source: sasview/src/sas/perspectives/pr/media/pr_help.rst @ efa5e44

ESS_GUIESS_GUI_DocsESS_GUI_batch_fittingESS_GUI_bumps_abstractionESS_GUI_iss1116ESS_GUI_iss879ESS_GUI_iss959ESS_GUI_openclESS_GUI_orderingESS_GUI_sync_sascalccostrafo411magnetic_scattrelease-4.1.1release-4.1.2release-4.2.2release_4.0.1ticket-1009ticket-1094-headlessticket-1242-2d-resolutionticket-1243ticket-1249ticket885unittest-saveload
Last change on this file since efa5e44 was 8a22b5b, checked in by smk78, 10 years ago

Proof read.

  • Property mode set to 100644
File size: 1.9 KB

P(r) Inversion Perspective

Description

This tool calculates a real-space distance distribution function, P(r), using the inversion approach (Moore, 1908).

P(r) is set to be equal to an expansion of base functions of the type

Φ_n(r) = 2.r.sin(π.n.r/D_max)

The coefficient of each base function in the expansion is found by performing a least square fit with the following fit function

χ2 = Σi [ Imeas(Qi) - Ith(Qi) ] 2 / (Error) 2 + Reg_term

where Imeas(Q) is the measured scattering intensity and Ith(Q) is the prediction from the Fourier transform of the P(r) expansion.

The Reg_term term is a regularization term set to the second derivative d2P(r) / dr2 integrated over r. It is used to produce a smooth P(r) output.

How To

The user must enter

  • Number of terms: the number of base functions in the P(r) expansion.
  • Regularization constant: a multiplicative constant to set the size of the regularization term.
  • Maximum distance: the maximum distance between any two points in the system.

Reference

P.B. Moore J. Appl. Cryst., 13 (1980) 168-175

Note

This help document was last changed by Steve King, 19Feb2015

Note: See TracBrowser for help on using the repository browser.