In a polynomial ring, the d-th Veronese subring is generated as a k-algebra by all monomials whose degree is a multiple of d. In a polynomial ring with standard grading (degree of each variable is 1), the Veronese subrings have many nice properties: they are normal, Cohen-Macaulay, and Koszul. Furthermore, their defining ideals are quadratic, binomial, and determinantal, generated by 2x2 minors of suitable matrices that also form a Groebner basis for the ideal. In this talk, we will discuss Veronese subrings of a non-standard graded polynomial ring. We will see that many of the nice properties are satisfied in two-variable case, but no longer hold in general in more variables. This is based on joint work with Bek Chase, Luca Fiorindo, Thiago de Holleben, Emanuela Marangone, Alexandra Seceleanu, and Srishti Singh.
March 17
no events
March 18
Algebra and Combinatorics
Resonance Sums, Shifted Convolutions, and Bounds towards the Square-Root Cancellation Hypothesis
Praneel Samanta - University of Kentucky Host: Kalani Thalagoda
Gibson Hall, room 1263:00 PM
The square-root cancellation hypothesis, in its original form, concerns cancellation in certain GL(1) sums with applications to the distribution of zeros of L-functions associated with GL(2) cusp forms. Building on Ye’s work on a varying GL(2) cusp form and my work (jointly with Ye and Gillespie) on the Rankin Selberg convolution of two GL(2) cusp forms, both allowed to move, I will discuss a variant in which only one form is permitted to vary. This leads naturally to shifted convolution sums and new analytic challenges. I will outline my methods and preliminary results in this setup and discuss how these fit into the broader concept of the square root cancellation hypothesis.
March 19
no events
March 20
no events
March 16 - March 20
March 16
Monday
Algebra and Combinatorics
On Non-standard Graded Veronese Subalgebras
Thai Thanh Nguyen - University of Dayton
Gibson Hall 126 A3:00 PM
In a polynomial ring, the d-th Veronese subring is generated as a k-algebra by all monomials whose degree is a multiple of d. In a polynomial ring with standard grading (degree of each variable is 1), the Veronese subrings have many nice properties: they are normal, Cohen-Macaulay, and Koszul. Furthermore, their defining ideals are quadratic, binomial, and determinantal, generated by 2x2 minors of suitable matrices that also form a Groebner basis for the ideal. In this talk, we will discuss Veronese subrings of a non-standard graded polynomial ring. We will see that many of the nice properties are satisfied in two-variable case, but no longer hold in general in more variables. This is based on joint work with Bek Chase, Luca Fiorindo, Thiago de Holleben, Emanuela Marangone, Alexandra Seceleanu, and Srishti Singh.
March 17
Tuesday
no events
March 18
Wednesday
Algebra and Combinatorics
Resonance Sums, Shifted Convolutions, and Bounds towards the Square-Root Cancellation Hypothesis
Praneel Samanta - University of Kentucky Host: Kalani Thalagoda
Gibson Hall, room 1263:00 PM
The square-root cancellation hypothesis, in its original form, concerns cancellation in certain GL(1) sums with applications to the distribution of zeros of L-functions associated with GL(2) cusp forms. Building on Ye’s work on a varying GL(2) cusp form and my work (jointly with Ye and Gillespie) on the Rankin Selberg convolution of two GL(2) cusp forms, both allowed to move, I will discuss a variant in which only one form is permitted to vary. This leads naturally to shifted convolution sums and new analytic challenges. I will outline my methods and preliminary results in this setup and discuss how these fit into the broader concept of the square root cancellation hypothesis.
March 19
Thursday
no events
March 20
Friday
no events
March 23
Holiday
Spring Break
No Classes
March 24
Holiday
Spring Break
No Classes
March 25
Holiday
Spring Break
No Classes
March 26
Holiday
Spring Break
No Classes
March 27
Holiday
Spring Break
No Classes
March 23 - March 27
March 23
Monday
Holiday
Spring Break
No Classes
March 24
Tuesday
Holiday
Spring Break
No Classes
March 25
Wednesday
Holiday
Spring Break
No Classes
March 26
Thursday
Holiday
Spring Break
No Classes
March 27
Friday
Holiday
Spring Break
No Classes
March 30
no events
March 31
no events
April 1
no events
April 2
Colloquium
The Andrews-Curtis conjecture and low-dimensional topology
Slava Krushkal - University of Virginia Host: Rafal Komendarczyk
Norman Mayer 200B3:30 PM
The Andrews-Curtis conjecture is a long-standing open problem about presentations of the trivial group, related to some of the central problems in low-dimensional topology. I will discuss a generalization of the Andrews-Curtis conjecture and recent approaches using 4-manifolds and quantum topology.
April 3
no events
March 30 - April 3
March 30
Monday
no events
March 31
Tuesday
no events
April 1
Wednesday
no events
April 2
Thursday
Colloquium
The Andrews-Curtis conjecture and low-dimensional topology
Slava Krushkal - University of Virginia Host: Rafal Komendarczyk
Norman Mayer 200B3:30 PM
The Andrews-Curtis conjecture is a long-standing open problem about presentations of the trivial group, related to some of the central problems in low-dimensional topology. I will discuss a generalization of the Andrews-Curtis conjecture and recent approaches using 4-manifolds and quantum topology.
April 3
Friday
no events
April 6
no events
April 7
no events
April 8
no events
April 9
Colloquium
Linear Flows on Translation Prisms
Jayadev S. Athreya - University of Washington Host: Kalina & Edna
Norman Mayer 200B3:30 PM
We will share a story that brings together geometry, dynamics, and number theory in interesting and novel ways, and also creates some very compelling imagery- the talk will have lots of pictures, and all relevant background notions will be introduced and explained. Motivated by the study of billiards in polyhedra, we study linear flows in a family of singular flat 3-manifolds which we call translation prisms. Using ideas of Furstenberg, and Veech, we connect results about weak mixing properties of flows on translation surfaces to ergodic properties of linear flows on translation prisms, and use this to obtain several results about unique ergodicity of these prism flows and related billiard flows. Furthermore, we construct explicit eigenfunctions for translation flows in pseudo-Anosov directions with Pisot-Vijayraghavan expansion factors, and use this construction to build explicit examples of non-ergodic prism flows, and non-ergodic billiard flows in a right prism over a regular n-gon for n = 7, 9, 14, 16, 18, 20, 24, 30. This is joint work with Nicolas Bedaride, Pat Hooper, and Pascal Hubert.
Jayadev S. Athreya - University of Washington Host: Kalina & Edna
Norman Mayer 200B3:30 PM
We will share a story that brings together geometry, dynamics, and number theory in interesting and novel ways, and also creates some very compelling imagery- the talk will have lots of pictures, and all relevant background notions will be introduced and explained. Motivated by the study of billiards in polyhedra, we study linear flows in a family of singular flat 3-manifolds which we call translation prisms. Using ideas of Furstenberg, and Veech, we connect results about weak mixing properties of flows on translation surfaces to ergodic properties of linear flows on translation prisms, and use this to obtain several results about unique ergodicity of these prism flows and related billiard flows. Furthermore, we construct explicit eigenfunctions for translation flows in pseudo-Anosov directions with Pisot-Vijayraghavan expansion factors, and use this construction to build explicit examples of non-ergodic prism flows, and non-ergodic billiard flows in a right prism over a regular n-gon for n = 7, 9, 14, 16, 18, 20, 24, 30. This is joint work with Nicolas Bedaride, Pat Hooper, and Pascal Hubert.
