\(\renewcommand\AA{\unicode{x212B}}\)

FlippingRatioCorrectionMD v1¶

FlippingRatioCorrectionMD dialog.

Table of Contents

Summary
Properties
Description
References
Usage
Source

Summary ¶

Creates MDEvent workspaces with polarization flipping ratio corrections.The polarization might be angle dependent.

Properties ¶

Name	Direction	Type	Default	Description
InputWorkspace	Input	MDEventWorkspace	Mandatory	An input MDEventWorkspace.
FlippingRatio	Input	string	Mandatory	Formula to define the flipping ratio. It can depend on the variables in the list of sample logs defined below
SampleLogs	Input	str list		Comma separated list of sample logs that can appear in the formula for flipping ratio
OutputWorkspace1	Output	Workspace	Mandatory	Output workspace 1. Equal to Input workspace multiplied by FR/(FR-1).
OutputWorkspace2	Output	Workspace	Mandatory	Output workspace 2. Equal to Input workspace multiplied by 1/(FR-1).

Measurements using polarized neutrons can be used to identify magnetic and nuclear contribution. In the case of coherent scattering, nuclear spins generally do not change the spin polarization of the neutrons (non spin flip scattering). For magnetic scattering, the magnetization parallel to the neutron spin direction produces non spin flip scattering, while magnetization perpendicular to the spin direction will flip the neutron spin.

When measuring spin flip and non spin flip cross sections, the finite capabilities of the instrument will allow a certain percentage of the other component to leak through. This is denoted by the flipping ratio \(F\). Using subscript “m” for measured and “c” for corrected, the corrected intensities for the spin flip (SF) and non spin flip (NSF) scattering are given by [1]:

\[\begin{split}I_{NSFc}=\frac{F}{F-1}I_{NSFm}-\frac{1}{F-1}I_{SFm}\\ I_{SFc}=\frac{F}{F-1}I_{SFm}-\frac{1}{F-1}I_{NSFm}\end{split}\]

Given a multidimensional event workspace, this algorithm will output the workspace where events are multiplied by \(F/(F-1)\) (in OutputWorkspace1) and by \(1/(F-1)\) (in OutputWorkspace2). Note however that the flipping ratio might be angle dependent. For example, in the case of type II superconductors, the flux lattice will depolarize the neutrons differently, depending on the orientation of the neutron beam with respect to the superconducting planes. In this case one must use a formula that would use a different flipping ratio for each neutron, that depends on a goniometer angle. Assuming that we have a log value omega for the sample rotation, the flipping ratio might be described by something like [2]:

\[F=6.5+2.8\cos(\pi(omega+3.7)/180)\]

The MD event workspaces label each MDEvent with the experiment info number. The time averaged log value for omega is read from each experiment info, the flipping ratio is calculated from the user provided formula, and the corrected workspaces are computed.

For the parsing of the formula, the algorithm uses muparser. Once can use any of the implemented functions. The constant “pi” can be used in the formula. Use “_e” for the base of natural logarithms.

References ¶

[1]	O Schärpf, Experience with spin analysis on a time-of-flight multidetectorscatteringinstrument, In Neutron scattering in the nineties, Proceedings of the IAEA Conference, Jülich 85-97 (1985) https://inis.iaea.org/collection/NCLCollectionStore/_Public/16/076/16076003.pdf

[2]	Igor A Zaliznyak et al, Polarized neutron scattering on HYSPEC: the HYbrid SPECtrometer at SNS, J. Phys.: Conf. Ser. 862 012030 (2017) doi:10.1088/1742-6596/862/1/012030

Usage ¶

Example - FlippingRatioCorrectionMD

# Fake an md workspace
CreateMDWorkspace(Dimensions=2, EventType='MDEvent', Extents='-5,5,-5,5', Names='A,B', Units='a,a' ,OutputWorkspace='mde1')
AddSampleLog(Workspace='mde1', LogName='param', LogText='0.', LogType='Number', NumberType='Double')
FakeMDEventData(InputWorkspace='mde1', PeakParams='100,-2,-2,0.1')
CreateMDWorkspace(Dimensions=2, EventType='MDEvent', Extents='-5,5,-5,5', Names='A,B', Units='a,a',OutputWorkspace='mde2')
AddSampleLog(Workspace='mde2', LogName='param', LogText='90.', LogType='Number', NumberType='Double')
FakeMDEventData(InputWorkspace='mde2', PeakParams='100,2,2,0.1')
MergeMD(InputWorkspaces='mde1,mde2', OutputWorkspace='merged')

# Calculate flipping ratio corrections
FlippingRatioCorrectionMD(InputWorkspace='merged',
                          FlippingRatio='10+5*sin(param*pi/180)',
                          SampleLogs='param',
                          OutputWorkspace1='correctionFoFm1',
                          OutputWorkspace2='correction1oFm1')

# Bin data and extract intensities
BinMD(InputWorkspace='correctionFoFm1', AlignedDim0='A,-5,5,2', AlignedDim1='B,-5,5,2', OutputWorkspace='correctionFoFm1_histo')
peak1_FoFm1=mtd['correctionFoFm1_histo'].getSignalArray()[0,0]
peak2_FoFm1=mtd['correctionFoFm1_histo'].getSignalArray()[1,1]
BinMD(InputWorkspace='correction1oFm1', AlignedDim0='A,-5,5,2', AlignedDim1='B,-5,5,2', OutputWorkspace='correction1oFm1_histo')
peak1_1oFm1=mtd['correction1oFm1_histo'].getSignalArray()[0,0]
peak2_1oFm1=mtd['correction1oFm1_histo'].getSignalArray()[1,1]
print("{:>17}   Peak1      Peak2".format(' '))
print("{:>17} {:8.3f}   {:8.3f}".format('Original',100,100))
print("{:>17} {:8.3f}   {:8.3f}".format('F',10,15))
print("{:>17} {:8.3f}   {:8.3f}".format('F/(F-1)',10./9.,15/14.))
print("{:>17} {:8.3f}   {:8.3f}".format('Corrected F/(F-1)',peak1_FoFm1,peak2_FoFm1))
print("{:>17} {:8.3f}   {:8.3f}".format('1/(F-1)',1./9.,1/14.))
print("{:>17} {:8.3f}   {:8.3f}".format('Corrected 1/(F-1)',peak1_1oFm1,peak2_1oFm1))

Output:

                    Peak1      Peak2
         Original  100.000    100.000
                F   10.000     15.000
          F/(F-1)    1.111      1.071
Corrected F/(F-1)  111.111    107.143
          1/(F-1)    0.111      0.071
Corrected 1/(F-1)   11.111      7.143

Categories: AlgorithmIndex | MDAlgorithms\Transforms