Number Theory and Combinatorics Seminar


Department of Mathematics and Computer Science
Number Theory and Combinatorics Seminar
Fall 2022
For more information, contact Félix Baril Boudreau <felix.barilboudreau@uleth.ca> or Bobby Miraftab <Bobby.Miraftab@uleth.ca>. Talks are usually at noon on Monday in room M1040 (Markin Hall). All times are Mountain Time.

The live access zoom link is available here and on researchseminars.org, and also sent to our mailing list.

	The next talk:

Sep 26 at noon in M1040	Dang-Khoa Nguyen (University of Calgary)	Height gaps for coefficients of D-finite power series A power series $f(x_1,\ldots,x_m)\in \mathbb{C}[[x_1,\ldots,x_m]]$ is said to be D-finite if all the partial derivatives of $f$ span a finite dimensional vector space over the field $\mathbb{C}(x_1,\ldots,x_m)$. For the univariate series $f(x)=\sum a_nx^n$, this is equivalent to the condition that the sequence $(a_n)$ is P-recursive meaning a non-trivial linear recurrence relation of the form: $$P_d(n)a_{n+d}+\cdots+P_0(n)a_n=0$$ where the $P_i$'s are polynomials. In this talk, we consider D-finite power series with algebraic coefficients and discuss the growth of the Weil height of these coefficients. This is from a joint work with Jason Bell and Umberto Zannier in 2019 and a more recent work in June 2022.

Click on any title for more info, including the abstract. Then click on it again to hide the info.
When available, click on the mathtube icon to access a videorecording of the talk.

Date	Speaker	Title

Sep 12	everyone	Organizational meeting and problem session
at noon in M1040	(University of Lethbridge)	Please bring your favourite (math) problems. Anyone with a problem to share will be given about 5 minutes to present it. We will also choose most of the speakers for the rest of the semester.

		no seminar on September 19 (University Holiday)

Sep 26	Dang-Khoa Nguyen	Height gaps for coefficients of D-finite power series
at noon in M1040	(University of Calgary)	A power series $f(x_1,\ldots,x_m)\in \mathbb{C}[[x_1,\ldots,x_m]]$ is said to be D-finite if all the partial derivatives of $f$ span a finite dimensional vector space over the field $\mathbb{C}(x_1,\ldots,x_m)$. For the univariate series $f(x)=\sum a_nx^n$, this is equivalent to the condition that the sequence $(a_n)$ is P-recursive meaning a non-trivial linear recurrence relation of the form: $$P_d(n)a_{n+d}+\cdots+P_0(n)a_n=0$$ where the $P_i$'s are polynomials. In this talk, we consider D-finite power series with algebraic coefficients and discuss the growth of the Weil height of these coefficients. This is from a joint work with Jason Bell and Umberto Zannier in 2019 and a more recent work in June 2022.

Oct 3	Debanjana Kundu	Title TBA
at noon in M1040	(University of British Columbia)	Abstract TBA

		no seminar on October 10 (Thanksgiving)

Oct 17	Elchin Hasanalizade	Title TBA
at noon in M1040	(University of Lethbridge)	Abstract TBA

Oct 24	Speaker TBA	Title TBA
at noon in M1040	(University of Lethbridge)	Abstract TBA

Oct 31	Hugo Chapdelaine	Title TBA
at noon via zoom	(Université Laval)	Abstract TBA

		no seminar on November 7 (Reading Week)

Nov 14	Julie Desjardins	Title TBA
at noon via zoom	(University of Toronto)	Abstract TBA

Nov 21	Solaleh Bolvardizadeh	Title TBA
at noon in M1040	(University of Lethbridge)	Abstract TBA

Nov 28	Mathieu Dutour	Title TBA
at noon in M1040	(University of Alberta)	Abstract TBA

Dec 5	Alexandra Florea	Title TBA
at noon via zoom	(University of California - Irvine)	Abstract TBA

Past semesters:

Fall

F2007

F2008

F2009

F2010

F2011

F2012

F2013

F2014

F2015

F2016

F2017

F2018

F2019

F2020

F2021

Spring

S2008

S2009

S2010

S2012

S2013

S2014

S2015

S2016

S2017

S2018

S2019

S2020

S2021

S2022

Click here for a PDF file of abstracts of all talks back to 2007 (approx 425K).