Theoretical, computational and experimental approaches to problems
in natural sciences typically focus on particular aspects of the
studied phenomena or systems. This is linked to the need to structure
the questions with respect to the most relevant length and time
scales. This need comes from the limited range of applicability of
specific experimental as well as theoretical tools. In the past this
has created huge progress and is the basis of our current understanding
of physical, chemical and biological systems. For example, in the area
of phase transitions and critical phenomena renormalization group
theory has shown that many properties such as critical exponents or
ratio of critical amplitudes does not depend on microscopic details
of the studied system. This means that within each universality
class, for many properties it is sufficient to study highly idealized
model systems. However details of the models determine the transition
temperature or the absolute amplitudes. Similar examples could be given
in many other areas, for example the mechanical response of bulk solids,
thin films or biological membranes are to a large extent governed by
a small number of universal models but constitutive parameters depend
crucially on the details of the underlying microstructure. In a computer
simulation, in principle it would be possible to study systems on
huge length scales and for long times (i.e. fracture mechanics based
on an all atom simulation, function of a membrane protein in a fully
fluctuating membrane etc.) if all the interactions would be fully treated
and infinite CPU time would be available. While neither of the two is the
case, such an ansatz probably also would produce too much information, obscuring a more general understanding.
Out of this, for several years now scale bridging or multiscale
simulations methods are developed at many places. They are still in
their infancy and the many different ideas did not converge into one
or several generally accepted and validated schemes. Because of that,
this fairly young and critical area of computational science can benefit
greatly from advances in mathematics. Conversely, emerging computational
experience on truly multiscale systems can serve as a great stimulus to
mathematical understanding, which at present remains at its most thorough
for two-scale systems (as treated, e.g., in classical and stochastic homogenization theory or Gamma-convergence).
Examples of truly multiscale systems include biological ion channels,
proteins, emulsions, functional materials and quantum dots. They require
new methods to address challenges such as hierarchies of structual
organisation, fluctuating (electrostatic) fields, simultaneous treatment
and interdependencies of very short and very long range interactions,
and approximate Hamiltonians to model dynamics and reactivity of tens of
thousands of atoms. In order to achieve this coupling schemes between
different scales have to be developed which includes systematic coarse
graining strategies, appropriate interaction potentials and force fields,
and methods to link studies on different scales and tune the resolution of
the computer model to coarser and finer resolution as needed. Ultimately
such schemes have to include classical as well as quantum methods. All this requires new approaches beyond conventional computer modeling.
The workshop aims to address a number of exemplary questions. How does
one parameterize coarse grained interaction potentials for bonded and
nonbonded interactions? The latter is especially delicate for soft matter,
because of the huge size of the molecules. What is the best point or
regime in parameter and phase space to hand over from one to another
level of description? How do errors propagate from one level to the next
and what are the consequences when one wants to finegrain again? How
specific or transferable are models and methods or are there general
strategies to follow? Do we have strategies and general criteria for
validation beyond trivial tests? Coarse graining means mapping of scales,
but how does this work for nonequilibrium systems and time scales, i.e.,
for studying dynamics? All these questions will be addressed and discussed in terms of basic concepts as well as specific applications.
| Name |
Department |
Affiliation |
| Bastiaan J. Braams |
Chemistry Department |
Emory University |
| Andrea Braides |
Dipartimento di Matematica |
Seconda Università di Roma "Tor Vergata" |
| Frank L. H. Brown |
Department of Chemistry and Biochemistry |
University of California |
| Peter Brune |
Department of Computer Science |
University of Chicago |
| Maria-Carme T. Calderer |
School of Mathematics |
University of Minnesota |
| Hannah Callender |
Institute for Mathematics and its Applications |
University of Minnesota |
| Roberto Cammi |
Facoltà di Scienze |
Università di Parma |
| Eric Cances |
ENPC |
CERMICS |
| Carsten Carstensen |
Department of Mathematics |
Humboldt-Universität |
| Xianjin Chen |
Department of Mathematics |
Texas A & M University |
| Daniel M. Chipman |
Radiation Laboratory |
University of Notre Dame |
| Cecilia Clementi |
Department of Chemistry |
Rice University |
| Ludovica Cecilia Cotta-Ramusino |
Institute for Mathematics and its Applications |
University of Minnesota |
| Rafael Delgado-Buscalioni |
Departamento de Fisica Teorica de la Materia Condensada |
Autonomous University of Madrid |
| Luigi Delle Site |
|
Max-Planck Institut für Polymerforschung |
| Markus Deserno |
Department of Physics |
Carnegie Mellon University |
| Olivier Dubois |
|
University of Minnesota |
| Burkhard Dünweg |
|
Max-Planck Institut für Polymerforschung |
| Weinan E |
Department of Mathematics and Applied Computational Mathematics |
Princeton University |
| Bob Eisenberg |
Department of Molecular Biophysics and Physiology |
Rush University Medical Center |
| Maria Esteban |
Ceremade |
Université de Paris IX (Paris-Dauphine) |
| James W. Evans |
Department of Mathematics |
Iowa State University |
| Daniel Flath |
Department of Mathematics and Computer Science |
Macalester College |
| Christopher Fraser |
Department of Computer Science |
University of Chicago |
| Weiguo Gao |
|
Fudan University |
| Carlos Garcia-Cervera |
Department of Mathematics |
University of California |
| Jayadeep Gopalakrishnan |
Department of Mathematics |
University of Florida |
| Teresa Head-Gordon |
Bioengineering Department |
University of California |
| Mark Herman |
Department of Mathematics |
Virginia Polytechnic Institute and State University |
| Peter Hinow |
Institute for Mathematics and its Applications |
University of Minnesota |
| Yunkyong Hyon |
Department of Mathematics |
Pennsylvania State University |
| Mark Iwen |
Department of Mathematics |
University of Michigan |
| Alexander Izzo |
Department of Mathematics and Statistics |
Bowling Green State University |
| Richard D. James |
Department of Aerospace Engineering and Mechanics |
University of Minnesota |
| Srividhya Jeyaraman |
School of Informatics |
Indiana University |
| Lijian Jiang |
Department of Mathematics |
Texas A & M University |
| Raymond Kapral |
Department of Chemistry |
University of Toronto |
| Mikko Karttunen |
Department of Applied Mathematics |
University of Western Ontario |
| Robert V. Kohn |
Courant Institute of Mathematical Sciences |
New York University |
| Anna Krylov |
Department of Chemistry |
University of Southern California |
| Yueheng Lan |
Department of Mechanical Engineering |
University of California |
| Claude Le Bris |
|
CERMICS |
| Tong Li |
Department of Mathematics |
University of Iowa |
| Yongfeng Li |
School of Mathematics |
Georgia Institute of Technology |
| Tai-Chia Lin |
Department of Mathematics |
National Taiwan University |
| Chun Liu |
Department of Mathematics |
Pennsylvania State University |
| Mitchell Luskin |
School of Mathematics |
University of Minnesota |
| Jianpeng Ma |
Computational & Experimental Structural Biology & Cell Biology Group |
Baylor College of Medicine |
| Dionisios Margetis |
Department of Mathematics |
University of Maryland |
| Vasileios Maroulas |
Department of Statistics and Operations Research |
University of North Carolina |
| Jesus Martin-Vaquero |
Departamento de Matematica Aplicada |
University of Salamanca |
| Alexander Mielke |
Research Group 1: Partial Differential Equations |
Weierstraß-Institut für Angewandte Analysis und Stochastik (WIAS) |
| Marcus Müller |
Institut für Theoretische Physik |
Georg-August-Universität zu Göttingen |
| William G. Noid |
Department of Chemistry |
Pennsylvania State University |
| Wilma K. Olson |
Department of Chemistry and Chemical Biology |
Rutgers University |
| Ignacio Pagonabarraga Mora |
Departament de Física Fonamental |
University of Barcelona |
| Stephen D Pankavich |
Department of Mathematics |
Indiana University |
| Matej Praprotnik |
Theory Group |
Max Planck Institute for Polymer Research |
| Fadil Santosa |
School of Mathematics |
University of Minnesota |
| Garikapati Narahari Sastry |
Molecular Modeling Group |
Indian Institute of Chemical Technology |
| Arnd Scheel |
Institute for Mathematics and its Applications |
University of Minnesota |
| Deena Schmidt |
Institute for Mathematics and its Applications |
University of Minnesota |
| Ridgway Scott |
Department of Computer Science |
University of Chicago |
| Tsvetanka Sendova |
Department of Mathematics |
Texas A & M University |
| Yuk Sham |
Center for Drug Design |
University of Minnesota |
| Heinz Siedentop |
Mathematisches Institut |
Ludwig-Maximilians-Universität München |
| Berend Smit |
Department of Chemical Engineering |
University of California |
| Andrew M. Stein |
Institute for Mathematics and its Applications |
University of Minnesota |
| John M. Stockie |
Department of Mathematics and Statistics |
Simon Fraser University |
| Florence Tama |
Department of Biochemistry & Molecular Biophysics |
University of Arizona |
| Molei Tao |
Department of Control and Dynamical Systems |
California Institute of Technology |
| Donald G. Truhlar |
Supercomputer Institute and Department of Chemistry |
University of Minnesota |
| Erkan Tüzel |
Institute for Mathematics and its Applications |
University of Minnesota |
| Zhian Wang |
Institute for Mathematics and its Applications |
University of Minnesota |
| Dexuan Xie |
Department of Mathematical Sciences |
University of Wisconsin |
| Wei Xiong |
Department of Mathematics |
Ohio State University |
| Chao Yang |
Computational Research Division |
Lawrence Berkeley Laboratory |
| Haijun Yu |
Department of Mathematics |
Purdue University |
| Jin Yu |
Department of Physics |
University of California |
| Weigang Zhong |
|
Statistical and Applied Mathematical Sciences Institute (SAMSI) |
| Yongcheng Zhou |
|
University of California, San Diego |
