3.1. Instrument

The definition of the instrument includes the detector positions, the cryostat wall positions and the neutron wavelength spectrum. When EXEQ was being written, the EXED instrument used several fixed, pre-defined detector positions for measurements, while the magnet rotated continuously, additionally shadowing the detector panels. Therefore, the instrument definition was loaded from XML files and cut-offs were calculated for each detector tube to determine the total solid angle covered by the detectors. Later on, a vacuum chamber for the INS mode was installed with rotatable detector panels larger than the magnet cone, allowing for the calculation to be simplified in InEXEQ, where the entire forward opening of the magnet cone is covered, excluding the beamstop position and the gaps between panels. This simplification of the detector definition to basic geometrical shapes allowed us to implement all the processing as NumPy functions, resulting in a significant speedup over the original EXEQ code, which implemented the tests of detector limits in pure Python. However, EXEQ still uses Mantid-style XML files for storing the instrument definition, and replacing the EXED instrument with another one from the Mantid instrument directory should not require a significant programming effort.

The calculation of the flux is based on the simulation of the instrument performed using VITESS  (Wechsler et al., 2000; Zsigmond et al., 2002), where the neutron spectrum at the sample position was simulated for the entire neutron guide system, neglecting the choppers. These results are interpolated using the SciPy interpolation module, and then scaled by a reduction factor calculated from the chopper settings.

3.2. Sample

The sample definition is common to both EXEQ and InEXEQ. The unit cell is defined by three lattice constants a, b and c, and three angles α, β and γ. The space group of the sample is not a part of the input, nor are the atomic positions inside the unit cell. Therefore, symmetry considerations do not enter the calculations in the software, and it is up to the user to choose a valid position in the reciprocal space. However, this way the input is also not limited in any way, and it is just as easy to specify a reflection corresponding to an incommensurate structure as it is to specify a Bragg reflection with integral Miller indices.

The sample orientation is defined using the original definition  (Busing & Levy, 1967) of the UB matrix. However, users are expected to use and vectors (labelled Bu and Bv, respectively, in the software interface) instead of the usual and . The and vectors define the sample orientation with respect to the magnetic field of the instrument and not to the neutron beam; they are identical to and when the magnet rotation angle is 0°, and are independent of the magnet rotation.

Simple utility functions of both EXEQ and InEXEQ include plotting the sample orientation. The detector positions, beam direction and magnetic field direction are plotted in real space, and the directions of , , and are indicated in the same coordinate system. This should remove any ambiguity related to the convention of axis labelling or handedness of the coordinate system, as the effect of all the goniometer rotations is shown in real space. Fig. 1(a) shows an example of the sample orientation plot, generated for −12° magnet rotation angle. (The extreme position of the detector chamber in the real instrument is reached at −11.85°, but −12° is still allowed in the calculator to simplify the input.) At this position, the edge of the magnet cone is located 27° away from the direction of the direct beam. The red areas in Fig. 1(a) indicate the positions of accessible detector panels in real space; as this is a real-space plot, it is independent of the definition of the sample unit cell. For this configuration, the Ewald construction is shown in Fig. 1(b). The accessible volume is contained between the two Ewald spheres, corresponding to the largest and smallest neutron wavelengths of the current wavelength band; then, the accessible volume is cut by the angular coverage of the detectors. The combination of these conditions gives the covered volume, marked in green in the figure. The dashed lines indicate the geometrical limits and accessible detector surface in real space, and the green areas indicate the coverage in reciprocal space; therefore, the fact that the dashed lines intersect with the green area is of no significance to the calculation, since the two belong to different coordinate systems. Fig. 1(c) shows the reciprocal-space coverage calculated using EXEQ for the same instrument configuration assuming a cubic sample with the lattice constant a = 4 Å, which is the default sample definition in EXEQ. Since the sample cryostat is rotated together with the magnet, the −12° magnet rotation results not only in the change of detector position [already shown in Figs. 1(a) and 1(b)] but also in a rotation of the sample. Therefore, a −12° rotation is applied to the sample, and the final u and v orientation vectors with respect to the incoming beam are u = (−0.2079, 0, 0.9781) and v = (0.9781, 0, 0.2079) instead of the original and at 0° magnet rotation. This way the coverage in the hkl coordinates shown in Fig. 1(c) is rotated compared with the ideal calculation in Fig. 1(b). The grey areas in the plot indicate the shadowed part of the detector panels. This means that a detector pixel was present at the real-space position corresponding to the reciprocal-space coordinates in the plot, but the flight path between the sample and that pixel was blocked. This is in contrast to the other points in the colour map marked as having zero neutron flux, which correspond to a position in real space where no detector is present or no neutrons of appropriate wavelength are present in the instrument wavelength spectrum.

Figure 1 (a) Sample orientation view (in real space), common to both EXEQ and InEXEQ. The sample is in the centre and the red shapes away from the sample indicate the usable area of the detector. The conventional and are shown together with the and (labelled Bu and Bv, respectively) used as user input. The configuration shown here corresponds to the largest possible angle of magnet rotation, and to the maximum instrument coverage. (b) The Ewald construction showing the coverage of the instrument corresponding to the detector positions shown above. The dashed lines indicate the magnet cone limits (in real space), affecting the accessible detector area, and the circles indicate the limits of the wavelength band. The covered range (in reciprocal space) is marked in green, and the range blocked by the magnet cone in checkered grey. (c) The reciprocal-space coverage calculated with EXEQ for a cubic sample using the orientation shown above. The grey area outside the contour indicates the shadowed part of the detector.

In both the EXEQ and InEXEQ codes, the main part of the calculation relies on the inverse UB matrix to transform the hkl coordinates into the scattering vector , where and indicate the initial and final neutron wavevectors, respectively. Then, depending on which software is being used, the and vectors are derived from assuming either elastic scattering (where ) in the case of EXEQ or inelastic scattering (where is known from the instrument settings) in the case of InEXEQ. The coordinate system is chosen so that the z axis coincides with the incoming neutron beam, the x axis is perpendicular to the beam in the horizontal plane and the y axis is vertical. This way in both the elastic and the inelastic scattering mode.

The equations used in the calculation are well known and standard in the neutron scattering community: the UB matrix (or, more precisely, the RUB matrix, where R contains the rotations resulting from the goniometer angles) defines the relationship between the vectors and the hkl coordinates: and , where is the scattering vector in the instrument frame, and is the reciprocal-space vector expressed in the basis of the reciprocal-lattice vectors , and . The advantage of using the EXEQ/InEXEQ software lies in the fact that the behaviour of the instrument is reproduced exactly in the calculation. This means that the rotation of the magnet results automatically in an identical rotation of the sample. Also, the maximum rotation angles of the magnet are adjusted depending on the choice of the last segment of the neutron optics (where the choice is currently between a neutron guide and a collimation system for low-Q experiments).

3.3. EXEQ

The required input, apart from the sample orientation, is the wavelength range and the requested resolution at the band centre . The simulated spectrum of the instrument is used in order to calculate the flux at each wavelength, and the resolution is the input for the chopper frequency calculation, which determines the flux reduction factor. This way a realistic prediction can be made for the flux in the experiment.

In EXEQ, the calculation of the coverage starts with the user input defining the plane to be plotted. At the moment, the possibility of plotting arbitrary planes has not been added to the interface; therefore the plane has to be orthogonal to the h, k or l direction, keeping the other two directions in plane. A simple example of the coverage map has already been shown in Fig. 1. In Fig. 2, the calculation has been performed using the unit-cell definition of green dioptase, a naturally occurring mineral. The coverage is plotted for h = -2, since the reflections of interest are located in this plane. The requested reflections are marked on the map, and their corresponding neutron wavelength and flux are shown in the legend of the plot. The reflections of interest are marked in both parts of the plot, to allow users to note easily if their reflection of interest could be reached using the backscattering panels rather than the forward panels.

Figure 2 A map of the instrument coverage generated using EXEQ. The left (right) side shows the forward (backward) detector panels. Inside the contour, the colour map corresponds to the expected neutron flux at each point, where a darker colour indicates higher flux. The grey area outside the contour indicates the shadowed part of the detector. The points of interest selected by the user are marked in both parts of the map.

Another output of EXEQ is the plot of detector panel positions, shown in Fig. 3. The real-space positions of the reflections are marked on the detector. (The set of input parameters used here is the same as for the coverage map in Fig. 2.) There is no calculation of the total size of the peak on the detector; the calculation shows only the ideal centre of the peak.

Figure 3 Detector view of EXEQ. The detector position matches the selected magnet rotation angle. The specified hkl points are marked on the detector in real space. The shadows of the magnet cone, chopper housing and beamstop are marked in green, while the remaining accessible area is solid red.

Internally, the calculation is performed in several steps. First, the limits of the coverage are approximated by calculating the vector for a sparse set of pixels distributed over the edge of the detector array at and . Then, a rectangular grid of hkl points is created within these limits, and is calculated for each point on the grid. For a vector the scattering vectors can be found using the relationship = . The length of the vector, , and the direction are given as two angles in a spherical coordinate system. For each point, if the angles fall within the limits of a detector panel (including shadowing by the beamstop and the cryostat walls) and the wavelength is within the chosen limits, the point is given the value of the expected neutron flux at this wavelength; the value is 0 otherwise.

A total coverage map (Fig. 4) can be generated, where the coverage plots calculated for different magnet rotation angles are superimposed. The map is meant to produce a qualitative result, informing the user if there is any possibility at all of accessing the part of the reciprocal space they requested. In order to obtain more detailed information it is necessary to specify a reflection of interest as an input parameter. For the reflections of interest defined by the user, which are marked in the plot, the magnet rotation angle resulting in the highest flux will be indicated for each marker. In Fig. 4, the requested value of l = -0.5 introduces an out-of-plane component to the scattering vector; as a result, the backscattering panels do not provide any coverage, independent of the magnet rotation angle.

Figure 4 A map of the total instrument coverage generated using EXEQ. Every magnet rotation angle is plotted using a different solid colour. For each marked point, the legend shows the angle where the flux at that point is the highest. In this example, the backscattering panels do not cover any area of the requested plane.

3.4. InEXEQ

The input for InEXEQ consists of the incoming neutron energy E_i in meV units and the required percentage resolution at the elastic line position. On the basis of these parameters, the chopper frequency is calculated, assuming a 1:1 ratio between the first and last chopper discs. Large chopper windows are used whenever possible, to maximize the incoming flux. The chopper frequency is also used in the calculation of the maximum energy transfer. The energy transfer range may be limited, as the very slow neutrons corresponding to the largest energy transfer may be lost due to frame overlap. Therefore, we do not consider neutrons with sample-to-detector flight time longer than the chopper period. The formulae describing the energy resolution are the same as in the original paper by Lechner (1991).

As opposed to EXEQ, the calculation here is performed on a four-dimensional grid of points. The points of the grid are evenly spaced in hkl and ΔE units. The range of the calculation can be given explicitly by the user or left for the software to find automatically. The main output of the software is the coverage map, where a one-, two- or three-dimensional plot is created, showing which points in the specified ranges of hkl and ΔE can be reached using the current input parameters. In the directions which are not used as plotting axes, the coverage is integrated. The ratio of the covered voxels to the total number of integrated voxels in each point is the percentage of coverage, which is shown as the intensity in the maps. An example of a single map is shown in Fig. 5 and a total coverage map is shown in Fig. 6. Just as was the case for the elastic scattering, the total coverage map is meant to be a coarse testing tool, telling users if the current sample orientation may provide access to the requested part of reciprocal space. As seen in Fig. 6, the coverage along the direction of the incoming neutron beam is nearly independent of the magnet rotation. The magnet rotation translates the detector array in the direction perpendicular to the plot plane, and rotating the crystal l direction with respect to the direct beam can change the momentum transfer along that direction only by < 2.3%. Therefore, within the allowed rotation range there is always a part of the detector array at the angle corresponding to the reciprocal-space cut in the plot; at the same time, the sample orientation change is minimal. This example emphasizes the importance of precise experiment planning on the EXED instrument, as there is little room for correction once the sample is already in place.

Figure 5 An example of a two-dimensional coverage map generated by InEXEQ. The gap in the coverage around h = 0 corresponds to the position of the beamstop.

Figure 6 An example of a two-dimensional total coverage map generated by InEXEQ. Each colour corresponds to a different magnet rotation angle, in steps of 2°, resulting in eight rotation angles in total.

Just as in EXEQ, the main part of the calculation consists of finding the vector for each (h,k,l,dE) point of the grid. However, the conversion from to is simple in this case, since is [0,0,(2m_nE_i)^1/2h^-1], where h is the Planck constant, m_n is the neutron mass and E_i is the incident neutron energy which is known from the instrument settings.

The grid is generated as a NumPy array of 32-bit float variables, with the starting size of 80×80×80×80×s, where s is the scaling factor labelled as `precision' in the interface. This means that approximately 132 MB of RAM are necessary to perform the calculation with the standard precision of reciprocal-space sampling. If the user input requires fewer sampling points along any direction, the total size of the grid is preserved and the number of points along other axes is increased accordingly. Of course, there is still a risk that, by setting an unrealistically large range of coordinates along any axis, the user can produce a grid where none of the points coincide with the covered region. This is easily avoided by using the built-in automatic limit detection in the first step, and then narrowing down the coverage to the region of interest in order to increase the plotting precision further.

The maximum (E, Q) range of the instrument can be calculated, as shown in Fig. 7. This is mainly relevant to powder samples and is calculated assuming the maximum magnet rotation angle.

Figure 7 A plot of the maximum coverage for a powder sample, generated for Ei = 15 meV.