26/12/2015 Linking brain dynamics, neural mechanisms and deep brain stimulation Anne Beuter and...
-
Upload
clifton-stokes -
Category
Documents
-
view
216 -
download
2
Transcript of 26/12/2015 Linking brain dynamics, neural mechanisms and deep brain stimulation Anne Beuter and...
21/04/23
Linking brain dynamics, neural mechanisms and deep brain
stimulation
Anne Beuter and Julien Modolo Laboratoire d’Intégration du Matériau au Système
UMR CNRS 5218University of Bordeaux
May 16th, 2008
1
21/04/23
Outline
1. Parkinson’s disease (PD), Basal ganglia (BG), and deep brain stimulation (DBS)
2. Mathematical model: population based approach3. Can we explain DBS paradoxes?4. Conclusion
2
21/04/23
1. Parkinson’s disease (PD), Basal ganglia (BG), and deep brain
stimulation (DBS)
3
21/04/23
Parkinson’s disease (PD) and Deep brain stimulation (DBS)
PD: 800 000 persons in Europe (65 000 new cases each year), 6 millions in the world
DBS: Standard and efficient symptomatic procedure to improve motor symptoms
Main targets: Vim, GPi, STN (favorite)
Mechanisms of DBS: many hypotheses proposed, but mechanisms still unclear today
4
21/04/23
Static model of the network
(Fig from McIntyre, 2005) 5
21/04/23 (Fig modified from McIntyre, 2005)
Direct pathway
Static model of the network (2)
6
21/04/23
Indirect pathway
(Fig modified from McIntyre, 2005)
Static model of the network (3)
7
21/04/23
Hyperdirect pathway
(Fig modified from McIntyre, 2005)
Static model of the network (4)
8
21/04/23
(Rubin, 2008)
9
21/04/23
Zoom on basal ganglia
Modolo J., Mosekilde E., Beuter A., J Physiol Paris, 2007 10
21/04/23
Deep brain stimulation (DBS)
video.mp4
11
21/04/23
McIntyre et al (2005)
12
21/04/23
Deep brain stimulation (DBS) – stimulator off
(from Johns Hopkins Parkinson's Disease and Movement Disorders Center )
13
21/04/23
Deep brain stimulation (DBS) – stimulator on
(from Johns Hopkins Parkinson's Disease and Movement Disorders Center )
14
21/04/23
PD, DBS and paradoxes
Reversibility of symptoms (sleep, somnanbulism or emergencies, pharmacology, DBS) PD = dynamical disease (Beuter et al, 1995), defined by Mackey and Glass (1977)
Lesion versus stimulation: excitation and/or inhibition of the stimulated area?
Frequency dependent stimulation effect
15
21/04/23
Paradox 1: Reversibility of symptoms
PD: reversible under DBS or L-DOPA, symptoms re-appear is DBS or L-DOPA is stopped.
DBS acts on a control parameter of the motor loop network to re-etablish physiological dynamics.
16
21/04/23
Role of the STN-GPe complex in basal ganglia
STN and GPe: tightly interconnected nuclei
STN: main excitatory structure in basal ganglia
STN weak activity in healthy state, strong and synchronous activity between 3 and 8 Hz in PD
STN-GPe: can oscillate spontaneously, « bad pacemaker » ?
17
21/04/23
Levesque and Parent (2005)
The subthalamic nucleus: the prefered target
Parent et al. (1995)
18
21/04/23
Goal: understand these paradoxes to elucidate DBS mechanisms
Develop a mathematical model
Formulate candidate physiological mechanisms interpreted at several scales of description
Confront with numerical simulations, experimental and clinical observations
Our methodology is:
19
21/04/23
Philosophy of the modelling approach
A multi-scale description: DBS current impacts the cellular, population and « network of populations » levels (Beuter and Modolo, 2007)
A dynamical description with a fine temporal resolution: functional models are useful, but not sufficient (static)
A model not too cumbersome easily re-used by other researchers in the field
20
21/04/23 21
Neuron 1
Neuron 2
Neuron N
…..
Single neurons
CouplingEmerging activity(physio/pathological)
Neuronal network
Paradox 1 (cont’d)
21/04/23 22
Neuron 1
Neuron 2
Neuron N
…..
Single neurons
CouplingEmerging activity(physio/pathological)
Neuronal network
DBS
Paradox 1 (cont’d)
21/04/23 23
Neuron 1
Neuron 2
Neuron N
…..
Single neurons
Disruption of coupling
Neuronal network
Stimulation-Induced Functional Decoupling.
Emerging activity(physio/pathological)
Paradox 1 (cont’d)
21/04/23
2. Mathematical model: population based approach
24
21/04/23
A reminder on the Hodgkin-Huxley model
Izhikevich, 2007
• Hodgkin & Huxley (1952):
Study of the giant squid axon, measurement of the membrane potential under different stimulation currents + ionic channels hypothesis.
25
21/04/23
Modelling the effects of DBS with a population based model
Why? : Complex systems imply numerous interactions between the elements of the system: analytical solving is difficult or impossible.
Key concept : Average interaction for each element.
Previous models: mainly based on the LIF model (Nykamp and Tranchina, 2000; Omurtag et al., 2000).
Advantages: multi-scale, dynamic model.
Seems appropriate to model the effects of DBS in PD.
(Fig from Paul De Koninck Laboratory)
26
21/04/23
A simplification: the Izhikevich model
Izhikevich, 2003 27
21/04/23
From single neuron to neuronal populationWhat do we need to describe a neuronal population of N neurons?
2) Quantify neuronal individual dynamics (using the Izhikevich model)
1) A population density function (number of neurons per state)
such as
3) Quantify neuronal interactions (using a mean-field variable)
If: N neurons, W afferences per neuron on average
Then: if M spikes at time t, each neuron receives (W/N)*M spikes
28
21/04/23
Population equationsGeneral form of a conservation equation
Detailed form of the main population equation
Population density Neural flux
Individual dynamics Neural interactions
Mean-field variable
29
21/04/23
Synaptic events modelled by instantaneous « jumps » of amplitude ε in the membrane potential
t
v(t) Excitatory spike
Inhibitory spike
ε
ε
Where is biology in the equations?
Membrane potential
30
Rest
21/04/23
Reception rate of neurotransmitters for each neuron: included in the spike reception rate
This holds too for the neurotransmitters production rate. The mean-field variable expresses as:
Mean connectivity degree
Number of neurons
Axonal conduction delays
Past activity of the network
31
Where is biology in the equations?
21/04/23
Train of biphasic, charge-balanced pulses such as those used in Medtronic® stimulators
Izhikevich model for STN cells (Modolo et al., 2008)
Simplification: DBS current modelled as a current directly injected through the membrane
IDBS(t)
Modelling the DBS stimulation current
32
t
21/04/23
Multiscale properties of the approach
Modolo J., Mosekilde E., Beuter A., J Physiol Paris, 2007 33
21/04/23
Modelling the subthalamo-pallidal network
Terman and Rubin (2002, sophisticated and realistic cell models), Gillies and Willshaw (2004, firing rate model)
The STN-GPe complex activity pattern can change under the following conditions:
Inhibition from Striatum to GPe increases Intra-GPe inhibitory synapses weaken
Relevance of modelling the STN-GPe network during DBS: currently not measured experimentally
34
21/04/23
Mathematical model of the subthalamo-pallidal complexSystem of PDE describing the dynamics of STN and GPe depending on connectivity, delays and individual firing patterns:
Individual population dynamics Populations coupling
Modolo, Henry, Beuter, J Biol Phys (submitted) 35
21/04/23
STN and GPe neurons modelling STN neurons with new parameters for the Izhikevich model
3) Post-inhibitory bursting
2) Increased spiking frequency under excitatory input
1) Spontaneous spiking activity
Modolo, Henry, Beuter, J Biol Phys (submitted) 36
21/04/23 37
STN and GPe dynamics
« Physiological » state « Pathological » state
21/04/23
3. Can we explain DBS paradoxes?
38
21/04/23
Paradox 1: Why do STN stimulation and lesion produce similar benefits?
DBS: intuitively increases the firing rate of STN neurons.
Lesion: destruction of the STN (subthalamotomy), thus completely suppresses STN activity, dramatically improves tremor (BUT is not reversible!)
How can we explain this paradox? We propose the following mechanism:
Stimulation-Induced Functional Decoupling (SIFD): DBS current neutralizes the impact of glutamatergic synapses within the STN (cortical afferences or axon collaterals within the STN).
39
21/04/23
We propose the following mechanism:
Stimulation Induced Functional Decoupling (SIFD) is the situation where neuronal interactions become negligible with regards to individual neuronal dynamics. Thus, the network becomes «unwired» and neurons seem independent from one another.
Mathematically speaking:
Individual neuronal dynamics (+DBS)
Neuronal interactions
Paradox 1 (cont’d)
40
21/04/23 41
Paradox 1 (cont’d)
Response of STN model cells to DBS with/without excitatory coupling.
Supression of internal excitatory connections.
21/04/23 42
Paradox 1 (cont’d)
To GPiFrom cortex
Illustration of Stimulation-Induced Functional Decoupling (SIFD).
21/04/23
Intuitively, electrical stimulation of neurons should increase spiking activity (assumed in Rubin and Terman, 2004)
However: in vivo recordings in MPTP monkeys show a decrease in STN neurons activity! (Meissner et al., 2005)
Furthermore: GPi cells (target of STN cells) are activated at high-frequency (Hashimoto et al., 2003) how is this compatible?
McIntyre et al. (2004): DBS inhibits STN somas, and excites STN axons
soma
axon
No DBS DBS No DBS 43
Paradox 1 (cont’d)
21/04/23 44
Decrease of somatic activity during DBS (model, top; experimental data in humans, bottom)(McIntyre et al., 2004)
21/04/23
Let us list STN neurons dynamical properties:
Dampened oscillations of their membrane potential (Bergman et al., 1994)
Post-inhibitory bursts of action potentials (Bevan et al., 2002)
Two stable equilibria (bistability) (Kass and Mintz, 2006)
STN neurons have their equilibrium near an Andronov-Hopf bifurcation (Izhikevich, 2007) and can be classified as resonators.
Eigen-frequency of STN neurons: low-frequency, thus: high-frequency (≥100 Hz) can delay or decrease the response.
STN neurons dynamical properties underlie their activity decrease during DBS (Modolo and Beuter, in preparation).
45
Paradox 1 (cont’d)
21/04/23
Paradox 2: Why are DBS effects frequency-dependent?
Low-frequency (<20 Hz) DBS: has no effect on motor function, sometimes worsens symptoms (Timmermann et al., 2007).
High-frequency DBS (>100 Hz): provides dramatic relief of symptoms.
Modolo et al. (2008): low-frequency DBS current may cause a resonance with STN neurons eigen-frequency.
Low-frequency DBS appears to exacerbate pathological activity, while high-frequency DBS suppresses it.
46
21/04/23 Model results. (Modolo, Henry, Beuter, J Biol Phys, submitted)
Paradox 2 (cont’d)
47
21/04/23
How does DBS facilitate motor function?
DBS appears to mimic lesions by decreasing STN activity, and lesions improve motor function.
Synaptic decoupling between motor cortex and STN during DBS via SIFD.
Lalo et al. 2008 decrease bêta coupling between M1 and STN during the execution of movement (experimental study).
Our interpretation: the STN becomes functionnaly decoupled from M1 following SIFD, facilitating the execution of movement.
48
21/04/23
Confirmation of insights from simulations
DBS mimics the decoupling of the STN from internal excitatory connections and maybe from cortex, that normally occurs in the presence of dopamine (Magill et al., 2001)
The effects of DBS are frequency-dependent, i.e., the stimulation frequency is close or away from the resonance frequency of the stimulated area (Timmermann et al., 2007)
49
21/04/23
4. Conclusion
50
21/04/23
Conclusion: a cascade of SIFDs?
51
Axonal activation of GPi efferences
Decreased somatic activity
Cortical afferent spikes
Antidromic activation (Li et al., 2007)
Cancellation by collision
SIFD
Afferences from primary motor cortex (M1)
Efferences to GPi
21/04/23
Acknowledgements (model)
Dr J. Henry
University of Bordeaux 1
Dr A. Garenne
University of Bordeaux 2
52
21/04/23
Acknowledgements
BioSim European Network Of Excellence, No AB LSHB-CT-2004-005137, Professor Erik Mosekilde, coordinator
Aquitaine Region (France), No 20051399003AB
Financial support of the project
53
21/04/23
Recent publications Modolo, Henry, Beuter. Dynamics of the subthalamo-pallidal complex during deep brain
stimulation in Parkinson’s disease, J Biol Phys, submitted.
Modolo, Mosekilde, Beuter. New insights offered by a computational model of deep brain stimulation, J Physiol Paris, 101:58–65, 2007.
Modolo, Garenne, Henry, Beuter. Development and validation of a population based model based on a discontinuous membrane potential neuron, J Integr Neurosci, 6(4):625–655, 2007.
Pascual, Modolo, Beuter. Is a computational model useful to understand the effects of deep brain stimulation in Parkinson’s disease? J Integr Neurosci, 5(4) :551–559, 2006.
54
21/04/23
Appendix
55
21/04/23
The diffusion approximation
Let us remind the main population equation
In the limit (EPSP low amplitude), the interaction term expresses as
which gives a Fokker-Planck equation
56
21/04/23
Multiscale properties of the approach
• Infinite number of neurons
• Identical dynamical behaviour
Modolo J., Mosekilde E., Beuter A., J Physiol Paris, 2007 57
21/04/23
Population equations
Modolo J., Garenne A., Henry J., Beuter A., J Integr Neurosci, 2007
In summary, each population is described by a population density function
Where the mean-field variable expresses as
58
21/04/23
Boundary conditions
59