134 research outputs found
The dendritic density field of a cortical pyramidal cell
Much is known about the computation in individual neurons in the cortical column. Also, the selective connectivity between many cortical neuron types has been studied in great detail. However, due to the complexity of this microcircuitry its functional role within the cortical column remains a mystery. Some of the wiring behavior between neurons can be interpreted directly from their particular dendritic and axonal shapes. Here, I describe the dendritic density field (DDF) as one key element that remains to be better understood. I sketch an approach to relate DDFs in general to their underlying potential connectivity schemes. As an example, I show how the characteristic shape of a cortical pyramidal cell appears as a direct consequence of connecting inputs arranged in two separate parallel layers
Preserving neural function under extreme scaling
Important brain functions need to be conserved throughout organisms of extremely varying sizes. Here we study the scaling properties of an essential component of computation in the brain: the single neuron. We compare morphology and signal propagation of a uniquely identifiable interneuron, the HS cell, in the blowfly (Calliphora) with its exact counterpart in the fruit fly (Drosophila) which is about four times smaller in each dimension. Anatomical features of the HS cell scale isometrically and minimise wiring costs but, by themselves, do not scale to preserve the electrotonic behaviour. However, the membrane properties are set to conserve dendritic as well as axonal delays and attenuation as well as dendritic integration of visual information. In conclusion, the electrotonic structure of a neuron, the HS cell in this case, is surprisingly stable over a wide range of morphological scales
The Morphological Identity of Insect Dendrites
Dendrite morphology, a neuron's anatomical fingerprint, is a
neuroscientist's asset in unveiling organizational principles in the
brain. However, the genetic program encoding the morphological identity of a
single dendrite remains a mystery. In order to obtain a formal understanding of
dendritic branching, we studied distributions of morphological parameters in a
group of four individually identifiable neurons of the fly visual system. We
found that parameters relating to the branching topology were similar throughout
all cells. Only parameters relating to the area covered by the dendrite were
cell type specific. With these areas, artificial dendrites were grown based on
optimization principles minimizing the amount of wiring and maximizing synaptic
democracy. Although the same branching rule was used for all cells, this yielded
dendritic structures virtually indistinguishable from their real counterparts.
From these principles we derived a fully-automated model-based neuron
reconstruction procedure validating the artificial branching rule. In
conclusion, we suggest that the genetic program implementing neuronal branching
could be constant in all cells whereas the one responsible for the dendrite
spanning field should be cell specific
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Achieving functional neuronal dendrite structure through sequential stochastic growth and retraction.
Class I ventral posterior dendritic arborisation (c1vpda) proprioceptive sensory neurons respond to contractions in the Drosophila larval body wall during crawling. Their dendritic branches run along the direction of contraction, possibly a functional requirement to maximise membrane curvature during crawling contractions. Although the molecular machinery of dendritic patterning in c1vpda has been extensively studied, the process leading to the precise elaboration of their comb-like shapes remains elusive. Here, to link dendrite shape with its proprioceptive role, we performed long-term, non-invasive, in vivo time-lapse imaging of c1vpda embryonic and larval morphogenesis to reveal a sequence of differentiation stages. We combined computer models and dendritic branch dynamics tracking to propose that distinct sequential phases of stochastic growth and retraction achieve efficient dendritic trees both in terms of wire and function. Our study shows how dendrite growth balances structure-function requirements, shedding new light on general principles of self-organisation in functionally specialised dendrites
Design and implementation of multi-signal and time-varying neural reconstructions
Open Access This article is licensed under a Creative Commons Attribution 4.0 International License, which permits use, sharing, adaptation, distribution and reproduction in any medium or format, as long as you give appropriate credit to the original author(s) and the source, provide a link to the Creative Commons license, and indicate if changes were made.Several efficient procedures exist to digitally trace neuronal structure from light microscopy, and mature community resources have emerged to store, share, and analyze these datasets. In contrast, the quantification of intracellular distributions and morphological dynamics is not yet standardized. Current widespread descriptions of neuron morphology are static and inadequate for subcellular characterizations. We introduce a new file format to represent multichannel information as well as an open-source Vaa3D plugin to acquire this type of data. Next we define a novel data structure to capture morphological dynamics, and demonstrate its application to different time-lapse experiments. Importantly, we designed both innovations as judicious extensions of the classic SWC format, thus ensuring full back-compatibility with popular visualization and modeling tools. We then deploy the combined multichannel/time-varying reconstruction system on developing neurons in live Drosophila larvae by digitally tracing fluorescently labeled cytoskeletal components along with overall dendritic morphology as they changed over time. This same design is also suitable for quantifying dendritic calcium dynamics and tracking arbor-wide movement of any subcellular substrate of interest.Peer reviewe
Denervation-induced dendritic reorganization leads to changes in the electrotonic architecture of model dentate granule cells
The Morphological Identity of Insect Dendrites
Dendrite morphology, a neuron's anatomical fingerprint, is a
neuroscientist's asset in unveiling organizational principles in the
brain. However, the genetic program encoding the morphological identity of a
single dendrite remains a mystery. In order to obtain a formal understanding of
dendritic branching, we studied distributions of morphological parameters in a
group of four individually identifiable neurons of the fly visual system. We
found that parameters relating to the branching topology were similar throughout
all cells. Only parameters relating to the area covered by the dendrite were
cell type specific. With these areas, artificial dendrites were grown based on
optimization principles minimizing the amount of wiring and maximizing synaptic
democracy. Although the same branching rule was used for all cells, this yielded
dendritic structures virtually indistinguishable from their real counterparts.
From these principles we derived a fully-automated model-based neuron
reconstruction procedure validating the artificial branching rule. In
conclusion, we suggest that the genetic program implementing neuronal branching
could be constant in all cells whereas the one responsible for the dendrite
spanning field should be cell specific
Noncommutative Geometry of Finite Groups
A finite set can be supplied with a group structure which can then be used to
select (classes of) differential calculi on it via the notions of left-, right-
and bicovariance. A corresponding framework has been developed by Woronowicz,
more generally for Hopf algebras including quantum groups. A differential
calculus is regarded as the most basic structure needed for the introduction of
further geometric notions like linear connections and, moreover, for the
formulation of field theories and dynamics on finite sets. Associated with each
bicovariant first order differential calculus on a finite group is a braid
operator which plays an important role for the construction of distinguished
geometric structures. For a covariant calculus, there are notions of invariance
for linear connections and tensors. All these concepts are explored for finite
groups and illustrated with examples. Some results are formulated more
generally for arbitrary associative (Hopf) algebras. In particular, the problem
of extension of a connection on a bimodule (over an associative algebra) to
tensor products is investigated, leading to the class of `extensible
connections'. It is shown that invariance properties of an extensible
connection on a bimodule over a Hopf algebra are carried over to the extension.
Furthermore, an invariance property of a connection is also shared by a `dual
connection' which exists on the dual bimodule (as defined in this work).Comment: 34 pages, Late
Optimization principles of dendritic structure
This is an Open Access article distributed under the terms of the Creative Commons Attribution Licens
A New Approach for Determining Phase Response Curves Reveals that Purkinje Cells Can Act as Perfect Integrators
Cerebellar Purkinje cells display complex intrinsic dynamics. They fire spontaneously, exhibit bistability, and via mutual network interactions are involved in the generation of high frequency oscillations and travelling waves of activity. To probe the dynamical properties of Purkinje cells we measured their phase response curves (PRCs). PRCs quantify the change in spike phase caused by a stimulus as a function of its temporal position within the interspike interval, and are widely used to predict neuronal responses to more complex stimulus patterns. Significant variability in the interspike interval during spontaneous firing can lead to PRCs with a low signal-to-noise ratio, requiring averaging over thousands of trials. We show using electrophysiological experiments and simulations that the PRC calculated in the traditional way by sampling the interspike interval with brief current pulses is biased. We introduce a corrected approach for calculating PRCs which eliminates this bias. Using our new approach, we show that Purkinje cell PRCs change qualitatively depending on the firing frequency of the cell. At high firing rates, Purkinje cells exhibit single-peaked, or monophasic PRCs. Surprisingly, at low firing rates, Purkinje cell PRCs are largely independent of phase, resembling PRCs of ideal non-leaky integrate-and-fire neurons. These results indicate that Purkinje cells can act as perfect integrators at low firing rates, and that the integration mode of Purkinje cells depends on their firing rate
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