Vice Director / PI
Topological data analysis is an emerging concept in applied mathematics in which we characterize “shape of
massive and complex data” using topological methods. In particular, persistent homology and mapper are
nowadays applied to a wide variety of scientific and engineering problems including materials science,
life science and social networks etc. By combining various mathematics such as topology, representation,
statistics and probability theory, our group has succeeded in making topological data analysis powerful
and general methods for practical problems. For example, we have applied these methods to structural
analysis in materials science so far, and the developed techniques by our group are expected to be a key
technology for materials informatics. In ASHBi, we aim to understand the principle of species differences
among humans, non-human primates, and rodents by applying topological data analysis, dynamical system, and
machine learning to multi-species, multi-cell types, multi-hierarchical omics information. This analysis
will also be extended into the identification of the principles for the species differences on the scales
of time and physical dimensions in development and growth. We hope that interdisciplinary researches
between biology and mathematics in ASHBi will develop powerful advanced mathematical methodology for
massive and complex biological data, and contribute to the progress of life science.
Obayashi, Y. Hiraoka, M. Kimura. Persistence Diagrams with Linear Machine Learning Models. J. Appl. and Comput. Topology (2018), 1, 421–449.
Kusano, K. Fukumizu, and Y. Hiraoka. Kernel method for persistence diagrams via kernel embedding and weight factor. Journal of Machine Learning Research 18 (2018) 1-41.
Kimura, I. Obayashi, Y. Takeichi, R. Murao and Y. Hiraoka. Non-empirical identification of trigger sites in heterogeneous processes using persistent homology. Scientific Reports 8, Article number: 3553 (2018).
Mohammad Saadatfar, Hiroshi Takeuchi, Nicolas Francois, Vanessa Robins, and Yasuaki Hiraoka. Pore configuration landscape of granular crystallisation. Nature Communications. 8:15082 (2017).
Hiraoka, T. Nakamura, A. Hirata, E. G. Escolar, K. Matsue, and Y. Nishiura. Hierarchical structures of amorphous solids characterized by persistent homology. Proceedings of the National Academy of Sciences of the United States of America 113 (2016), 7035–7040.