SCIENTIFIC PROGRAMS AND ACTIVITIES

December 26, 2024

THE FIELDS INSTITUTE FOR RESEARCH IN MATHEMATICAL SCIENCES

July 7- August 1, 2014 Focus Program on
NEUROVASCULAR COUPLING AND RELATED PHENOMENA


Workshop on Transport of Ionic Particles in Biological Environments,
July 28- Aug 1, 2014

Organizer: Chun Liu, Maximilian Metti (Math., Penn Stat)

Abstracts

 

Dieter Bothe
Continuum thermodynamics of multicomponent fluid mixtures and implications for modeling electromigration of ionic species (slides)

Shuhao Cao
Adaptive Finite Element Methods for Convection-Reaction Equation

The convection-reaction equation comes from the linearization of the hyperbolic conservation law that models the transport phenomena. In previous works, methods like streamline diffusion finite element method (SDFEM) have been invented to battle the instability coming from the convection term. In this talk, we opt for a stabilized Discontinuous Galerkin finite element method (DGFEM) to discretize the convection-reaction equation, and discuss the difficulty lying in the a posteriori error estimation for this discretization, especially the trade between the construction of a suitable interpolation and posing an extra saturation assumption. Several a posteriori error estimators are constructed, and some numerical examples are presented.

Bob Eisenberg
Ions in Solutions and Channels: the plasma of life

All of biology occurs in ionic solutions that are plasmas in both the physical and biological meanings of the word. The composition of these ionic mixtures has profound effects on almost all biological functions, whether on the length scale of organs like the heart or brain, of the length scale of proteins, like enzymes and ion channels.
Ion channels are proteins with a hole down their middle that conduct ions (spherical charges like Na+, K+, Ca2+, and Cl- with diameter ~ 0.2 nm) through a narrow tunnel of fixed charge ('doping') with diameter ~ 0.6 nm. Ionic channels control the movement of electric charge and current across biological membranes and so play a role in biology as significant as the role of transistors in computers: almost every process in biology is controlled by channels, one way or the other.

Ionic channels are manipulated with the powerful techniques of molecular biology in hundreds of laboratories. Atoms (and thus charges) can be substituted a few at a time and the location of every atom can be determined in favorable cases. Ionic channels are one of the few living systems of great importance whose natural biological function can be well described by a tractable set of equations.
Ions can be studied as complex fluids in the tradition of physical science although classical treatments as simple fluids have proven inadequate and must be abandoned in my view. Ion channels can be studied by Poisson-Drift diffusion equations familiar in plasma and semiconductor physics - called Poisson Nernst Planck or PNP in biology. They form an adequate model of current voltage relations in many types of channels under many conditions if extended to include correlations, and can even describe 'chemical' phenomena like selectivity with some success.

My collaborators and I have shown how the relevant equations can be derived (almost) from stochastic differential equations, and how they can be solved in inverse, variational, and direct problems using models that describe a wide range of biological situations with only a handful of parameters that do not change even when concentrations change by a factor of 107. Variational methods hold particular promise as a way to solve problems outstanding for more than a century because they describe interactions of 'everything with everything' else that characterize ions crowded into channels.
An opportunity exists to apply the well established methods of computational physics to a central problem of computational biology. The plasmas of biology can be analyzed like the plasmas of physics.

 

Joe Jerome
Classical Transport Models Beyond PNP: Results and Questions (slides)


We survey and discuss classical models for dilute ions. In particular, we discuss the Rubinstein model for one-fluid transport, and the Blotekjaer/Baccarani/Wordeman version of the hydrodynamic model. We also review a gating model, as well as compatibility aspects of energy transport models. Many of these results are well-known, but our intent is to coordinate them to give a picture of classical electrodiffusion, prior to the introduction of some of the topical models currently under study. Finally, we identify an analytical property of the `crowded ion' model, which makes this model extremely challenging.

 

Chiun-Chang Lee
Asymptotic behavior for boundary layers of the charge conserving Poisson-Boltzmann equation

The charge conserving Poisson-Boltzmann (CCPB) equation is an electrostatic model that describes electrostatic interactions between molecules in ionic solutions (electrolytes) and has many applications in electrolyte solutions. One of the important phenomena is the electrical double layer (EDL) that appears near the charged surface of electrolyte solutions. To describe the behavior of the EDL, we study the asymptotic behavior for the boundary layer of the CCPB equation. First, we shall introduce the CCPB equation without finite size effects and related boundary condition. Based on these understandings, the asymptotic behavior for boundary layers of this model will be introduced. These results may provide a viewpoint to see the influence of ionic valences and concentrations on the boundary layers. On the other hand, using similar argument, we shall study a modified Poisson-Boltzmann equation with finite size effects (PB_ns equation). When the small dielectric constant is regarded as a parameter tending to zero, we obtain two approximation models of the PB_ns equation. One model is the conventional PB equation, the other model is a modified PB equation introduced by Borukhov, Andelman, and Orland in 1997. The asymptotic behaviors of three PB type models will be compared.
This is a joint work with YunKyong Hyon, Tai-Chia Lin, and Chun Liu.

 

Xiaofan Li
A Conservative Scheme for Poisson-Nernst-Planck Equations

A macroscopic model to describe the dynamics of ion transport in ion channels is the Poisson-Nernst-Planck (PNP) equations. In this talk, we will present a finite-difference method for solving PNP equations, which is second-order accurate in both space and time. We use the physical parameters specifically suited toward the modeling of ion channels. We introduce a simple iterative scheme to solve the system of nonlinear equations resulting from discretizing the equations implicitly in time, which converges in a few iterations. We place emphasis on ensuring numerical methods to have the same physical properties that the PNP equations themselves also possess, namely conservation of total ions and correct rates of energy dissipation. Further, we illustrate that, using realistic values of the physical parameters, the conservation property is critical in obtaining correct numerical solutions over long time scales.

 

Jie Liang
Predicting three-dimensional structures, topology, and stabilities of of bacterial outer-membrane porins and eukaryotic mitochondrial membrane proteins

Beta-barrel membrane proteins are found in the outer membrane of gram-negative bacteria, mitochondria, and chloroplasts. They are the basis of an important class of ion-channels, and are involved in pore formation, membrane anchoring, and enzyme activity. However, they are sparsely represented in the protein structure databank.

We have developed a computational method for predicting structures of the transmembrane (TM) domains of beta-barrel membrane proteins. Based on physical principles, our method can predict structures of the TM domain of beta-barrel membrane proteins of novel topology, including those from eukaryotic mitochondria. Our method is based on a model of physical interactions, a discrete conformational state space, an empirical potential Bacterial Outer-Membrane and Eukaryotic Mitochondria function, as well as a model to account for interstrand loop entropy. We are able to construct three-dimensional atomic structure of the TM domains from sequences for a set of 23 nonhomologous proteins (resolution <3.0 A).

In addition, stability determinants and protein-protein interaction sites can also be predicted. Such predictions on eukaryotic mitochondria outer membrane protein Tom40 and VDAC are confirmed by independent mutagenesis and chemical cross-linking studies. These results suggest that our model captures key components of the organization principles of beta-barrel membrane protein assembly. The depth dependent transfer free energy of amino acids allows further insight into the topology and folding of bacterial porins.

Finally, we show how computational prediction can lead to successful engineering of altered protein-protein interactions and olgomerization state in the outer membrane protein F (OmpF). Through site-directed mutagenesis based on computational design, we succeeded in engineering OmpF mutants with dimeric and monomeric oligomerization states instead of a trimeric state. Moreover, our results suggest that oligomer dissociation can be separated from the process of protein unfolding, and the oligomerization proceeds through a series of interactions involving two distinct regions of the extensive PPI interface.

 

Tai-Chia Lin
Stability of PNP type systems for ion transport


To describe ion transport through biological channels, we derive new PNP (Poisson-Nernst-Planck) type systems and develop mathematical theorems for these systems. Symmetry and non-symmetry breaking conditions being represented by their coupling coefficients may affect the stability of these systems. In this lecture, I will introduce results for the stability of steric PNP systems and standard PNP systems with boundary layer solutions. Our results indicate that new PNP type systems may become a useful model to study ion transport through biological channels.

 

Weishi Liu
Geometric singular perturbations of Poisson-Nernst-Planck systems and applications to ion channel problems (slides)


In this talk, we will report our work on Poisson-Nernst-Planck (PNP) type systems, a class of primitive continuum models for electrodiffusion, mainly in the content of ionic flow through membrane channels. An important modeling feature of the PNP type systems studied is the inclusion of hard-sphere potentials that account for ion size effect. We will focus on hard-sphere potentials that are ion specific. This complication is critical since ions with the same charge but different sizes could have significantly different roles in many important biological functions of living organisms. We will present an analytical framework that relies on a combination of a powerful general theory of geometric singular perturbations and of specific structures of PNP type systems. Beyond existence and uniqueness problems, we are interested in obtaining concrete characteristics of solutions that have direct implications to ionic flow properties. A particular attention is paid on effects of the ion sizes and permanent charges to electrodiffusion and ion channel functions.


Benzhou Lu
Finite element simulation of ion permeation in 3D ion channel systems based on their atomic structure


Modeling based on molecular structure can naturally incorporate structural information and atomic properties, and use the least number of fitting parameters. However, real 3D ion channel is particularly difficult to simulate due to the multiscale nature of the transport process, the complex geometry/boundary of the channel protein system, and the singular charge distribution inside the channel protein(s). For these reasons, there are so far only a very few software publicly available in this important area of biology. I'll talk about a software platform and methods we recently developed for a complete simulation procedure for ion transport in a channel. The governing model is focused on the Poisson-Nernst-Planck equations, but a size -modified PNP and a variable dielectric Poisson-Boltzmann (a special case of PNP) models as well as some of their effects will also be discussed. A parallel finite element solver and stable algorithms are developed. Two other useful programs are for meshing and visualization. Qualified molecular meshing is essential and was a bottleneck issue for finite/boundary element modelings of biomolecular systems. We recently developed a robust molecular surface meshing tool, TMSmesh, which can handle complex and arbitrarily large biomolecular system. The visualization system, VCMM, is specifically designed to facilitate researches in molecular continuum modeling community. Applications are demonstrated in some channel systems for simulating such as current-voltage characteristics (curves), conductance, and certain size effects to permeation. Some systems are of challenging sizes for the simulation community. The results are compared with those obtained with Brownian Dynamics simulations and experiments.

 

Maximilian Metti
Applications and Discretizations of the PNP Equations (slides)

Many devices involving charged particles or electric current can be modeled using the PNP equations. We explore some of these devices as applications of the PNP system to engineering and biological contexts, with an emphasis on mathematical modeling and device functionality. Further consideration is given to discrete formulations of the PNP system and a numerical approach for computing a solution.

 

Rolf Ryham
Very weak solutions for Poisson-Nernst-Planck system (slides)

We formulate a notion of very weak solution for the Poisson-Nernst-Planck system. A local monotonicity formula is derived for stationary, very weak solutions and is used to prove an interior regularity result for a system with multiple species and variable coefficients. Stationary, very weak solutions of the Keller-Segel model are also considered and shown to be regular in two dimensions and counter examples are given in higher dimensions.

 

Yuan-Nan Young
Modeling the electro-hydrodynamics of a leaky lipid bilayer membrane: Continuum vs coarse-grained modeling


In this work we first present recent results from studying the electro-hydrodynamics of a "leaky" lipid bilayer membrane. Within the continuum framework the stability of a lipid bilayer membrane under an electric field (both DC and AC) is investigated. The nonlinear dynamics is further investigated to elucidate the novel electrohydrodynamics of a lipid bilayer membrane. These results show membrane conductance is essential to both linear instability and nonlinear dynamics of the membrane. Finally we present a coarse-grained algorithm that utilizes the fast multipole method (FMM) to consider the non-local hydrodynamic interactions and hopefully the electrostatic interaction between transmembrane proteins and the lipid bilayer membrane. From these results we draw conclusions for future directions to combine the two approaches into a multi-scale model.

 

Zhenli Xu
Self-Consistent Continuum Theory and Monte Carlo Simulations for Coulomb Many-Body Systems in Inhomogeneous Environments

In this talk, I will present recent work on modeling and simulations of nanoscale electrostatic systems in inhomogeneous dielectric media with strong many-body correlation effects. We consider Monte Carlo simulations and continuum models by self-consistent field theory for electrolytes including dielectric-boundary, ion-correlation, and excluded-volume effects. For particle simulations, we developed efficient algorithm for treating dielectric interfaces. For continuum theory, we derived self-energy-modified Poisson-Boltzmann equations for equilibrium systems and Poisson-Nernst-Planck equations for charge transport. We studied the asymptotic properties of the models, discussed efficient algorithms for these PDE models. By both continuum and particle simulations, we attempt to understand many-body properties of systems with dielectric interfaces, arising from soft matter and biological applications.