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1	Etude expérimentale de neurones de Morris-Lecar : réalisation, couplage et interprétation / Experimental study of Morris-Lecar neuron : design, coupling and interpretation Behdad, Rachid 23 November 2015 (has links) Nous présentons dans ce manuscrit un neurone électronique expérimental basé sur le modèle complet de Morris-Lecar sans simplifications, afin d’obtenir une cellule de base pour étudier l’association collective de neurones couplés. La conception du circuit est donnée en détail selon les différents courants ioniques du modèle. Les résultats expérimentaux sont comparés aux prédictions théoriques, conduisant à un bon accord, ce qui valide donc notre circuit. Nous présentons les différents domaines de bifurcation selon les paramètres de contrôle, la capacité membranaire et le courant d’excitation. Nous avons mis en évidence le comportement du neurone pour chaque zone de paramétrage. Un couplage de ces neurones est introduit en utilisant des simulations Pspice (Multisim) où les neurones ont été conçus pour être les mêmes qu’expérimentalement. Premièrement, nous avons simulé une chaîne fermée de 26 neurones faiblement couplés le long de laquelle les ondes se propagent avec des phases en opposition 2 à 2. Pour cette première étude, on travaille dans une zone présentant uniquement un cycle limite stable. Deuxièmement, une dizaine de neurones sont couplés, avec un choix de paramètres correspondant à une deuxième zone où il y a deux attracteurs, un cycle limite stable et un point fixe stable, tandis qu’entre eux se trouve un cycle instable. Selon le nombre de neurones qui oscillent initialement et les conditions aux bords, nos études montrent que le système évolue vers un état où seuls 1, 2 ou 3 neurones restent à l’état oscillatoire, tandis que les autres sont retournés à un état de repos, ce qui met en évidence un phénomène de clusterisation. Il est à noter que certaines parties de notre circuit de base peuvent ainsi être utilisées dans d’autres modèles de neurones, car ces parties correspondent à la production des divers courants ioniques qu’on retrouve dans d’autres modèles. / We present in this manuscript an experimental electronic neuron based on complete Morris-Lecar model without simplifications, able to become an experimental unit tool to study collective association of robust coupled neurons. The circuit design is given in details according to the ionic currents of this model. The experimental results are compared with the theoretical prediction, leading to a good agreement between them, which therefore validates the circuit. We present the different areas according to the bifurcation control parameters, the membrane capacitance and the excitation current. We have highlighted the behavior of the neuron for each parameters zone. A coupling of such neurons is introduced by using Pspice simulations (Multisim) where neurons have been designed to be the same as the experimental one. First, we simulate a chain of up to 26 neurons weakly coupled along which anti-phase wave patterns propagate with phases in opposition 2 to 2. Second, about ten neurons are coupled, and we succeed to generate clusters based on the boundary conditions of theneurons and their initial conditions. For this study, we work in the region close to the fold bifurcation of limit cycles, where two limit cycles exist, one being stable and another one unstable. Our studies show that the system evolves to a state where only 1, 2 or 3 neurons remain in the oscillatory state, while others returned to a state of rest, which highlights a phenomenon of clustering. The use of some parts of the circuit is also possible for other neuron models, namely for those based on ionic currents. Modèle de Morris-Lecar Neuromorphique OTA Dynamique non linéaire Bifurcation Plan de phase Onde en opposition de phase Clusters Morris-Lecar model Neuromorphic OTA Nonlinear dynamics Bifurcation Phase plan Anti-phase wave patterns Clusters
2	Channel Noise and Firing Irregularity in Hybrid Markov Models of the Morris-Lecar Neuron Bennett, Casey 26 January 2016 (has links) No description available. Applied Mathematics Neurosciences Morris-Lecar PCPA SDE ISI Simulation Algorithm Fast Speed Runtime Phase Response Curve PRC
3	Effects of Repulsive Coupling in Ensembles of Excitable Elements Ronge, Robert 23 December 2022 (has links) Die vorliegende Arbeit behandelt die kollektive Dynamik identischer Klasse-I-anregbarer Elemente. Diese können im Rahmen der nichtlinearen Dynamik als Systeme nahe einer Sattel-Knoten-Bifurkation auf einem invarianten Kreis beschrieben werden. Der Fokus der Arbeit liegt auf dem Studium aktiver Rotatoren als Prototypen solcher Elemente. In Teil eins der Arbeit besprechen wir das klassische Modell abstoßend gekoppelter aktiver Rotatoren von Shinomoto und Kuramoto und generalisieren es indem wir höhere Fourier-Moden in der internen Dynamik der Rotatoren berücksichtigen. Wir besprechen außerdem die mathematischen Methoden die wir zur Untersuchung des Aktive-Rotatoren-Modells verwenden. In Teil zwei untersuchen wir Existenz und Stabilität periodischer Zwei-Cluster-Lösungen für generalisierte aktive Rotatoren und beweisen anschließend die Existenz eines Kontinuums periodischer Lösungen für eine Klasse Watanabe-Strogatz-integrabler Systeme zu denen insbesondere das klassische Aktive-Rotatoren-Modell gehört und zeigen dass (i) das Kontinuum eine normal-anziehende invariante Mannigfaltigkeit bildet und (ii) eine der auftretenden periodischen Lösungen Splay-State-Dynamik besitzt. Danach entwickeln wir mit Hilfe der Averaging-Methode eine Störungstheorie für solche Systeme. Mit dieser können wir Rückschlüsse auf die asymptotische Dynamik des generalisierten Aktive-Rotatoren-Modells ziehen. Als Hauptergebnis stellen wir fest dass sowohl periodische Zwei-Cluster-Lösungen als auch Splay States robuste Lösungen für das Aktive-Rotatoren-Modell darstellen. Wir untersuchen außerdem einen "Stabilitätstransfer" zwischen diesen Lösungen durch sogenannte Broken-Symmetry States. In Teil drei untersuchen wir Ensembles gekoppelter Morris-Lecar-Neuronen und stellen fest, dass deren asymptotische Dynamik der der aktiven Rotatoren vergleichbar ist was nahelegt dass die Ergebnisse aus Teil zwei ein qualitatives Bild für solch kompliziertere und realistischere Neuronenmodelle liefern. / We study the collective dynamics of class I excitable elements, which can be described within the theory of nonlinear dynamics as systems close to a saddle-node bifurcation on an invariant circle. The focus of the thesis lies on the study of active rotators as a prototype for such elements. In part one of the thesis, we motivate the classic model of repulsively coupled active rotators by Shinomoto and Kuramoto and generalize it by considering higher-order Fourier modes in the on-site dynamics of the rotators. We also discuss the mathematical methods which our work relies on, in particular the concept of Watanabe-Strogatz (WS) integrability which allows to describe systems of identical angular variables in terms of Möbius transformations. In part two, we investigate the existence and stability of periodic two-cluster states for generalized active rotators and prove the existence of a continuum of periodic orbits for a class of WS-integrable systems which includes, in particular, the classic active rotator model. We show that (i) this continuum constitutes a normally attracting invariant manifold and that (ii) one of the solutions yields splay state dynamics. We then develop a perturbation theory for such systems, based on the averaging method. By this approach, we can deduce the asymptotic dynamics of the generalized active rotator model. As a main result, we find that periodic two-cluster states and splay states are robust periodic solutions for systems of identical active rotators. We also investigate a 'transfer of stability' between these solutions by means of so-called broken-symmetry states. In part three, we study ensembles of higher-dimensional class I excitable elements in the form of Morris-Lecar neurons and find the asymptotic dynamics of such systems to be similar to those of active rotators, which suggests that our results from part two yield a suitable qualitative description for more complicated and realistic neural models. anregbare Elemente Klasse-I-Anregbarkeit abstoßende Kopplung aktive Rotatoren Watanabe-Strogatz-Integrabilität invariante Mannigfaltigkeiten Averaging-Theorie Morris-Lecar-Neuronen excitable elements class I excitability repulsive coupling active rotators Watanabe-Strogatz integrability invariant manifolds averaging theory Morris-Lecar neurons 530 Physik ddc:530
4	Utilizing an efficient color-conversion layer for realization of a white light-emitting electrochemical cell Vedin, Joel January 2016 (has links) Organic semiconducting materials have received a lot of attention in recent years and can now be found in many applications. One of the applications, the light emitting electrochemical cell (LEC) has emerged due to its flat and lightweight device structure, low operating voltage, and possibility to be fully solution processed. Today LECs can emit light of various colors, but to be applicable in the lighting industry, white light need to be produced in an efficient way. White light on the other hand, is one of the toughest "colors" to achieve in an efficient way, and is of particular interest in general lighting applications, where high color-rendering index devices are necessary. In this thesis I show that blue light can be partially converted, into white light, by utilizing the photoluminescence of color conversion layers (CCLs). Furthermore, I show that a high color-quality white light can be attained by adopting a blue-emitting LEC with a CCL. Particularly, three different color-conversion materials were embedded onto a blue bottom-emitting LEC, to study the resulting spectrum. One of the materials, MEH-PPV, have good absorption compatibility with the electroluminescence of the blue emitters, but the materials photoluminescence do not cover the red to deep-red range of the spectrum. These parts of the spectrum are necessary to obtain high color rendering indices (≥80). A single layer of MEH-PPV adapted onto a blue-emitting LEC, led to a cold white LEC with CIE-coordinates x = 0.29, and y = 0.36, color-rendering index = 71, and correlated color temperature = 7200 K. These properties makes it potentially useful in outdoor-lighting applications. The photoluminescence of another studied color-converting material, polymer red, covers the red to deep-red range of the spectrum but the material lacks absorption in the green parts of the blue emitters electroluminescence spectrum. Thus it is necessary to combine it with MEH-PPV to be able to absorb all wavelengths from the blue-emitter and get a broad light-spectrum out of the device. In order to preserve a part of the blue light, a new device configuration was designed. It features a top-emitting blue LEC with a dual-layer CCL which reach an impressive color rendering index = 89 at a correlated color temperature = 6400 K (CIE-coordinates x = 0.31, y = 0.33). The color-rendering index is the highest reported for a white LEC. The absence of UV-, and IR-radiation, together with the high color rendering properties make the white LEC a possible candidate for even the most demanding lighting-applications, such as art galleries, and shop display windows, together with indoor lighting. In this thesis, I show that the CCLs function well. However, for the LECs to be worthy competitors, the efficiency and lifetime of the blue emitter need improvements. Color-conversion layer Light-emitting electrochemical cell LEC LECs White light R9 color-rendering index CRI High-color-rendering color-conversion top-emitting Färgkonverteringslager ljusemitterande electrokemisk cell LEC LECar Vit ljusemitterande electrokemisk cell vitt ljus R9 färgåtergivningstal CRI färgkonvertering topp-emitterande

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