2,312 research outputs found
Positive and Normative Issues of Economic Growth with Infectious Disease
This paper uses a variant of the Lotka-Volterra system explaining the dynamic interaction between populations of infected and healthy individuals in which the demographic and epidemiological parameters (the net healthy birth rate, the death rate of the infected and the infection rate) are functions of economic variables and some simple economic growth models to examine deterministic growth paths of the system with an exogenous savings rate. Demographic-epidemiological parameters depend on productive capital which combined with healthy workers produces output. We find that there are generally multiple steady states. The system usually converges to a steady state in which the economy moderates the disease. If capital accumulation is set optimally to maximise welfare then there may be multiple steady states and optimal growth paths generally display four dimensional saddle point properties. Extensions of the framework to allow for density dependent infection, recovery from the disease and alternative social welfare functions are analysed.economic growth; infectious disease; dynamic optimal control.
Field theory of scaling lattice models. The Potts antiferromagnet
In contrast to what happens for ferromagnets, the lattice structure
participates in a crucial way to determine existence and type of critical
behaviour in antiferromagnetic systems. It is an interesting question to
investigate how the memory of the lattice survives in the field theory
describing a scaling antiferromagnet. We discuss this issue for the square
lattice three-state Potts model, whose scaling limit as T->0 is argued to be
described exactly by the sine-Gordon field theory at a specific value of the
coupling. The solution of the scaling ferromagnetic case is recalled for
comparison. The field theory describing the crossover from antiferromagnetic to
ferromagnetic behaviour is also introduced.Comment: 11 pages, to appear in the proceedings of the NATO Advanced Research
Workshop on Statistical Field Theories, Como 18-23 June 200
Finite temperature results on the 2d Ising model with mixed perturbation
A numerical study of finite temperature features of thermodynamical
observables is performed for the lattice 2d Ising model. Our results support
the conjecture that the Finite Size Scaling analysis employed in the study of
integrable perturbation of Conformal Field Theory is still valid in the present
case, where a non-integrable perturbation is considered.Comment: 9 pages, Latex, added references and improved introductio
A CASE STUDY ON THE APPLE HILL GROWER\u27S ASSOCIATION: AN AGRITOURISM AREA IN CAMINO, CA
The current research is a case study on the Apple Hill Grower’s Association (AHGA). The purpose of this case study was to gain a full understanding of the AHGA with a focus on the economic and social motivations of the original farmers to bring tourism to the farm. A majority of the past research on agritourism involves quantitative studies that are survey based; this study gives qualitative research perspective based on focus groups and personal interviews. In addition, past research is focused on other states (i.e. Michigan, Missouri, Montana) and countries (i.e Italy and Australia). This case study adds research to the agritourism book of knowledge in California. The subjects for this study were chosen through purposive sampling, a non-probability sampling technique that involves choosing experts highly involved in the research at hand (Kraus & Allen, 1997). It was important to have subjects highly involved in the culture of the AHGA and that were directly involved in the initial decisions to start an agritourism business. Therefore, seven participants were hand selected that were directly related to the beginning of the AHGA. One focus group and six semi-structured interviews were conducted with the subjects of this study. The data from the focus group and interviews were analyzed through the qualitative analysis process of “grounded theory”.
The steps to grounded theory include: raw text, research concerns, relevant text, repeating ideas, themes, theoretical constructs, and theoretical narrative (Auerbach & Silverstein, 2003). Through this research, main themes emerged that were directly related to the objectives of this study. These main themes are as follows: survival, involvement, feuds, politics, complacency, factors for success, female gender role, less regulations, education of farmers, and negative impacts. From these main themes, many sub themes surfaced. The most prevalent theme of this study was survival, more particularly survival in reference to pear decline. The objective of this study was to explore the motivations of the original farmers of the AHGA to engage their farms in agritourism. The main motivation was to save their farm from the pear decline disease
The Coester Line in Relativistic Mean Field Nuclear Matter
The Walecka model contains essentially two parameters that are associated
with the Lorentz scalar (S) and vector (V) interactions. These parameters are
related to a two-body interaction consisting of S and V, imposing the condition
that the two-body binding energy is fixed. We have obtained a set of different
values for the nuclear matter binding energies at equilibrium densities. We
investigated the existence of a linear correlation between and ,
claimed to be universal for nonrelativistic systems and usually known as the
Coester line, and found an approximate linear correlation only if remains
constant. It is shown that the relativistic content of the model, which is
related to the strength of , is responsible for the shift of the Coester
line to the empirical region of nuclear matter saturation.Comment: 7 pages, 5 figure
A new effective Lagrangian for nuclear matter
The relativistic mean field model, the Zim\'anyi - Moszkowski (ZM) Lagrangian
describes nuclear matter and stable finite nuclei even in the non-relativistic
limit. It fails, however, to predict the correct non-relativistic spin-orbit
(SO) coupling. In this paper we improve on this matter by an additional tensor
coupling analogous to the anomalous gyromagnetic ratio. It can be adjusted to
describe the SO-term without changing the mean field solution of the
ZM-Lagrangian for nuclear matter.Comment: 8 pages LaTe
Huertos, diversidad y alimentación en una zona de transición ecológica del estado de México
The study of the home gardens in Mexico is important. It represents an alternative food supplement of the families in rural and urban zones. In the zone ecological transitional State of Mexico the diversity of vegetal species in the home gardens is wide, due to the interaction of geographic, climatic, soil, environmental and ecological conditions. The products obtained have diverse uses: nutritional, social, ritual and commercial, being the most important that for subsistence and the social relation
Finite Nuclei in a Relativistic Mean-Field Model with Derivative Couplings
We study finite nuclei, at the mean-field level, using the Zimanyi-Moskowski
model and one of its variations (the ZM3 model). We calculate energy levels and
ground-state properties in nuclei where the mean-field approach is reliable.
The role played by the spin-orbit potential in sorting out mean-field model
descriptions is emphasized.Comment: 17 pages, 9 figures, 30 kbytes. Uses EPSF.TEX. To appear in Zeit. f.
Phys. A (Hadrons and Nuclei
Form factors in the Bullough-Dodd related models: The Ising model in a magnetic field
We consider particular modification of the free-field representation of the
form factors in the Bullough-Dodd model. The two-particles minimal form factors
are excluded from the construction. As a consequence, we obtain convenient
representation for the multi-particle form factors, establish recurrence
relations between them and study their properties. The proposed construction is
used to obtain the free-field representation of the lightest particles form
factors in the perturbed minimal models. As a significant example
we consider the Ising model in a magnetic field. We check that the results
obtained in the framework of the proposed free-field representation are in
agreement with the corresponding results obtained by solving the bootstrap
equations.Comment: 20 pages; v2: some misprints, textual inaccuracies and references
corrected; some references and remarks adde
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