41,767 research outputs found
Symmetric Vertex Models on Planar Random Graphs
We solve a 4-(bond)-vertex model on an ensemble of 3-regular Phi3 planar
random graphs, which has the effect of coupling the vertex model to 2D quantum
gravity. The method of solution, by mapping onto an Ising model in field, is
inspired by the solution by Wu et.al. of the regular lattice equivalent -- a
symmetric 8-vertex model on the honeycomb lattice, and also applies to higher
valency bond vertex models on random graphs when the vertex weights depend only
on bond numbers and not cyclic ordering (the so-called symmetric vertex
models).
The relations between the vertex weights and Ising model parameters in the
4-vertex model on Phi3 graphs turn out to be identical to those of the
honeycomb lattice model, as is the form of the equation of the Ising critical
locus for the vertex weights. A symmetry of the partition function under
transformations of the vertex weights, which is fundamental to the solution in
both cases, can be understood in the random graph case as a change of
integration variable in the matrix integral used to define the model.
Finally, we note that vertex models, such as that discussed in this paper,
may have a role to play in the discretisation of Lorentzian metric quantum
gravity in two dimensions.Comment: Tidied up version accepted for publication in PL
Translated Chemical Reaction Networks
Many biochemical and industrial applications involve complicated networks of
simultaneously occurring chemical reactions. Under the assumption of mass
action kinetics, the dynamics of these chemical reaction networks are governed
by systems of polynomial ordinary differential equations. The steady states of
these mass action systems have been analysed via a variety of techniques,
including elementary flux mode analysis, algebraic techniques (e.g. Groebner
bases), and deficiency theory. In this paper, we present a novel method for
characterizing the steady states of mass action systems. Our method explicitly
links a network's capacity to permit a particular class of steady states,
called toric steady states, to topological properties of a related network
called a translated chemical reaction network. These networks share their
reaction stoichiometries with their source network but are permitted to have
different complex stoichiometries and different network topologies. We apply
the results to examples drawn from the biochemical literature
Airtightness of UK dwellings
This paper presents the results and key messages that have been obtained from Phase 1 of a participatory action research project that was undertaken with 5 developers to investigate the practical design and construction issues that arise in making improvements to the airtightness of speculatively built mainstream housing. Two construction types were represented in the project, masonry cavity and light steel frame. Phase 1 of the project sought to assess in detail the design, construction and air permeability of 25 dwellings that were constructed to conform to the requirements of Approved Document Part L1 2002. While the total number of dwellings reported here is small, the results suggest that there is not a consistent approach to the way in which developers present information on air leakage to those on site, a mixture of approaches are utilised on site to achieve the same specification and there appears to be a lack of foresight in the detailed design stage, resulting in specifications that are practically very difficult to achieve. Despite this, the air permeability results suggest that dwellings constructed with a wet/mechanically plastered internal finish, can default to a reasonable standard of airtightness by UK standards, without much additional attention being given to airtightness
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