Akira
Sakai
(ResearchGate, researchmap, Visionary
Scientists)
Professor in Mathematics
North 10, West 8, Kita-ku, Sapporo
Hokkaido 060-0810
JAPAN
Contents
IV. Organizing scientific meetings
Updated: June 16, 2020.
I.
Fields of interestiϊ{κΕΝ±Ώηj
My major research field is mathematical physics
(probability and statistical mechanics). The topics I have been most fascinated
with are phase transitions and critical phenomena, as well as associated
scaling limits. For example, the Ising model, a
statistical-mechanical model of ferromagnetism, is known to take on positive
spontaneous magnetization as soon as the temperature of the system is turned
down below the critical point. Various other observables also exhibit singular behavior around the critical point, due to cooperation of
infinitely many interacting variables. To fully understand such phenomena, it
would require development of a theory beyond the standard probability theory.
This is a challenging and intriguing problem, towards which I would love to
make even a tiny contribution.
The mathematical models I have been studying are
· the Ising model (for magnets),
· the Σ4 model (in lattice scalar-field theory),
· self-avoiding walk (for linear polymers),
· lattice trees (for branched polymers),
· percolation (for random media),
· the contact process (for the spread of an infectious disease),
· random walk with reinforcement.
1.
Akira Sakai.
Percolation
2020ip[R[VΜ2020j. Submitted.
2.
Akira Sakai.
Correct bounds on the Ising lace-expansion
coefficients. Submitted. arXiv:2003.09856.
3.
S. Handa, K. Kamakura, Y.
Kamijima and A. Sakai. Finding optimal solutions by stochastic
cellular automata. Submitted. arXiv:1906.06645.
4.
Akira Sakai.
Crossover phenomena in the critical behavior
for long-range models with power-law couplings. RIMS Kokyuroku
Bessatsu B79 (2020):
51–62. arXiv:1812.10275.
5.
S. Handa, Y. Kamijima and A. Sakai.
A survey on the lace expansion for the nearest-neighbor
models on the BCC lattice. Taiwanese J. Math. 24 (2020):
723–784. arXiv:1712.05573.
6.
L.-C. Chen and A. Sakai. Critical two-point function for
long-range models with power-law couplings: The marginal case for d ³ dc. Commun.
Math. Phys. 372 (2019): 543–572 (the
full-text view-only version). arXiv:1808.06789.
7.
S. Handa, M. Heydenreich and A. Sakai. Mean-field bound on the 1-arm exponent
for Ising ferromagnets in high dimensions. A chapter in Sojourns in Probability and
Statistical Physics - I (V. Sidoravicius ed.,
Springer, 2019). arXiv:1612.08809.
8.
A. Sakai and G. Slade. Spatial moments for high-dimensional
critical contact process, oriented percolation and lattice trees. Electron. J. Probab. 24 (2019): no. 65, 1–18. arXiv:1810.04011.
9.
Akira Sakai.
Hyperscaling for oriented percolation in 1+1
space-time dimensions. J. Stat. Phys. 171 (2018): 462–469
(the full-text view-only version). arXiv:1709.08291.
10.
T. Arae, S. Isai, A. Sakai,
K. Mineta, M. Yokota-Hirai, Y. Suzuki, S. Kanaya, J.
Yamaguchi, S. Naito and Y. Chiba. Coordinated regulations of
mRNA synthesis and decay during cold acclimation in arabidopsis
cells. Plant
Cell Physiol. 58 (2017): 1090–1102.
11.
Y. Chino and A. Sakai. The quenched critical point for self-avoiding
walk on random conductors. J. Stat.
Phys. 163 (2016): 754–764. arXiv:1508.01262.
12.
Akira Sakai.
Application of the lace expansion to the Σ4 model. Commun. Math.
Phys. 336 (2015): 619–648. arXiv:1403.5714.
13.
L.-C. Chen and A. Sakai. Critical two-point functions for long-range
statistical-mechanical models in high dimensions. Ann. Probab. 43 (2015): 639–681.
arXiv:1204.1180.
14.
L.-C. Chen and A. Sakai. Asymptotic behavior
of the gyration radius for long-range self-avoiding walk and long-range
oriented percolation. Ann. Probab. 39
(2011): 507–548. arXiv:1002.0875.
15.
Akira Sakai.
Large-time asymptotics of the gyration radius
for long-range statistical-mechanical models. RIMS
Kokyuroku Bessatsu B21 (2011): 53–62. arXiv:0912.5117.
16.
R. van der Hofstad and A. Sakai. Convergence
of the critical finite-range contact process to super-Brownian motion above the
upper critical dimension: The higher-point functions. Electron. J. Probab. 15 (2010): no. 27, 801–894. arXiv:0809.1712.
17.
L.-C. Chen and A. Sakai. Critical behavior
and the limit distribution for long-range oriented percolation. II: Spatial
correlation. Probab.
Theory Relat. Fields 145 (2009): 435–458. arXiv:0804.2039.
18.
Akira Sakai.
Applications of the lace expansion to statistical-mechanical models. A chapter in Analysis and
Stochastics of Growth Processes and Interface Models (P. Mörters et al. eds., Oxford University Press, 2008).
19.
M. Heydenreich, R. van
der Hofstad and A. Sakai. Mean-field behavior
for long- and finite range Ising model, percolation and self-avoiding walk. J. Stat. Phys. 132 (2008): 1001–1049. arXiv:0712.0312.
20.
L.-C. Chen and A. Sakai. Critical behavior
and the limit distribution for long-range oriented percolation. I. Probab. Theory
Relat. Fields 142 (2008): 151–188. arXiv:0703455.
21.
Akira Sakai.
Diagrammatic bounds on the lace-expansion coefficients for oriented
percolation. arXiv:0708.2897.
22.
M. Holmes and A. Sakai. Senile reinforced random walks. Stoch.
Proc. Appl. 117 (2007): 1519–1539.
23.
Akira Sakai. Lace expansion for the Ising model.
Commun.
Math. Phys. 272
(2007): 283–344. arXiv:math-ph/0510093.
24.
R. van der Hofstad and A. Sakai. Critical
points for spread-out self-avoiding walk, percolation and the contact process
above the upper critical dimensions.
Probab.
Theory Relat. Fields 132 (2005): 438–470. arXiv:math/0402050.
25.
Akira Sakai. Mean-field behavior
for the survival probability and the percolation point-to-surface connectivity.
J.
Stat. Phys. 117 (2004): 111–130.
26.
R.
van der Hofstad and A. Sakai. Gaussian scaling for the critical
spread-out contact process above the upper critical dimension. Electron. J. Probab. 9 (2004): no. 24, 710–769. arXiv:math/0402049.
27.
M.
Holmes, A.A. Járai, A. Sakai and G. Slade. High-dimensional graphical networks of
self-avoiding walks. Canad.
J. Math. 56 (2004): 77–114.
28.
Akira Sakai. Hyperscaling
inequalities for the contact process and oriented percolation. J. Stat. Phys.
106 (2002): 201–211.
29.
Akira Sakai. Mean-field critical behavior
for the contact process. J. Stat. Phys.
104 (2001): 111–143.
Year 2020
1. May 20–22, NCTS, Taiwan.
2. June 15–19, IHES, France.
3. Fall, City University of Hong Kong, China.
4. Fall, Sun Yat-sen
University, Guangzhou, China.
Year 2019
1. Finding optimal solutions by stochastic
cellular automata.
·
7th
Wellington Workshop in Probability and Mathematical Statistics (December 5–7).
Wellington, New Zealand.
·
Workshop
on Probabilistic Methods in Statistical Mechanics of Random Media and Random
Fields (May 27–31). Universiteit Leiden, the Netherlands.
·
AIMaP 1-day Workshop
(March 26). RIES, Hokkaido University, Japan.
2. Critical two-point function for long-range
models with power-law couplings: The marginal case for d ³ dc.
·
The 12th
MSJ-SI gStochastic Analysis, Random Fields and Integrable Probabilityh (July
31–August 9). Kyushu University, Japan.
·
Seminar in Statistics
(January 16). The University of Auckland, New Zealand.
Year 2018
1.
Critical
two-point function for long-range models with power-law couplings: The marginal
case for d ³ dc.
·
17th
International Symposium gStochastic Analysis on Large-scale Interacting Systemsh
(November 5–8). RIMS, Kyoto
University, Japan.
·
High-dimensional Critical Phenomena in Random
Environments (September 24–26). The University of Bristol, UK.
·
2018
Spring Probability Workshop (June 4–8). Academia Sinica,
Taiwan.
2.
Hyperscaling for oriented percolation in 1+1 space-time dimensions.
·
Rikkyo Math Phys
Seminar (May 23). Rikkyo University, Japan
·
NUS Probability Seminar (February 12). National University of Singapore, Singapore.
Year 2017
1.
Hyperscaling for oriented percolation in 1+1 space-time dimensions.
·
NTU Math Colloquium (November 27).
National Taiwan University, Taiwan.
·
MSJ
Fall Meeting (September 11–14). Yamagata University, Japan.
3.
Critical
behavior for oriented percolation: From a mathematically
rigorous standpoint.
·
Summer School in Mathematical
Physics (August 25–27). The
University of Tokyo, Japan.
4.
The
lace expansion for self-avoiding walk and percolation on the BCC lattice.
·
Seminar on
Probability (July 18). Osaka
University, Japan.
5.
Mean-field
bound on the 1-arm exponent for high-dimensional Ising
ferromagnets.
·
Physical and
Mathematical Approaches to Interacting Particle Systems – In Honer of 70th Birthday of Herbert Spohn (January
11–12). Tokyo Institute of Technology, Japan.
IV.
Organizing scientific meetings
1.
The
3rd workshop on Universality and Scaling Limits in Probability and
Statistical Mechanics (Planned in 2021). Hokkaido University, Japan.
2.
The 10th World Congress in Probability and
Statistics (July 19–23, 2021).
Seoul National University, South Korea.
3.
The
RIMS Workshop gRigorous Statistical Mechanics and Related Topics IIh (November 24–27, 2020). RIMS, Kyoto University, Japan.
4.
The
RIMS Workshop gRigorous
Statistical Mechanics and Related Topicsh (November 18–21, 2019). RIMS, Kyoto University, Japan.
5.
The
1-day workshop gRecent
Progress in Probability Theory and Its Applicationsh (July 28, 2017).
Hokkaido University, Japan.
6.
2017
Spring Probability Workshop (March 6–8, 2017). Academia Sinica, Taiwan.
7.
The 2nd
workshop on Universality and Scaling Limits in Probability and Statistical Mechanics
(August 5–9, 2013). Hokkaido
University, Japan.
8.
International
Workshop on Potential Theory (February 4, 2013). Hokkaido University, Japan.
9.
The
RIMS workshop gApplications
of Renormalization Group Methods in Mathematical Sciencesh (September 12–14, 2011). Kyoto University, Japan.
10.
The
SPA Satellite workshop gUniversality and
Scaling Limits in Probability and Statistical Mechanicsh (August 30–September 3, 2010). Hokkaido
University, Japan.
V.
Teaching (April 2020 – February 2021)
|
1st semester |
Monday |
Tuesday |
Wednesday |
Thursday |
Friday |
|
8:45 – 10:15 |
N.A. |
Science & Tech |
N.A. |
N.A. |
Explore B-Math |
|
10:30 – 12:00 |
N.A. |
Kawamoto |
N.A. |
N.A. |
N.A. |
|
12:00 – 13:00 |
Lunch |
Lunch |
Lunch |
Lunch |
Lunch |
|
13:00 – 14:00 |
N.A. |
Liang |
Matsunuma |
Explore A-Math |
Tanaka |
|
14:05 – 15:05 |
N.A. |
Moriya |
Noda |
N.A. |
Kawamoto |
|
15:10 – 16:10 |
CREST (stability) |
Tangiku |
Matsui |
N.A. |
Kamakura |
|
16:15 – 17:15 |
CREST (SCA) |
N.A. |
N.A. |
F.M. |
N.A. |
|
17:30 – 19:00 |
CREST (math all) |
N.A. |
N.A. |
F.M. |
N.A. |
(Lectures; Seminars; Faculty Meetings; Not Available )
1. Group Seminar on
Mathematics (1st semester @ Zoom).
·
B3 Seminar (Matsui)
on Theory of Probability and Random Processes.
·
B3 Seminar (Noda) on Mathematics in Phase Transitions and Critical
Behavior.
·
B4 Seminar (Matsunuma) on Sandpile
models.
·
B4 Seminar (Tangiku) on Stochastic
Differential Equations.
·
M1 Seminar (Liang) on the contact process with dynamic edges on Z.
·
M1 Seminar (Moriya) on Random Graph Dynamics.
·
M1 Seminar (Tanaka)
on Stochastic Calculus for Finance.
·
M2 Seminar (Kamakura)
on Markov Chains and Mixing Times.
·
M2 Seminar (Kawamoto)
on Non-intersection probability of random
walks; Self-avoiding walk in 4 dimensions.
·
D4 Seminar (Kamijima) on Oriented
percolation on the BCC lattice.
·
CREST Seminar (Fukushima-Kimura, Toyokawa) on Stability
of energy landscape.
·
CREST Seminar (Fukushima-Kimura, Kamijima, Kamakura) on Stochastic cellular
automata (SCA).
·
CREST Seminar (Fukushima-Kimura, Aoki, Kamijima, Toyokawa, Ishibashi, Kamakura).
2. The World of Science and TechnologyiΘwEZpΜ’EFwΜ½Μ΅έj (1st semester,
Tuesdays 8:45–10:15 @ ELMS); WeBWorK.
3. Explore Advanced MathematicsiwƧTIj (1st
semester, Thursdays 13:00–14:30 @ Zoom).
4. Explore Basic MathematicsiwξbTj (1st semester, Fridays
8:45–10:15 @ Zoom).
5. Calculus IIiχͺΟͺwIIj (2nd semester,
Tuesdays & Wednesdays 13:00–14:30 @ Multimedia
Education Bldg ?-???); WeBWorK
for self-studies (need ELMS ID & Password).
6. Introduction to Statisticsim¦Evόεj (2nd semester, Wednesdays
8:45–10:15 @ Science Bldg 3-309).
7. Analytic Studies: Phase Transition and Critical
Behavior of Oriented PercolationiπΝwu`FLόp[R[VΜ]ΪEΥE»Ϋj (2nd
semester, Mondays 10:30–12:00 @ Science Bldg 3-204).
· August
2020 – present
Associate editor of Taiwanese
Journal of Mathematics.
· March
2020 – present
Associate editor of Mathematical Physics, Analysis
and Geometry.
· February
2020 – present
Professor in Mathematics, Faculty of Science, Hokkaido
University, Japan.
· September
2015 – August 2019
Councilor of the Bernoulli Society.
· Excellent
Teachers 2018,
2015,
2012,
2011
The Hokkaido University Presidentfs Award for Teaching Excellence in 2013 and in 2012.
· April
2011 – January 2020
Associate professor in Mathematics, Faculty of Science, Hokkaido
University, Japan.
· March
2008 – March 2011
Tenure-track assistant professor of Creative Research Institution SOUSEI,
Hokkaido University, Japan.
· April
2006 – February 2008
Lecturer in Probability of the Department of Mathematical Sciences,
the University of Bath, UK.
· April
2004 – March 2006
Postdoctoral researcher of Wiskunde en Informatica, Technische Universiteit Eindhoven (TU/e), the Netherlands.
· January
2003 – March 2004
Postdoctoral researcher of the Interacting-Stochastic-Systems
(ISS) group, EURANDOM, the Netherlands.
· January
2001 – December 2002
Postdoctoral researcher of the Department of Mathematics, the University
of British Columbia, Canada.
· April
1996 – December 2000
Ph.D. study in Applied Physics, Tokyo Institute of
Technology, Japan.
Awarded Ph.D. for the thesis gAnalyses of the
Critical Behavior for the Contact Process based on a
Percolation Structureh supervised by Professor Takashi Hara.
· April
1994 – March 1996
Master study in Applied Physics, Tokyo Institute of
Technology, Japan.
Awarded M.Sc. for the thesis gApproach to Fractal
Growth Phenomenah supervised by Professor Takashi Hara.
· April
1990 – March 1994
Undergraduate study in Applied Physics, Tokyo Institute
of Technology, Japan.
Awarded B.Sc. for the thesis gRecurrent in the
Plane, Transient in Spaceh supervised by Professor Kohei Uchiyama.