2.1. Basic definitions

Finding a good model orientation is a necessary condition for success with conventional consecutive molecular replacement. Often, and especially for difficult cases, a single rotation function does not give an answer and the search is therefore repeated under different conditions and with different models. It can occur that neither of these finds the correct molecular orientation. At the same time, the answer may be indicated by the most persistent orientation when the results of several such searches are available and the peaks of these rotation functions are taken together (Urzhumtsev & Urzhumtseva, 2002). This persistent signal can be recognized by cluster analysis in rotation-angle space. In the procedure COMPANG developed previously for this goal, the distance between two orientations p_m and p_n is defined as the corresponding effective rotation angle from p_m to p_n. Obviously, for nontrivial space groups all symmetry-related orientations should be taken into account. An important factor in the cluster-analysis procedure is the definition of the distance between two clusters. COMPANG defines it as the minimal distance between all one-to-one orientations, one from each cluster.

2.2. Application of multiple rotation function

To test the multiple rotation-function analysis, we applied it to the experimental data of corn Hageman factor inhibitor (CHFI; Behnke et al., 1998) as follows. The solution of this structure by molecular replacement was previously reported to be difficult (Chen et al., 2000). We briefly introduce this example here (for details, see Urzhumtsev & Urzhumtseva, 2002) because its results are used below for the translation searches. In AMoRe (Navaza, 1994), the rotation function was calculated with the default protocol for each of 20 available NMR models (Strobl et al., 1995; Fig. 1) using experimental structure-factor magnitudes {F_obs}. These calculations were repeated in different resolution zones. None of these functions, taken one by one, allowed the identification of the correct model orientation.

Figure 1 Ribbon view of (a) the CHFI final structure and (b) 20 superimposed NMR models used for molecular-replacement searches (these and other molecular images were produced using PyMOL; DeLano, 2002).

The 30 highest peaks from each of the 20 rotation functions were then selected, taken together and studied by cluster analysis in the space of model orientations (§2.1). An angular cutoff level defines whether two orientations (or their smaller clusters) are considered to be a single cluster or not; this parameter was varied with the tests. The analyzed feature was the relative size of different clusters. Fig. 2 shows the results of the cluster analysis for rotation functions calculated at a resolution of 4–10 Å. The largest cluster always indicates the correct orientation. For large cutoff levels (8° and larger) the noise peaks start merging and the signal decreases. With too small cutoff levels (smaller than 1–2°) no significant clusters can be seen. When rotation functions are calculated at lower resolution, for example at 5–10 Å, the model orientations are defined less accurately and the signal also becomes lower.

Figure 2 Size of clusters of similar model orientations for 20 NMR models of CHFI. Each bar represents one cluster; its height is proportional to the cluster size. A set of the highest peaks of 20 rotation functions is analyzed together. All functions were calculated in the resolution zone 4–10 Å. The three images correspond to a different choice of the angular cutoff distance that defines the separation of clusters: (a) 4.0°, (b) 6.5°, (c) 8.0°. The correct model orientation belongs to the cluster indicated by the arrow.

3.1. Conventional translation functions

Translation functions for CHFI were calculated with AMoRe (Navaza & Vernoslova, 1995). A straightforward molecular-replacement search in the default mode with the top peaks from the rotation functions gave no result for each of the 20 NMR models (different combinations of the resolution for the rotation and translation functions were tried).

The translation search was then performed at a resolution of 5–15 Å with three groups of models. In the first test, which was performed as a control check, the search NMR models were in the best possible orientations as found by their optimal superimposition with the known answer. In the second test, the model orientations were taken from the best cluster in the multiple rotation function calculated at a resolution of 4–10 Å and with a relatively low cluster cutoff level equal to 4.0° (§2). The third test was similar to the second test but the orientations were taken from the set of rotation functions calculated at resolution 5–10 Å and the cluster cutoff was relatively high at 6.5°, so that the model orientations were less accurate.

In all three tests the translation function had a long list of peaks of roughly similar height. The model with the best value of the search criterion (the correlation between the observed structure-factor magnitudes and those calculated from the model) was distant from the correct solution. Some translation peaks did correspond to a model position close to the solution; for example, such a peak was among the top peaks for the models in the optimal orientations (the artificial situation of test 1). However, it was not easy to identify these peaks in the lists, especially in tests 2 and 3 with approximate model orientations.

3.2. Translation searches and multiple peaks

We supposed that if individual translation functions fail to find the solution then a simultaneous analysis of several of them could help, similar to the multiple rotation-function approach. Unfortunately, a direct comparison of translation peaks by closeness of atomic positions was inefficient (we have previously tried numerous variants of this method). There are several reasons that may explain this. For different models taken in different orientations, such a measure is not always straightforward. A different choice of the origin and the presence of symmetry-related molecules cause further confusion. More importantly, search models may fit the electron density of the crystal under study in different ways.

An example is RNA molecules with a pseudo-helical symmetry that are often packed in `columns' and for which the corresponding electron-density maps at medium and low resolution show continuous helices. For such crystals the rotation function predicts the direction of the helix well but not the model orientation around it. Models oriented differently around the helix can be inserted relatively well into the continuous helical density, giving equally persistent peaks of similar size in the translation function (see, for example, Ogihara et al., 1997; we made the same observations when solving several crystals of the ribosomal decoding A sites using data provided by J. Kondo and E. Westhof and making further complementary tests).

These considerations show that at the medium and low resolution typical for molecular replacement the presence of multiple peaks in the translation (and rotation) functions may be natural for the problem, especially when searching using models of poor quality. These multiple peaks may differ significantly if we compare them in terms of geometric parameters. However, they become quite close if we change the measure and compare them by the similarity of the electron density that the corresponding models produce. This com­pletely changes the type of output of the molecular replacement. Traditionally, molecular replacement results in an (atomic) model in a particular position; as a consequence, one obtains a trial set of atomic coordinates (that may be incomplete and with significant errors) and not only the structure-factor phases calculated from this model. Molecular replacement with electron density or with envelopes (see, for example, Urzhumtsev & Podjarny, 1995) does not generate an atomic model but still results in a single position of the search object in the unit cell. This new strategy suggests that in difficult cases we abandon the idea of identifying a single position of the search object (this unique position may simply be undefined for models that differ significantly from the structure) and look only for a phase set. This phase set is used, together with the experimental structure-factor magnitudes, to calculate a map which is then interpreted as in other phasing methods.

3.3. Multiple translation searches

Developing this suggestion, we generated the models for a relatively large number of the highest peaks of all translation functions taken together. For each of the models translated by the vector t, we calculated its structure factors {F_mod(t)exp(iφ_mod(t)}. For the computed phase sets, we found their optimal alignment over all possible choices of the unit-cell origin u for the given space group (Lunin & Lunina, 1996). This alignment was performed using the correlation

of maps (Lunin & Woolfson, 1993) calculated with the experimental structure-factor magnitudes {F_obs} and generated phases {φ_mod}. The models relevant to the correct solution should reproduce the correct density more or less well and therefore should have close phase sets (the phase sets are close to the same unknown phase set {φ_exact} and thus are close to each other). Similarly to the multiple rotation-function approach, we supposed that this solution gives a persistent signal among a large number of randomly distributed noise peaks. The persistence is measured not by the closeness of the atomic coordinates to each other, but by the map correlation CorrP. The cluster analysis identifies groups of close phase sets and the group for the correct solution is expected to be the largest group (many translation functions contribute to it) and the most compact. The compactness of the cluster may be characterized by its mean figure of merit (FOM). The larger the FOM, the more compact the cluster. When the best cluster has been identified, the resulting phase set is obtained by averaging individual phase sets inside this cluster (see, for example, Lunin et al., 1990, 1995).

We started our tests from the easiest and, in practice, un­realistic case of the 20 NMR models in the best possible orientations (§3.1, test 1). All the highest peaks of the set of translation functions calculated previously were taken together; a set of structure factors was calculated for each of them using the corresponding models. Clustering of the calculated phase sets resulted in the tree shown in Fig. 3(a) with one cluster, marked D, being much more compact (with a low summit) and larger than other clusters (Table 1). Indeed, it corresponds to the correct solution.

Figure 3 Cluster trees for the phase sets obtained after multiple translation-function analysis with the 20 NMR models of CHFI. The selected (correct) cluster is highlighted in the trees in (a)–(c). Letters indicate individual clusters or their groups as referred to in Table 1 and in the text. The translation search was performed with four different groups of model orientations. (a) Models in the best possible orientations. (b) Models in approximate orientations obtained from the multiple rotation-function analysis at 4–10 Å with the clusters selected with cutoff 4.0°. (c) Models in less accurate orientations obtained from the multiple rotation-function analysis at 5–10 Å with the clusters selected with cutoff 6.5°. (d) Models from a wrong orientation cluster. No compact and large cluster can be identified.

The situation was similar when studying the translation functions for the orientations in the cluster of approximate orientations (test 2; rotation functions at 4–10 Å, cutoff 4°). Here, cluster A is a single significant cluster at the level chosen (Fig. 3b). Cluster B is larger than A, but it is formed at a higher level and its components B₁ and B₂ are smaller than A.

The choice of a reasonable cluster is also possible for the more difficult scenario of the set of relatively poor model orientations which was performed in test 3 (rotation functions at 5–10 Å; cluster cutoff 6.5°). Here, the signal is slightly weaker (the cluster is less populated and less compact) but it leaves no ambiguity in the choice of cluster A as the solution (Fig. 3c).

Several remarks can be made. Firstly, in all three cases the average phase set has a correlation to the exact values that is slightly higher than that for any individual phase set of this cluster. This can be compared with the widespread procedure of averaging results of several experimental measurements to obtain a best estimation of some value. Secondly, increasing the cluster size up to some level does not really decrease the phase quality (Table 1). This means that the contributions of a few extra phase sets mutually cancel and that in practical applications there is a certain freedom to choose the cluster. However, when the `height' of the cluster is increased, the mean FOM falls and the confidence in the result decreases.

Map calculation is an extra check for the quality of the choice of the cluster and the corresponding phase set. For example, if in test 2 one chose cluster B by mistake and not cluster A as the solution to the translation problem, its map does not show a `protein-like' image (Fig. 4c), in contrast to the correct case (Fig. 4a). Also, if an incorrect cluster has been chosen at the previous step of the rotation studies, the translation functions should not find a persistent signal and a cluster tree for the translation searches would be more or less uniform, as the test calculations show (Fig. 3d).

Figure 4 (a) 5 Å resolution Fourier map calculated with experimental structure-factor magnitudes and phases from the correct cluster A (test 2; Fig. 3b). Continuous density is seen, especially for the helices. (b) The same map superimposed with the main chain of the correct model. (c) A similar image calculated with the phases from cluster B, an incorrect cluster from the same cluster tree.