51 research outputs found
Dynamics and stationary configurations of heterogeneous foams
We consider the variational foam model, where the goal is to minimize the
total surface area of a collection of bubbles subject to the constraint that
the volume of each bubble is prescribed. We apply sharp interface methods to
develop an efficient computational method for this problem. In addition to
simulating time dynamics, we also report on stationary states of this flow for
<22 bubbles in two dimensions and <18 bubbles in three dimensions. For small
numbers of bubbles, we recover known analytical results, which we briefly
discuss. In two dimensions, we also recover the previous numerical results of
Cox et. al. (2003), computed using other methods. Particular attention is given
to locally optimal foam configurations and heterogeneous foams, where the
volumes of the bubbles are not equal. Configurational transitions are reported
for the quasi-stationary flow where the volume of one of the bubbles is varied
and, for each volume, the stationary state is computed. The results from these
numerical experiments are described and accompanied by many figures and videos.Comment: 19 pages, 11 figure
Extremal Spectral Gaps for Periodic Schr\"odinger Operators
The spectrum of a Schr\"odinger operator with periodic potential generally
consists of bands and gaps. In this paper, for fixed m, we consider the problem
of maximizing the gap-to-midgap ratio for the m-th spectral gap over the class
of potentials which have fixed periodicity and are pointwise bounded above and
below. We prove that the potential maximizing the m-th gap-to-midgap ratio
exists. In one dimension, we prove that the optimal potential attains the
pointwise bounds almost everywhere in the domain and is a step-function
attaining the imposed minimum and maximum values on exactly m intervals.
Optimal potentials are computed numerically using a rearrangement algorithm and
are observed to be periodic. In two dimensions, we develop an efficient
rearrangement method for this problem based on a semi-definite formulation and
apply it to study properties of extremal potentials. We show that, provided a
geometric assumption about the maximizer holds, a lattice of disks maximizes
the first gap-to-midgap ratio in the infinite contrast limit. Using an explicit
parametrization of two-dimensional Bravais lattices, we also consider how the
optimal value varies over all equal-volume lattices.Comment: 34 pages, 14 figure
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