Contact Info
Pure MathematicsUniversity of Waterloo
200 University Avenue West
Waterloo, Ontario, Canada
N2L 3G1
Departmental office: MC 5304
Phone: 519 888 4567 x33484
Fax: 519 725 0160
Email: puremath@uwaterloo.ca
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Spiro Karigiannis, Department of Pure Mathematics, University of Waterloo
“Differential Analysis I: The Banach space implicit function theorem”
Spiro Karigiannis, Department of Pure Mathematics, University of Waterloo
“Differential Analysis II: The Banach space implicit function theorem”
Raymond Cheng, Pure Math Department, University of Waterloo
“Bundles over Complex Tori”
Raymond Cheng, Pure Math Department, University of Waterloo
“Bundles over Complex Tori, Continued”
I will tie up some loose ends on the classification of vector bundles on elliptic curves from last time and discuss some of Atiyah’s techniques in the classification. After that, I will comment on the progress made on classifying vector bundles over higher dimensional tori.
M3 2134
Stanley Yao Xiao, Department of Pure Math, University of Waterloo
“Rational points on algebraic varieties repel each other”
In this talk I will a powerful ”point repulsion” principle for rational points lying on algebraic varieties, also known as the ‘determinant method’.
MC 5479
Ehsaan Hossain, Department of Pure Mathematics, University of Waterloo
“Classification of simple graph algebras”
Abstract
Shuntaro Yamagishi, Department of Pure Math, University of Waterloo
“Diophantine equations in the primes”
In their paper ”Diophantine equations in the primes”, Cook and Magyar give a condition for a system of polynomials to be soluble in primes via the HardyLittlewood circle method. I would like to describe their method.
MC 5479
Spiro Karigiannis, Pure Mathematics Department, University of Waterloo
“Differential Analysis III: The Kuranishi Model and the SardSmale Theorem”
Ehsaan Hossain, Department of Pure Mathematics, University of Waterloo
“K0 of a C*algebra, continued”
Igor Shparlinski, University of New South Wales
“Effective Hilbert’s Nullstellensatz and Finite Fields”
Mohammad Mahmoud, Department of Pure Mathematics, University of Waterloo
“Ramsey’s Theorem”
We have seen with Sam two proofs of Ramsey’s Theorem. This time we give a third proof of that uses Konig’s Lemma but can be carried out in RCA0.
M34206
Sam Harris, Department of Pure Mathematics, University of Waterloo
“K1 of a C*algebra”
Having defined K0 of a C*algebra, we now define K1 as well as provide examples and basic properties.
Departmental office: MC 5304
Phone: 519 888 4567 x33484
Fax: 519 725 0160
Email: puremath@uwaterloo.ca