Thursday, July 30, 2020 1:00 PM EDT

Please note: This master’s thesis presentation will be given online.

Wei Sun, Master’s candidate
David R. Cheriton School of Computer Science

Friday, July 24, 2020 2:00 PM EDT

Please note: This master’s thesis presentation will be given online.

Jeremy Chen, Master’s candidate
David R. Cheriton School of Computer Science

Friday, July 24, 2020 1:30 PM EDT

Please note: This master’s thesis presentation will be given online.

Xinan Yan, PhD candidate
David R. Cheriton School of Computer Science

Thursday, July 23, 2020 2:00 PM EDT

Please note: This master’s thesis presentation will be given online.

Davood Anbarnam, Master’s candidate
David R. Cheriton School of Computer Science

Thursday, July 23, 2020 1:00 PM EDT

Please note: This PhD defence will be given online.

Anastasia Kuzminykh, PhD candidate
David R. Cheriton School of Computer Science

Thursday, July 23, 2020 11:00 AM EDT

Please note: This master’s thesis presentation will be given online.

Steven Engler, Master’s candidate
David R. Cheriton School of Computer Science

Thursday, July 23, 2020 9:00 AM EDT

Please note: This PhD defence will be given online.

Nashid Shahriar, PhD candidate
David R. Cheriton School of Computer Science

Wednesday, July 22, 2020 1:30 PM EDT

Please note: This master’s thesis presentation will be given online.

Dhruv Kumar, Master’s candidate
David R. Cheriton School of Computer Science

Wednesday, July 22, 2020 11:00 AM EDT

Please note: This master’s thesis presentation will be given online.

Chelsea Komlo, Master’s candidate
David R. Cheriton School of Computer Science

Thursday, July 9, 2020 10:00 AM EDT

Please note: This PhD defence will be given online.

Abel Molina, PhD candidate
David R. Cheriton School of Computer Science

We present results on quantum Turing machines and on prover-verifier interactions.

Wednesday, July 8, 2020 3:00 PM EDT

Please note: This PhD seminar will be given online.

Stavros Birmpilis, PhD candidate
David R. Cheriton School of Computer Science

Any nonsingular matrix $A \in \mathbb{Z}^{n\times n}$ is unimodularly equivalent to a unique diagonal matrix $S = diag(s_1, s_2, \ldots, s_n)$ in Smith form. The diagonal entries, the invariant factors of $A$, are positive with $s_1 \mid s_2 \mid \cdots \mid s_n$, and unimodularly equivalent means that there exist unimodular (with determinant ±1) matrices $U, V \in \mathbb{Z}^{n\times n}$ such that $UAV = S$.

Wednesday, July 8, 2020 10:30 AM EDT

Please note: This PhD seminar will be given online.

Ershad Banijamali, PhD candidate
David R. Cheriton School of Computer Science

Monday, July 6, 2020 1:00 PM EDT

Please note: This master’s thesis presentation will be given online.

Achyudh Ram, Master’s candidate
David R. Cheriton School of Computer Science

Thursday, July 2, 2020 11:00 AM EDT

Please note: This seminar will be given online.

Amit Sinhababu
Aalen University, Germany

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