3,235 reputation
31143
bio website math.uwaterloo.ca/~y28xiao
location Waterloo, ON
age 28
visits member for 4 years, 2 months
seen 2 hours ago

PHD Candidate in Pure Mathematics, University of Waterloo. I am being advised by Professor Cameron Stewart, FRSC.

I am interested in analytic number theory, prime number theory, transcendence theory, and power-free values of polynomials. In particular I work on problems involving applications and generalizations of the determinant methods pioneered by Bombieri/Pila, Heath-Brown, and Salberger, including the real analytic determinant method, the approximate determinant method of Heath-Brown, and the global determinant method of Salberger (an extension of the $p$-adic determinant method of Heath-Brown), as well as other potential variants.


Jan
25
asked Coefficients of Hilbert polynomials
Jan
25
reviewed Approve How to topologize X(R) when R is a topological ring?
Jan
20
reviewed Approve Lusternik-Schnirelmann Theorem
Jan
20
comment Thin sequences with good counting properties
That comment is satisfactory for my purposes, thank you
Jan
20
reviewed Approve Limits of determinacy on reals
Jan
19
asked Thin sequences with good counting properties
Jan
19
asked Estimating solutions to a binary form congruence with small moduli and prime inputs
Jan
8
awarded  Popular Question
Dec
29
awarded  Nice Question
Dec
27
reviewed Approve Books or references on multidimensional matrix operations
Dec
19
awarded  Good Question
Dec
18
awarded  Notable Question
Dec
10
reviewed Approve Differential Algebra Book
Dec
8
asked Questions on roots of integral polynomials over $\mathbb{F}_p$
Dec
7
comment Large solutions to Thue equations
I added a condition to eliminate this particular counter-example, which as you noted is quite obvious.
Dec
7
revised Large solutions to Thue equations
added 103 characters in body
Dec
5
asked Large solutions to Thue equations
Dec
5
accepted A question on how polynomials split over $\mathbb{F}_p$ for large primes $p$
Dec
5
asked A question on how polynomials split over $\mathbb{F}_p$ for large primes $p$
Nov
27
revised Do we know that 'most' finite groups are Galois groups of number fields?
added 6 characters in body