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1.
Opt Express ; 22(7): 7544-9, 2014 Apr 07.
Artículo en Inglés | MEDLINE | ID: mdl-24718128

RESUMEN

We report on backward second-harmonic generation using ps laser pulses in congruent lithium niobate with 3.2 µm periodic poling. Three resonant peaks were measured between 1530 and 1730 nm, corresponding to 16th, 17th and 18th quasi-phase-matching orders in the backward configuration, with a conversion efficiency of 4.75 x 10(-5%)/W for the 16th order. We could also discriminate the contributions from inverted domains randomized in duty-cycle.

2.
Opt Express ; 19(25): 25780-5, 2011 Dec 05.
Artículo en Inglés | MEDLINE | ID: mdl-22273970

RESUMEN

We report on bulk and guided-wave second-harmonic generation via random Quasi-Phase-Matching in Lithium Tantalate. By acquiring the far-field profiles at several wavelengths, we extract statistical information on the distribution of the quadratic nonlinearity as well as its average period, both at the surface and in the bulk of the sample. By investigating the distribution in the two regions we demonstrate a non-invasive approach to the study of poling dynamics.


Asunto(s)
Diseño Asistido por Computadora , Litio/química , Litio/efectos de la radiación , Modelos Teóricos , Óxidos/química , Óxidos/efectos de la radiación , Refractometría/instrumentación , Tantalio/química , Tantalio/efectos de la radiación , Simulación por Computador , Campos Electromagnéticos , Diseño de Equipo , Análisis de Falla de Equipo , Luz , Refractometría/métodos , Dispersión de Radiación
3.
Comput Math Methods Med ; 2021: 6640638, 2021.
Artículo en Inglés | MEDLINE | ID: mdl-34188690

RESUMEN

Although mathematical modelling of pressure-flow dynamics in the cardiocirculatory system has a lengthy history, readily finding the appropriate model for the experimental situation at hand is often a challenge in and of itself. An ideal model would be relatively easy to use and reliable, besides being ethically acceptable. Furthermore, it would address the pathogenic features of the cardiovascular disease that one seeks to investigate. No universally valid model has been identified, even though a host of models have been developed. The object of this review is to describe several of the most relevant mathematical models of the cardiovascular system: the physiological features of circulatory dynamics are explained, and their mathematical formulations are compared. The focus is on the whole-body scale mathematical models that portray the subject's responses to hypovolemic shock. The models contained in this review differ from one another, both in the mathematical methodology adopted and in the physiological or pathological aspects described. Each model, in fact, mimics different aspects of cardiocirculatory physiology and pathophysiology to varying degrees: some of these models are geared to better understand the mechanisms of vascular hemodynamics, whereas others focus more on disease states so as to develop therapeutic standards of care or to test novel approaches. We will elucidate key issues involved in the modeling of cardiovascular system and its control by reviewing seven of these models developed to address these specific purposes.


Asunto(s)
Modelos Cardiovasculares , Choque Hemorrágico/fisiopatología , Fenómenos Biomecánicos , Presión Sanguínea/fisiología , Sistema Cardiovascular/fisiopatología , Biología Computacional , Simulación por Computador , Hemodinámica/fisiología , Humanos , Conceptos Matemáticos , Sistema Respiratorio/fisiopatología , Análisis de Sistemas
4.
Math Med Biol ; 38(4): 417-441, 2021 12 15.
Artículo en Inglés | MEDLINE | ID: mdl-34499176

RESUMEN

A variety of mathematical models of the cardiovascular system have been suggested over several years in order to describe the time-course of a series of physiological variables (i.e. heart rate, cardiac output, arterial pressure) relevant for the compensation mechanisms to perturbations, such as severe haemorrhage. The current study provides a simple but realistic mathematical description of cardiovascular dynamics that may be useful in the assessment and prognosis of hemorrhagic shock. The present work proposes a first version of a differential-algebraic equations model, the model dynamical ODE model for haemorrhage (dODEg). The model consists of 10 differential and 14 algebraic equations, incorporating 61 model parameters. This model is capable of replicating the changes in heart rate, mean arterial pressure and cardiac output after the onset of bleeding observed in four experimental animal preparations and fits well to the experimental data. By predicting the time-course of the physiological response after haemorrhage, the dODEg model presented here may be of significant value for the quantitative assessment of conventional or novel therapeutic regimens. The model may be applied to the prediction of survivability and to the determination of the urgency of evacuation towards definitive surgical treatment in the operational setting.


Asunto(s)
Sistema Cardiovascular , Choque Hemorrágico , Animales , Gasto Cardíaco , Frecuencia Cardíaca , Modelos Teóricos , Choque Hemorrágico/diagnóstico
5.
Opt Express ; 18(25): 25967-72, 2010 Dec 06.
Artículo en Inglés | MEDLINE | ID: mdl-21164943

RESUMEN

We report on stable optical waveguides fabricated by soft-proton exchange in periodically-poled congruent lithium tantalate in the α-phase. The channel waveguides are characterized in the telecom wavelength range in terms of both linear properties and frequency doubling. The measurements yield a nonlinear coefficient of about 9.5 pm/V, demonstrating that the nonlinear optical properties of lithium tantalate are left nearly unaltered by the process.


Asunto(s)
Litio/química , Óxidos/química , Refractometría/instrumentación , Resonancia por Plasmón de Superficie/instrumentación , Tantalio/química , Diseño Asistido por Computadora , Diseño de Equipo , Análisis de Falla de Equipo , Dinámicas no Lineales , Protones
6.
Math Biosci Eng ; 17(5): 5027-5058, 2020 07 22.
Artículo en Inglés | MEDLINE | ID: mdl-33120539

RESUMEN

Hemorrhagic shock is a form of hypovolemic shock determined by rapid and large loss of intravascular blood volume and represents the first cause of death in the world, whether on the battlefield or in civilian traumatology. For this, the ability to prevent hemorrhagic shock remains one of the greatest challenges in the medical and engineering fields. The use of mathematical models of the cardiocirculatory system has improved the capacity, on one hand, to predict the risk of hemorrhagic shock and, on the other, to determine efficient treatment strategies. In this paper, a comparison between two mathematical models that simulate several hemorrhagic scenarios is presented. The models considered are the Guyton and the Zenker model. In the vast panorama of existing cardiovascular mathematical models, we decided to compare these two models because they seem to be at the extremes as regards the complexity and the detail of information that they analyze. The Guyton model is a complex and highly structured model that represents a milestone in the study of the cardiovascular system; the Zenker model is a more recent one, developed in 2007, that is relatively simple and easy to implement. The comparison between the two models offers new prospects for the improvement of mathematical models of the cardiovascular system that may prove more effective in the study of hemorrhagic shock.


Asunto(s)
Choque Hemorrágico , Hemodinámica , Humanos , Modelos Cardiovasculares , Choque Hemorrágico/terapia
7.
Comput Math Methods Med ; 2020: 7936895, 2020.
Artículo en Inglés | MEDLINE | ID: mdl-33425003

RESUMEN

Hemorrhagic shock is the number one cause of death on the battlefield and in civilian trauma as well. Mathematical modeling has been applied in this context for decades; however, the formulation of a satisfactory model that is both practical and effective has yet to be achieved. This paper introduces an upgraded version of the 2007 Zenker model for hemorrhagic shock termed the ZenCur model that allows for a better description of the time course of relevant observations. Our study provides a simple but realistic mathematical description of cardiovascular dynamics that may be useful in the assessment and prognosis of hemorrhagic shock. This model is capable of replicating the changes in mean arterial pressure, heart rate, and cardiac output after the onset of bleeding (as observed in four experimental laboratory animals) and achieves a reasonable compromise between an overly detailed depiction of relevant mechanisms, on the one hand, and model simplicity, on the other. The former would require considerable simulations and entail burdensome interpretations. From a clinical standpoint, the goals of the new model are to predict survival and optimize the timing of therapy, in both civilian and military scenarios.


Asunto(s)
Modelos Cardiovasculares , Choque Hemorrágico/fisiopatología , Animales , Biología Computacional , Simulación por Computador , Modelos Animales de Enfermedad , Hemodinámica , Humanos , Conceptos Matemáticos , Personal Militar , Pronóstico , Porcinos
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