Modeling Magnetic Reconnection in a Complex Solar Corona Dana Longcope Montana State University & Institute for Theoretical Physics
The Changing Magnetic Field TRACE 171: 1,000,000 K 8/10/01 12:51 UT 8/11/01 17:39 UT 8/11/01 9:25 UT (movie)(movie) THE CORONA PHOTOSPHERE
Is this Reconnection? TRACE 171: 1,000,000 K 8/10/01 12:51 UT 8/11/01 17:39 UT 8/11/01 9:25 UT (movie)(movie) THE CORONA PHOTOSPHERE
Outline 1.Developing a model magnetic field 2.A simple example of 3d reconnection 3.The general (complex) case --- approached via variational calculus. 4.A complex example
The Sun and its field Focus on the p-phere And the corona just above
Modeling the coronal field
Example: X-ray bright points EIT 195A image of “quiet” solar corona (1,500,000 K)
Example: X-ray bright points Small specks occur above pair of magnetic poles (Golub et al. 1977)
Example: X-ray bright points
When 2 Poles Collide All field lines from positive source P1 All field lines to negative source N1
Regions overlap when poles approach When 2 Poles Collide
Stress applied at boundary Concentrated at X-point to form current sheet Reconnection releases energy How it’s done in 2 dimensions
A Case Study TRACE & SOI/MDI observations 6/17/98 (Kankelborg & Longcope 1999)
The Magnetic Model Poles Converging: v = 218 m/sec Potential field: - bipole - changing 1.6 MegaVolts (on separator)
Reconnection Energetics Flux transferred intermittently: Current builds between transfers Minimum energy transfer:
Post-reconnection Flux Tube Flux Accumulated over Releases stored Energy Into flux tube just inside bipole (under separator) Projected to bipole location
Post-reconnection Flux Tube Flux Accumulated over Releases stored Energy Into flux tube just inside bipole (under separator)
A view of the model
More complexity From p-spheric field (obs). Find coronal coronal field Defines connectivity
Minimum Energy: Equilibrium Magnetic energy Variation: Fixed at photosphere: Potential field
Minimization with constraints Ideal variations only force-free field Constrain helicity ( w/ undet’d multiplier constant- fff
A new type of constraint… Photospheric field: f(x,y) -- the sources …flux in each domain
Domain fluxes Domain D ij connects sources P i & N j Flux in source i: Flux in Domain D ij Q: how are fluxes related: A: through the graph’s incidence matrix
The incidence matrix N s Rows: sources N d Columns: domains Nc = Nd – Ns + 1 circuits
The incidence matrix
Reconnection possible allocation of flux…
Reconnection … another possibility
Reconnection Related to circuit in the domain graph Must apply 1 constraint to every circuit in graph
Separators: where domains meet 4 distinct flux domains
Separators: where domains meet 4 distinct flux domains Separator at interface
Separators: where domains meet 4 distinct flux domains Separator at interface Closed loop encloses all flux linking P2 N1
Minimum W subj. to constraint Constraint on P2 N1 flux Current-free within each domain current sheet at separator
Minimum W subj. to constraint 2d version: boundary of 4 domains becomes current sheet
A complex example Ns = 20
A complex example Ns = 20 Nc = 33
The original case study Approximate p-spheric field using discrete sources
The domain of new flux Emerging bipole P01-N03 New flux connects P01-N07
Summary 3d reconnection occurs at separators Currents accumulate at separators store magnetic energy Reconnection there releases energy Complex field has numerous separators