Studio Phones Fellowship Program
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Studio Phones Fellowship Program continues KSS Projects for communication as from April 2014. Please refer to KSS Projects for communication.
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About: Studio Phones Fellowship Program as My volunteer work
Studio Phones Fellowship Program is a research program for mathematicians, scientists or artists joint with Studio Phones.
Informations about Studio Phones Fellowship Program:
2011/03/01 - 2012/12/31
researcher :
Yoshinori Dobashi(Hokkaido University)
research theme:
My purpose in this fellowship program is to study the recent works of
Yusuke Kiriu and Mikami Hirasawa on topology from a point of view of
computer graphics, primarily focusing on the visual simulation of clouds.
2011/12/01 - 2012/03/01
researcher :
Minoru Yamamoto (Aichi University of Education)
research theme:
The themes of my research are the following topics;
(1) to assist the recent works of
Yusuke Kiriu and Mikami Hirasawa for some formulations
in low dimensional topology, particularly from the viewpoint of
apparent contours of stable maps,
(2) to study the relationship between
algorithms of 3DCG and my past research
"eversion of embedded surface in 3-space"(joint with M.Hirasawa).
2011/12/01 - 2012/06/01
researcher :
Shin'ichiro Saito
research theme:
Bunraku, also known as Ningyō jōruri, is the traditional Japanese puppet theater
founded in Osaka in 1684. In this 14 years, I worked at National Bunraku Theatre
to maintain these puppets, and I retired.
My main purpose is to discuss the possibilities of character animation
in the context of computer graphics.
2011/07/01 - 2011/09/01
researcher :
Makoto Sakuma (Hiroshima University)
research theme:
My purpose in this fellowship program is to
assist the recent works of Yusuke Kiriu and Mikami Hirasawa
on formal language and formalizations in mathematics,
particularly from the view point of
geometric structures and combinatorial structures of 3-manifolds.
2011/07/01 - 2011/09/01
researcher :
Shunsuke Yatabe (National Institute of Advanced Industrial Science and Technology)
research theme:
I study a formalization of mathematics by means of logical methods.
Key objects in my research area are mathematical theories, as naive set
theories and truth theories, with circularity in non-classical logics.
The purposes during this fellowship program are to make a contribution
to a studio phones's research project by giving advices from logical
point of view, to help an its researcher to formalize non-formalized
ideas in terms of logic and category theory, and to give a new insight
for them with Yusuke Kiriu.
More details of Shunsuke Yatabe
2011/07/01 - 2011/09/01
researcher :
Daisuke Hirose (Hokkaido University)
research theme:
I study a commutative ring of positive characteristic.
Key objects in my research area are a singularity called the F-purity, an invariant called the F-pure threshold, and the test ideal, which are defined for a ring via its Frobenius morphism.
The purpose during this fellowship program is to represent them in terms of formal language and category theory, and to give a new insight for them with Yusuke Kiriu.
2011/04/01 ~ 2011/06/01 ~ 201*/**/**
researcher :
Osamu Saeki (Kyushu University)
research theme:
My purpose in this fellowship program is to assist the recent works
of Yusuke Kiriu and Mikami Hirasawa on some formulations in
low dimensional topology and computer graphics, particularly from the
viewpoint of Morse Theory and the Theory of Singularities of
Differentiable Maps.
2011/04/01 ~ 2011/06/01 ~ 201*/**/**
researcher :
Tsuyoshi Kobayashi (Nara Women’s University)
research theme:
The theme of my research is to assist the recent works of Yusuke Kiriu and Mikami
Hirasawa for some formulations on low dimensional topology, particularly from the
viewpoint of Heegaard splittings and Morse functions on 3-manifolds.
2011/02/10 - 2011/04/10 ~ 201*/**/**
researcher :
Mikami Hirasawa (Nagoya Institute of Technology)
research theme:
Let K be a knotted circle in the 3-space. In the context of
low-dimensional topology, it is known that there exists a
2-sided surface whose boundary coincides with K.
Using such surfaces, one can calculate various topological invariants of knots,
such as Alexander polynomials, determinants, and signatures.
Essential algorithms which deal with such objects are desired.
For clear understanding of them, we study their algorithm via
formal language and category theory.
2011/02/10 - 2011/04/10
researcher :
Akira Ushijima (Kanazawa University)
research theme:
Following researches about hyperbolic geometry done with Yusuke Kiriu,
our interest spreads across several fields of mathematics. Under
this fellowship program Yusuke Kiriu and I will put together our
current interests into articles.
2010/04/01 - 2010/05/31 , 2010/09/01 - 2010/09/30
researcher :
Yasuyoshi Yonezawa (Nagoya University)
research theme:
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In the opportunity of Studio Phones Fellowship Program, I start a
research program about a topology of planar diagrams. This is a joint
work with Yusuke Kiriu.
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I defined a new polynomial invariant for a given link diagram in
three-dimensional space when I was a student of doctor course in
Graduate School of Mathematics, Nagoya University.
This link invariant is Poincare polynomial associated to
a homology which is a generalization of
Khovanov-Rozansky link homology using matrix factorizations.
I study a structure of an algorithm to compute this polynomial
link invariant in the context of computer language, especially,
further possibilities of this algorithm in the context of formal language.