Post on 03-Jan-2016
FTLE and LCSPranav Mantini
Contents• Introduction• Visualization• Lagrangian Coherent Structures• Finite-Time Lyapunov Exponent Fields• Example• Future Plan
Time-Varying Vector Fields
• Vector Field defines a vector(v(x)) at every point x on the grid
• In time variant vector field the vector defined at the points on the grid change with time(v(x,t)).
• Creating complex patterns and requires sophisticated techniques for analysis and visualization
Applications• Thorough analysis of
flows plays an important role in many different processes,o Airplane o Car designo Environmental researcho And medicine
• Deepwater Horizon Oil Spill
Mathematical Framework
• A time-varying vector field is a map
• Satisfies the conditions
o ) =
Visualization• Traditionally visualized using Vector Field
Topology.• Gives a simplified representation of a vector field
a dynamical system, with respect to the regions of different behavior.
• VFT deals with the detection, classification and global analysis of critical points
• VFT are significantly helpful for visualizing the time independent vector fields.
Visualization• In time varying vector fields, pathline diverge
from stream lines and the critical points move.• Forces to visualize only at a single point of time.• Coherent structures provide a more meaningful
representation
Lagrangian Coherent Structures
• LCS has gained attention in visualizing time dependent vector fields
• A set of LCS can represents regions that exhibits similar behavior
• example, a recirculation region can be delimited from the overall flow and can represent an isolated LCS
• LCS boundaries can be obtained by computing height ridges of the finite-time Lyapunov exponent fields
Real World Correspondence
Confluences Glaciers
LCS = Interfaces LCS = Moraines
from: www.scienceclarified.com/Ga-He/Glacier.htmlfrom: www.publicaffairs.water.ca.gov/swp/swptoday.cfm
Finite-Time Lyapunov Exponent
Fields• Scalar Value • Quantifies the amount of
stretching between two particles flowing for a given time
• High FTLE values correspond to particles that diverge faster than other particles in the flow field
High FTLE Values
Finite-Time Lyapunov Exponent
Fields• Advect each sample point at time with the flow
for time , resulting in a flow map • maps a sample point x to its advection position
Finite-Time Lyapunov Exponent
Fields• Give an arbitrary point
• Aim of the FTLE is to estimate the maximal growth of during the time period
•
+L2 Norm on both sides
=
𝑥 (𝑡 0 )
Finite-Time Lyapunov Exponent
Fields• Maximum value can be computed from• maximum stretching would then be the square
root of the largest eigenvalue of • FTLE is calculated as
Lagrangian Coherent Structures
• Ridge lines in these fields correspond to LCS• Height ridges are locations where a scalar field
has a local extremum in at least one direction• Ridge criterion can be formulated using the
gradient and the Hessian of the scalar field• Eigenvectors belonging to the largest eigenvalues
of the Hessian point along the ridge, and the smallest point orthogonal to the ridge.
Example• Velocity Field• Time-dependent double gyre• Domain [0, 2] x [0, 1]
FTLE and LCS
• FTLE
• FTLE
LCS
Crowd Flow Segmentation & Stability
Analysis• (CVPR), 2007
Future Plan• It is obvious that the
LCS are influenced by the 3D geometry.
• It might be interesting to see how the change in geometry influences the LCS
Build Vector Field, Find LCS
Change Geometry
Estimate LCS
Future Plan• Week – 1&2: Estimate LCS for an example Vector
Field• Week – 3: Build a Vector Field from real world
scenario• Week – 4: Estimate LCS• Week – 5….: Try to estimate LCS based on
geometry and other information, in the absence of a vector field
References• “Visualizing Lagrangian Coherent Structures and
Comparison to Vector Field Topology” Filip Sadlo and Ronald Peikert Computer Graphics Laboratory, Computer Science Department
• Efficient Computation and Visualization of Coherent Structures in Fluid Flow Application. Christoph Garth, Florian Gerhardt, Xavier Tricoche, Hans Hagens
• http://mmae.iit.edu/shadden/LCS-tutorial/
Any Questions