Departmental PhD Thesis Exam – Francis Bischoff

Everyone is welcome to attend.  Refreshments will be served in the Math Lounge before the exam.

Thursday, June 13, 2019
11:10 a.m.

PhD Candidate:  Francis Bischoff
Supervisor:   Marco Gualtieri
Thesis title: Morita Equivalence and Generalized Kahler Geometry


Generalized Kahler (GK) geometry is a generalization of Kahler geometry, which arises in the study of super-symmetric sigma models in physics. In this thesis, we solve the problem of determining the underlying degrees of freedom for the class of GK structures of symplectic type. This is achieved by giving a reformulation of the geometry whereby it is represented by a pair of holomorphic Poisson structures, a holomorphic symplectic Morita equivalence relating them, and a Lagrangian brane inside of the Morita equivalence.

We apply this reformulation to solve the longstanding problem of representing the metric of a GK structure in terms of a real-valued potential function. This generalizes the situation in Kahler geometry, where the metric can be expressed in terms of the partial derivatives of a function. This result relies on the fact that the metric of a GK structure corresponds to a Lagrangian brane, which can be represented via the method of generating functions. We then apply this result to give new constructions of GK structures, including examples on toric surfaces.

Next, we study the Picard group of a holomorphic Poisson structure, and explore its relationship to GK geometry. We then apply our results to the deformation theory of GK structures, and explain how a GK metric can be deformed by flowing the Lagrangian brane along a Hamiltonian vector field. Finally, we prove a normal form result, which says that locally, a GK structure of symplectic type is determined by a holomorphic Poisson structure and a time-dependent real-valued function, via a Hamiltonian flow construction. 

A copy of the thesis can be found here: ut-thesis

Departmental PhD Thesis Exam – Evan Miller

Everyone is welcome to attend.  Refreshments will be served in the Math Lounge before the exam.

Date: TBA
Time: TBA

PhD Candidate:  Evan Miller
Supervisor:   Robert McCann
Thesis title:  The Navier-Stokes strain equation with applications to enstrophy growth and global regularity



A copy of the thesis can be found:

Departmental PhD Thesis Exam – Ozgur Esentepe

Everyone is welcome to attend.  Refreshments will be served in the Math Lounge before the exam.

Wednesday, May 8, 2019
11:10 a.m.

PhD Candidate:  Ozgur Esentepe
Co-Supervisors:   Joel Kamnitzer, Graham Leuschke
Thesis title:  Annihilation of Cohomology over Gorenstein Rings


One of the fundamental links between geometry and homological algebra is that smooth affine schemes have coordinate rings of finite global dimension. The roots of this link goes back to Hilbert’s syzygy theorem and later to the work of Auslander and Buchsbaum and also of Serre.

Having finite global dimension can be characterized by Ext-modules. Namely, a ring $R$ has finite global dimension if and only if there is a natural number $n$ such that $\Ext_R^n(M,N) = 0$ for every pair $M,N$ of $R$-modules. Hence, in the singular case, there are nonzero Ext-modules for arbitrarily large $n$. So, for a commutative Noetherian ring $R$, one is interested in the cohomology annihilator ideal which consists of the ring elements that annihilate all $\Ext$-modules for arbitrarily large $n$.

The main theme of this thesis is to study the cohomology annihilator ideal over Gorenstein rings. Over Gorenstein rings, the cohomology annihilator ideal can be seen as the annihilator of the stable category of maximal Cohen-Macaulay modules.

The first main result concerns the cohomology annihilator ideal of a complete local coordinate ring of a reduced algebraic plane curve singularity. We show that that the cohomology annihilator ideal coincides with the conductor ideal in this case. We use this to investigate the relation between the Jacobian ideal and the cohomology annihilator ideal.

The second main result shows that if the Krull dimension of $R$ is at most $2$, then the cohomology annihilator ideal is equal to the stable annihilator ideal of a non-singular $R$-order. We also give several generalizations of this which brings us to the second part and the closing section of this thesis. Namely, we study the dominant dimension of orders over Cohen-Macaulay rings. We provide examples and prove results on tilting modules for orders with positive dominant dimension.

A copy of the thesis can be found:  ozgurthesis-1

Departmental PhD Thesis Exam – Fabian Parsch

Everyone is welcome to attend.  Refreshments will be served in the Math Lounge before the exam.

Tuesday, June 18, 2019
11:10 a.m.

PhD Candidate:  Fabian Parsch
Supervisor:   Alex Nabutovsky
Thesis title:  Geodesic Nets with Few Boundary Points


Geodesic nets on Riemannian manifolds form a natural class of stationary objects generalizing geodesics. Yet almost nothing is known about their classification or general properties even when the ambient Riemannian manifold is the Euclidean plane or the round 2-sphere.
We survey some results and open questions (old and new) about geodesic nets on Riemannian manifolds. A particular focus will be put on the question if the number of inner vertices (balanced vertices) in a geodesic net can be bounded by the number of boundary points (unbalanced vertices) or the total imbalance.
We prove that a geodesic net with three unbalanced vertices on a non-positively curved plane has at most one balanced vertex. We do not assume any a priori bound for the degree of unbalanced vertices. The result seems to be new even in the Euclidean case.
We demonstrate by examples that the result is not true for metrics of positive curvature on the plane, and that there are no immediate generalizations of this result for geodesic nets with four unbalanced vertices which can have a significantly more complicated structure. In particular, an example of a geodesic net with four unbalanced vertices and sixteen balanced vertices that is not a union of simpler geodesic nets is constructed. The previously known irreducible geodesic nets with four unbalanced vertices have at most two balanced vertices.
We provide a partial answer for a related question, namely a description of a new infinite family of geodesic nets on the Euclidean plane with 14 unbalanced vertices and arbitrarily many balanced vertices of degree three or more.

A copy of the thesis can be found here: parsch_thesis_2019-04-09

Departmental PhD Thesis Exam – Zhifei Zhu

Everyone is welcome to attend.  Refreshments will be served in the Math Lounge before the exam.


PhD Candidate:  Zhifei Zhu
Supervisor:   Regina Rotman
Thesis title: Geometric inequalities on Riemannian manifolds


In this thesis, we will show three results which partially answer several questions in the field of quantitative geometry. We first show that there exists Riemannian metric on a 3-disk so that the diameter, volume and surface area of the boundary is bounded, but during any contraction of the boundary of the disk, there exists a surface with arbitrarily large surface area. This result answers a question of P. Papasoglu.

The second result we will prove is that on any closed 4-dimensional simply-connected Riemannian manifolds with diameter <=D, volume > v > 0 and Ricci curvature |Ric| < 3, the length of a shortest closed geodesic can be bounded by some function f(v,D) which only depends on the volume and diameter of the manifold. This result partially answers a question of M. Gromov.

As an extension of our second result, we show that on 4-dimensional Riemannian manifolds satisfying the above conditions, the first homological filling function HF_1(l) <=f_1 (v,D)l +f_2 (v,D), for some functions f_1 and f_2 which only depends on v and D. And in particular, the area of a smallest minimal surface on the manifold can be bounded by some function which only depends on v and D.

A copy of the thesis can be found here: ut-thesis

Departmental PhD Thesis Exam – Leonid Monin

Everyone is welcome to attend.  Refreshments will be served in the Math Lounge before the exam.

Friday, April 26, 2019
11:10 a.m.

PhD Candidate:  Leonid Monin
Supervisor:   Askold Khovanskii
Thesis title: Newton Polyhedra, Overdetermined system of equations, and Resultants


In the first part of this thesis we develop Newton polyhedra theory for overdetermined systems of equations. Let A_1…A_k be finite sets in Z^n  and let be an algebraic subvariety of (C^*)^n  defined by a system of  Laurent polynomials with supports in A_1… A_k.  Assuming that  Laurent polynomials are sufficiently generic, the Newton polyhedron theory computes discrete invariants of Y in terms of their Newton polyhedra. It may appear that the generic system with fixed supports  is inconsistent. In this case one is interested in the generic consistent system. We extend Newton polyhedra theory to this case and compute discrete invariants generic non-empty zero sets. Unlike the classical situation, not only the Newton polyhedra of Laurent polynomials, but also their supports themselves appear in the answers.
We proceed then to the study of overdetermined collections of linear series on algebraic varieties other than algebraic torus. That is let E_1…E_k be a finite dimensional subspace of the space of  regular sections of line bundles on an irreducible algebraic variety X, so that the system
s_1 = … = s_k = 0,
where s_i is a generic  element of E_i does not have any roots on X. In this case we investigate the consistency variety  (the closure of the set of all systems which have at least one common root) and study general properties of zero sets Z of a generic consistent system. Then, in the case of equivariant linear series on spherical homogeneous spaces we provide a strategy for computing discrete invariants of such generic non-empty set Z.
The second part of this thesis is devoted to the study of Delta-resultants of (n+1)-tuple of Laurent polynomials with generic enough Newton polyhedra.  We provide an algorithm for computing Delta-resultant assuming that an n-tuple f_2, …, f_{n+1} is developed. We provide a relation between the product of f_1 over roots of  f_2 = … = f_{n+1} = 0 in (C^*)^n and the product of f_2 over roots of f_1=f_3 = … = f_{n+1} = 0 in (C^*)^n assuming that the n-tuple (f_1f_2, f_3…f_{n+1} is developed. If all n-tuples contained  in (f_1…f_{n+1}) are developed we provide a signed version of Poisson formula for Delta-resultant. Interestingly, the sign of the sparse resultant is nontrivial and is defined through Parshin symbols. Our proofs are based on a topological version of the Parshin reciprocity laws.
A copy of the thesis can be found here:  ut-thesis monin

Departmental PhD Thesis Exam – Francisco Guevara Parra

Everyone is welcome to attend.  Refreshments will be served in the Math Lounge before the exam.

Friday, March 15, 2019
1:30 p.m.
Fields Institute, room 210

PhD Candidate:  Francisco Guevara Parra
Supervisor:   Stevo Todorcevic
Thesis title:  Analytic spaces and their Tukey types


In this Thesis we study topologies on countable sets from the perspective of Tukey reductions of their neighbourhood filters. It turns out that is closely related to the already established theory of definable (and in particular analytic) topologies on countable sets. The connection is in fact natural as the neighbourhood filters of points in such spaces are typical examples of directed sets for which Tukey theory was introduced some eighty years ago. What is interesting here is that the abstract Tukey reduction of a neighbourhood filter $\mathcal{F}_{x}$ of a point to standard directed sets like $\mathbb{N}^\mathbb{N}$ or $\ell_1$ imposes that $\mathcal{F}_{x}$ must be analytic. We develop a theory that examines the Tukey types of analytic topologies and compare it by the theory of sequential convergence in arbitrary countable topological spaces either using forcing extensions or axioms such as, for example, the Open Graph Axiom. It turns out that in certain classes of countable analytic groups we can classify all possible Tukey types of the corresponding neighbourhood filters of identities. For example we show that if $G$ is a countable analytic $k$-group then $1=\{0\},$ $\mathbb{N}$ and $\mathbb{N}^\mathbb{N}$ are the only possible Tukey types of the neighbourhood filter $\mathcal{F}_{e}^{G}$. This will give us also new metrization criteria for such groups. We also show that the study of definable topologies on countable index sets has natural analogues in the study of arbitrary topologies on countable sets in certain forcing extensions.

A copy of the thesis can be found here: Francisco_PhD_Thesis

Departmental PhD Thesis Exam – Duncan Dauvergne

Everyone is welcome to attend.  Refreshments will be served in the Math Lounge before the exam.

Monday, March 25, 2019
10:10 a.m.

PhD Candidate:  Duncan Dauvergne
Supervisor:   Balint Virag
Thesis title:  Random sorting networks, the directed landscape, and random polynomials


The first part of this thesis is on random sorting networks. A sorting network is a shortest path from $12 \cdots n$ to $n \cdots 21$ in the Cayley graph of the symmetric group $S_n$ generated by adjacent transpositions. We prove that in a uniform random $n$-element sorting network $\sigma^n$, all particle trajectories are close to sine curves with high probability. We also find the weak limit of the time-$t$ permutation matrix measures of $\sigma^n$. As a corollary, we show that if $S_n$ is embedded into $\mathbb{R}^n$ via the map $\tau \mapsto (\tau(1), \tau(2), \dots \tau(n))$, then with high probability, the path $\sigma^n$ is close to a great circle on a particular $(n-2)$-dimensional sphere. These results prove conjectures of Angel, Holroyd, Romik, and Vir\’ag. To prove these results, we find the local limit of random sorting networks and prove that the local speed distribution is the arcsine distribution on $[-\pi, \pi]$.

The second part of this thesis is on last passage percolation. The conjectured limit of last passage percolation is a scale-invariant, independent, stationary increment process with respect to metric composition. We prove this for Brownian last passage percolation. We construct the Airy sheet and characterize it in terms of the Airy line ensemble. We also show that the last passage geodesics converge to random functions with H\”older-$2/3^-$ continuous paths. To prove these results, we develop a new probabilistic framework for understanding the Airy line ensemble.

The third part of this thesis is on random sums of orthonormal polynomials. Let $G_n = \sum_{i=0}^n \xi_i p_i$, where the $\xi_i$ are i.i.d. non-degenerate complex random variables, and $\{p_i\}$ is a sequence of orthonormal polynomials with respect to a regular measure $\tau$ supported on a compact set $K$. We show that the zero measure of $G_n$ converges weakly almost surely to the equilibrium measure of $K$ if and only if $\mathbb{E}\log(1 + |\xi_0|) < \infty$. We also show that the zero measure of $G_n$ converges weakly in probability to the equilibrium measure of $K$ if and only if $\mathbb{P}(|\xi_0| > e^n) = o(n^{-1})$. Our methods also work for more general sequences of asymptotically minimal polynomials in $L^p(\tau)$, where $p \in (0, \infty]$.

A copy of the thesis can be found here: MainThesisPhD

2018 Malcolm Slingsby Robertson Prize winner and doctoral awards competition


The Department is happy to announce that the 2018 winner of the Malcolm Slingsby Robertson Prize in Mathematics for “a graduating PhD student who has demonstrated excellence in research” is:

  • Alexander (Sacha) Mangerel

The Awards subcommittee of the Graduate Committee reviewed the theses and appraisal reports of several excellent graduating students for this prize.

Sacha wrote his thesis titled “Topics in Multiplicative and Probabilistic Number Theory under the supervision of John Friedlander.  One of his papers, joint with O. Klurman, of close to fifty pages, has been accepted for
publication in Mathematische Annalen.
He took on a Postdoctoral position at the
Centre de Recherches Mathématiques, Université de Montréal.

The prize carries a $500 monetary award. We congratulate Sacha for his excellent work and wish him great success!

Malcolm Slingsby Robertson Prize winner 2018

Sacha is also the department’s sole nomination for the CMS Doctoral Prize.

Our sole nomination for the CAIMS Cecil Graham Doctoral Dissertation Award (Applied Math) is Shuangjian Zhang, student of Robert McCann.  Shuangjian is presently a postdoc at ENSAE ParisTech.

We hope the nominations are successful.

UTGSU accepting applications for the 2018 Conference Bursary (Fall Cycle)


The UTGSU Conference Bursary was created in 2016 to financially assist UTGSU Members attending and/or presenting at academic conferences. The amount of a single bursary is $250, regardless of conference location or estimated expenses. A total of 120 bursaries are distributed each year, corresponding to 40 bursaries per each of the UTGSU’s three (3) Conference Bursary Cycles: Fall Cycle, Spring Cycle, and Summer Cycle.

Applications to the 2018 UTGSU Conference Bursary (Fall Cycle) will open on November 1, 2018 and will remain open until 11:59 PM on November 15, 2018.  This cycle is for conferences with start dates on or between December 1, 2018 and March 31, 2019.

Please note that you must be a UTGSU Member at the time of application for your application to be deemed eligible. Applications will only be accepted for conferences yet to be attended, not for conferences already attended. Additionally, applicants may only submit one application per Conference Cycle.

For more information and to access the Conference Bursary Application and Instructions please visit: Contact Information and Accessibility If you require accessibility accommodations or have any questions related to the UTGSU Conference Bursary, please email the UTGSU Finance Commissioner at