Four projects on Intrinsic Motivation, Embodiment, Creativity & Videogames.

Christian Guckelsberger, Computer Scientist, Art Historian and Assistant Professor in Creative Technologies at Aalto University.

What is an agent?

Nathaniel Virgo, Associate Professor at Earth-Life Science Insitute (ELSI) in Tokyo.

QG group meeting.
Speaker: Yasha Neiman.
Title: Locality of higher-spin gravity from anomalous dimensions of double-trace operators.

Curious about Intellectual Property? Please join our introductory seminar, hosted by TDIC alongside guest Patent Lawyer Gregory Kirsch.

This is an introduction-level seminar open to everyone at OIST.

"Differential glial control of parallel memory formation" by Prof. Ko Matsui,

Super-network Brain Physiology, Graduate School of Life Sciences, Tohoku University

Talk 1: 15:00-16:00

Speaker: Prof. Shigeaki Koike (Waseda University)

Title: ABP maximum principle with upper contact sets for fully nonlinear elliptic PDEs

Talk 2: 16:00-17:00

Speaker: Prof. Michiaki Onodera (Tokyo Institute of Technology)

Title: A perturbation theory of overdetermined problems

Speaker: Prof. Salvatore Federico

A faculty member in the Department of Mechanical and Manufacturing Engineering and the Department of Biomedical Engineering (2008-present), with an adjunct position in Kinesiology, Human Performance Laboratory (2012-present)

Title: "The Truesdell Rate in Continuum Mechanics"

Dr. Martin J. How

Royal Society University Research Fellow

Ecology of Vision Lab, University of Bristol

Abstract:

The Vicsek set is a tree-like fractal on which neither analog of curvature nor differential structure exists, whereas the heat kernel satisfies sub-Gaussian estimates. I will talk about Sobolev spaces and scale invariant $L^p$ Poincar\'e inequalities on the Vicsek set. Several approaches will be discussed, including the metric approach of Korevaar-Schoen and the approach by limit approximation of discrete p-energies.

Zoom: https://oist.zoom.us/meeting/register/tJEpdu-uqTwrGdFV5IrA0woMhvhlxVa_5ttw

Abstract: The Heisenberg uncertainty principle, which is a fundamental result in quantum mechanics, and related inequalities such as the hydrogen and Hardy uncertainty principles, belong to the family of geometric inequalities known as the Caffarelli-Kohn-Nirenberg inequalities. In this talk, we discuss some recent results about the optimal uncertainty principles, Caffarelli-Kohn-Nirenberg inequalities, and their quantitative stability. The talk is based on recent joint works with C. Cazacu, J. Flynn and G. Lu.