor category besides reps of a group
Luke Sciarappa Algebras in representations of St PRIMES 2015 4 / 10
Tensor categories
Tensor category: category w/lots of extra structure
incl. tensor product: (X,Y ) 7→ X ⊗ Y ,associative, commutative, unital (ACU)
Examples
Vector spaces
Representations of a finite group
In particular, for n ∈ N, representations of Sn =: Rep(Sn)
For t ∈ C, Rep(St) (‘interpolation’ of Rep(Sn))
Rep(St) early example of tensor category besides reps of a group
Luke Sciarappa Algebras in representations of St PRIMES 2015 4 / 10
Tensor categories
Tensor category: category w/lots of extra structure
incl. tensor product: (X,Y ) 7→ X ⊗ Y ,associative, commutative, unital (ACU)
Examples
Vector spaces
Representations of a finite group
In particular, for n ∈ N, representations of Sn =: Rep(Sn)
For t ∈ C, Rep(St) (‘interpolation’ of Rep(Sn))
Rep(St) early example of tensor category besides reps of a group
Luke Sciarappa Algebras in representations of St PRIMES 2015 4 / 10
Tensor categories
Tensor category: category w/lots of extra structure
incl. tensor product: (X,Y ) 7→ X ⊗ Y ,associative, commutative, unital (ACU)
Examples
Vector spaces
Representations of a finite group
In particular, for n ∈ N, representations of Sn =: Rep(Sn)
For t ∈ C, Rep(St) (‘interpolation’ of Rep(Sn))
Rep(St) early example of tensor category besides reps of a group
Luke Sciarappa Algebras in representations of St PRIMES 2015 4 / 10
Tensor categories
Tensor category: category w/lots of extra structure
incl. tensor product: (X,Y ) 7→ X ⊗ Y ,associative, commutative, unital (ACU)
Examples
Vector spaces
Representations of a finite group
In particular, for n ∈ N, representations of Sn =: Rep(Sn)
For t ∈ C, Rep(St) (‘interpolation’ of Rep(Sn))
Rep(St) early example of tensor category besides reps of a group
Luke Sciarappa Algebras in representations of St PRIMES 2015 4 / 10
Tensor categories
Tensor category: category w/lots of extra structure
incl. tensor product: (X,Y ) 7→ X ⊗ Y ,associative, commutative, unital (ACU)
Examples
Vector spaces
Representations of a finite group
In particular, for n ∈ N, representations of Sn =: Rep(Sn)
For t ∈ C, Rep(St) (‘interpolation’ of Rep(Sn))
Rep(St) early example of tensor category besides reps of a group
Luke Sciarappa Algebras in representations of St PRIMES 2015 4 / 10
Tensor categories
Tensor category: category w/lots of extra structure
incl. tensor product: (X,Y ) 7→ X ⊗ Y ,associative, commutative, unital (ACU)
Examples
Vector spaces
Representations of a finite group
In particular, for n ∈ N, representations of Sn =: Rep(Sn)
For t ∈ C, Rep(St) (‘interpolation’ of Rep(Sn))
Rep(St) early example of tensor category besides reps of a group
Luke Sciarappa Algebras in representations of St PRIMES 2015 4 / 10
Simple algebras
Tensor category is good setting for commutative algebra
Algebra A has m : A⊗A→ A and e : I → A; ACU
Basic question of commutative algebra: what are simples?
Simple algebra: algebra with no nontrivial quotients
Examples
Vector spaces — unique simple, C
Representations of a finite group — simples come from subgroups
Rep(St) (‘interpolation’ of Rep(Sn)) — ???
Luke Sciarappa Algebras in representations of St PRIMES 2015 5 / 10
Simple algebras
Tensor category is good setting for commutative algebra
Algebra A has m : A⊗A→ A and e : I → A; ACU
Basic question of commutative algebra: what are simples?
Simple algebra: algebra with no nontrivial quotients
Examples
Vector spaces — unique simple, C
Representations of a finite group — simples come from subgroups
Rep(St) (‘interpolation’ of Rep(Sn)) — ???
Luke Sciarappa Algebras in representations of St PRIMES 2015 5 / 10
Simple algebras
Tensor category is good setting for commutative algebra
Algebra A has m : A⊗A→ A and e : I → A; ACU
Basic question of commutative algebra: what are simples?
Simple algebra: algebra with no nontrivial quotients
Examples
Vector spaces — unique simple, C
Representations of a finite group — simples come from subgroups
Rep(St) (‘interpolation’ of Rep(Sn)) — ???
Luke Sciarappa Algebras in representations of St PRIMES 2015 5 / 10
Simple algebras
Tensor category is good setting for commutative algebra
Algebra A has m : A⊗A→ A and e : I → A; ACU
Basic question of commutative algebra: what are simples?
Simple algebra: algebra with no nontrivial quotients
Examples
Vector spaces — unique simple, C
Representations of a finite group — simples come from subgroups
Rep(St) (‘interpolation’ of Rep(Sn)) — ???
Luke Sciarappa Algebras in representations of St PRIMES 2015 5 / 10
Simple algebras
Tensor category is good setting for commutative algebra
Algebra A has m : A⊗A→ A and e : I → A; ACU
Basic question of commutative algebra: what are simples?
Simple algebra: algebra with no nontrivial quotients
Examples
Vector spaces — unique simple, C
Representations of a finite group — simples come from subgroups
Rep(St) (‘interpolation’ of Rep(Sn)) — ???
Luke Sciarappa Algebras in representations of St PRIMES 2015 5 / 10
Simple algebras
Tensor category is good setting for commutative algebra
Algebra A has m : A⊗A→ A and e : I → A; ACU
Basic question of commutative algebra: what are simples?
Simple algebra: algebra with no nontrivial quotients
Examples
Vector spaces — unique simple, C
Representations of a finite group — simples come from subgroups
Rep(St) (‘interpolation’ of Rep(Sn)) — ???
Luke Sciarappa Algebras in representations of St PRIMES 2015 5 / 10
Simple algebras
Tensor category is good setting for commutative algebra
Algebra A has m : A⊗A→ A and e : I → A; ACU
Basic question of commutative algebra: what are simples?
Simple algebra: algebra with no nontrivial quotients
Examples
Vector spaces — unique simple, C
Representations of a finite group — simples come from subgroups
Rep(St) (‘interpolation’ of Rep(Sn)) — ???
Luke Sciarappa Algebras in representations of St PRIMES 2015 5 / 10
Simple algebras
Tensor category is good setting for commutative algebra
Algebra A has m : A⊗A→ A and e : I → A; ACU
Basic question of commutative algebra: what are simples?
Simple algebra: algebra with no nontrivial quotients
Examples
Vector spaces — unique simple, C
Representations of a finite group — simples come from subgroups
Rep(St) (‘interpolation’ of Rep(Sn)) — ???
Luke Sciarappa Algebras in representations of St PRIMES 2015 5 / 10
Simple algebras
Tensor category is good setting for commutative algebra
Algebra A has m : A⊗A→ A and e : I → A; ACU
Basic question of commutative algebra: what are simples?
Simple algebra: algebra with no nontrivial quotients
Examples
Vector spaces — unique simple, C
Representations of a finite group — simples come from subgroups
Rep(St) (‘interpolation’ of Rep(Sn)) — ???
Luke Sciarappa Algebras in representations of St PRIMES 2015 5 / 10
Rep(St)
P. Deligne, 2004
Schur-Weyl duality between Sn and partition algebras CP∗(n)
CP∗(t) defined for any t ∈ CRep(St), though no St
Luke Sciarappa Algebras in representations of St PRIMES 2015 6 / 10
Rep(St)
P. Deligne, 2004
Schur-Weyl duality between Sn and partition algebras CP∗(n)
CP∗(t) defined for any t ∈ CRep(St), though no St
Luke Sciarappa Algebras in representations of St PRIMES 2015 6 / 10
Rep(St)
P. Deligne, 2004
Schur-Weyl duality between Sn and partition algebras CP∗(n)
CP∗(t) defined for any t ∈ CRep(St), though no St
Luke Sciarappa Algebras in representations of St PRIMES 2015 6 / 10
Rep(St)
P. Deligne, 2004
Schur-Weyl duality between Sn and partition algebras CP∗(n)
CP∗(t) defined for any t ∈ C
Rep(St), though no St
Luke Sciarappa Algebras in representations of St PRIMES 2015 6 / 10
Rep(St)
P. Deligne, 2004
Schur-Weyl duality between Sn and partition algebras CP∗(n)
CP∗(t) defined for any t ∈ CRep(St), though no St
Luke Sciarappa Algebras in representations of St PRIMES 2015 6 / 10
Simple Algebras in Rep(St)
Induction functor Rep(Sk) � Rep(St−k)→ Rep(St), interpolatingordinary induction
Inducing simple algebra from Rep(Sk) and trivial algebra fromRep(St−k) gives simple algebra in Rep(St)
Theorem
If t is transcendental, every simple algebra in Rep(St) is induced in thisway from a simple algebra in Rep(Sk) for some k.
Luke Sciarappa Algebras in representations of St PRIMES 2015 7 / 10
Simple Algebras in Rep(St)
Induction functor Rep(Sk) � Rep(St−k)→ Rep(St), interpolatingordinary induction
Inducing simple algebra from Rep(Sk) and trivial algebra fromRep(St−k) gives simple algebra in Rep(St)
Theorem
If t is transcendental, every simple algebra in Rep(St) is induced in thisway from a simple algebra in Rep(Sk) for some k.
Luke Sciarappa Algebras in representations of St PRIMES 2015 7 / 10
Simple Algebras in Rep(St)
Induction functor Rep(Sk) � Rep(St−k)→ Rep(St), interpolatingordinary induction
Inducing simple algebra from Rep(Sk) and trivial algebra fromRep(St−k) gives simple algebra in Rep(St)
Theorem
If t is transcendental, every simple algebra in Rep(St) is induced in thisway from a simple algebra in Rep(Sk) for some k.
Luke Sciarappa Algebras in representations of St PRIMES 2015 7 / 10
Simple Algebras in Rep(St)
Induction functor Rep(Sk) � Rep(St−k)→ Rep(St), interpolatingordinary induction
Inducing simple algebra from Rep(Sk) and trivial algebra fromRep(St−k) gives simple algebra in Rep(St)
Theorem
If t is transcendental, every simple algebra in Rep(St) is induced in thisway from a simple algebra in Rep(Sk) for some k.
Luke Sciarappa Algebras in representations of St PRIMES 2015 7 / 10
Future directions
Possible exotic algebras in algebraic t
Noncommutative algebras, Lie algebras
Rep(GLt)?
Luke Sciarappa Algebras in representations of St PRIMES 2015 8 / 10
Future directions
Possible exotic algebras in algebraic t
Noncommutative algebras, Lie algebras
Rep(GLt)?
Luke Sciarappa Algebras in representations of St PRIMES 2015 8 / 10
Future directions
Possible exotic algebras in algebraic t
Noncommutative algebras, Lie algebras
Rep(GLt)?
Luke Sciarappa Algebras in representations of St PRIMES 2015 8 / 10
Future directions
Possible exotic algebras in algebraic t
Noncommutative algebras, Lie algebras
Rep(GLt)?
Luke Sciarappa Algebras in representations of St PRIMES 2015 8 / 10
Acknowledgments
Thanks to my mentor, Nathan Harman;to Prof. Pavel Etingof, who suggested and supervised the project;
to the PRIMES program, for facilitating this research and conference;to Dr. Tanya Khovanova, for advice on writing and presenting
mathematics;and
to my parents, Pauline and Ken Sciarappa, for transport and support.
Luke Sciarappa Algebras in representations of St PRIMES 2015 9 / 10
References
Jonathan Comes and Victor Ostrik.On blocks of Deligne’s category Rep(St).Advances in Math., 226:1331–1377, 2011.arXiv:0910.5695.
Pierre Deligne.La categorie des representations du groupe symetrique St, lorsque tn’est pas un entier naturel.In Proceedings of the International Colloquium on AlgebraicGroups and Homogenous Spaces, January 2004.
Pavel Etingof.Representation theory in complex rank, I.Transformation Groups, 19(2):359–381, 2014.arXiv:1401.6321.
Akhil Mathew.Categories parametrized by schemes and representation theory incomplex rank.J. of Algebra, 381, 2013.arXiv:1006.1381.
Luke Sciarappa Algebras in representations of St PRIMES 2015 10 / 10