|SYMPOSIUM - ORIGINAL RESEARCH
|J Pathol Inform 2013,
A statistical framework for analyzing hypothesized interactions between cells imaged using multispectral microscopy and multiple immunohistochemical markers
Chris J Rose1, Khimara Naidoo2, Vanessa Clay2, Kim Linton3, John A Radford3, Richard J Byers4
1 Centre for Imaging Sciences, Institute for Population Health; The University of Manchester Biomedical Imaging Institute; Manchester Academic Health Science Centre, The University of Manchester, Manchester, United Kingdom
2 Central Manchester University Hospitals NHS Foundation Trust; School of Medicine, Faculty of Medical and Human Sciences, The University of Manchester, Manchester, United Kingdom
3 Manchester Academic Health Science Centre; Institute of Cancer Sciences, Faculty of Medical and Human Sciences, The University of Manchester; The Christie NHS Foundation Trust, Manchester, United Kingdom
4 Manchester Academic Health Science Centre; Central Manchester University Hospitals NHS Foundation Trust; Institute of Cancer Sciences, Faculty of Medical and Human Sciences, The University of Manchester, Manchester, United Kingdom
|Date of Submission||21-Jan-2013|
|Date of Acceptance||21-Jan-2013|
|Date of Web Publication||30-Mar-2013|
Chris J Rose
Centre for Imaging Sciences, Institute for Population Health; The University of Manchester Biomedical Imaging Institute; Manchester Academic Health Science Centre, The University of Manchester, Manchester
Source of Support: None, Conflict of Interest: None
| Abstract|| |
Background: Multispectral microscopy and multiple staining can be used to identify cells with distinct immunohistochemical (IHC) characteristics. We present here a method called hypothesized interaction distribution (HID) analysis for characterizing the statistical distribution of pair-wise spatial relationships between cells with particular IHC characteristics and apply it to clinical data. Materials and Methods: We retrospectively analyzed data from a study of 26 follicular lymphoma patients in which sections were stained for CD20 and YY1. HID analysis, using leave-one-out validation, was used to assign patients to one of two groups. We tested the null hypothesis of no difference in Kaplan-Meier survival curves between the groups. Results: Shannon entropy of HIDs assigned patients to groups that had significantly different survival curves (median survival was 7.70 versus 110 months, P = 0.00750). Hypothesized interactions between pairs of cells positive for both CD20 and YY1 were associated with poor survival. Conclusions: HID analysis provides quantitative inferences about possible interactions between spatially proximal cells with particular IHC characteristics. In follicular lymphoma, HID analysis was able to distinguish between patients with poor versus good survival, and it may have diagnostic and prognostic utility in this and other diseases.
Keywords: Cellular interactions, follicular lymphoma, image analysis, immunohistochemical staining, multispectral microscopy
|How to cite this article:|
Rose CJ, Naidoo K, Clay V, Linton K, Radford JA, Byers RJ. A statistical framework for analyzing hypothesized interactions between cells imaged using multispectral microscopy and multiple immunohistochemical markers. J Pathol Inform 2013;4:4
|How to cite this URL:|
Rose CJ, Naidoo K, Clay V, Linton K, Radford JA, Byers RJ. A statistical framework for analyzing hypothesized interactions between cells imaged using multispectral microscopy and multiple immunohistochemical markers. J Pathol Inform [serial online] 2013 [cited 2020 Aug 4];4:4. Available from: http://www.jpathinformatics.org/text.asp?2013/4/2/4/109856
| Background|| |
Pathologists use microscopic tissue analysis for diagnosis and prognostication of diseases. This is based on visual recognition of particular patterns of distinct cells indicative of specific or general cellular processes. However, it can be difficult or impossible to disambiguate cells in fixed sections using standard illumination methods. In the context of solid tumors, multiple molecular markers-particularly at the protein level using immunohistochemistry-can be imaged using multispectral microscopy.  This is an imaging technique in which a section is imaged multiple times, each time illuminated using a distinct and narrow range of wavelengths. The result is a "cube" of optical density data or, equivalently, a spectrum of optical densities at each pixel location. This data can be processed to identify regions or cells that are positive for particular markers (e.g., via thresholding of optical densities and other techniques). However, even with sophisticated analysis and visualization tools, it is difficult for expert clinicians to interpret images acquired using more than a few markers. Furthermore, while it is believed that cells with particular immunohistochemical (IHC) profiles may interact to varying degrees of patient detriment, there are few quantitative methods available for investigating these hypotheses. The present paper presents such a method and demonstrates the application of it to a study of follicular lymphoma (FL).
| Materials and Methods|| |
Combinatorial Molecular Phenotypes
Given a cube of data from a multiple-stained section imaged using multispectral microscopy, we assumed that it is possible to determine whether each cell in a section is positive (1) or negative (0) for each marker and to obtain cells' spatial (x, y) co-ordinates. This can be achieved, for example, using commercially available software (e.g., Nuance; PerkinElmer Inc., Waltham, MA, USA). Let denote a set of N markers and the positivity of a cell for stain as πs . We adopt the term "combinatorial molecular phenotype (CMP)" from a previous study  that describes the positivity of a cell for all stains in as the binary vector π = (πs1, ..., πsn), where si denotes the ith stain. For example, a possible CMP for an image stained with three markers may be π = (1, 0, 0). No (x,y) co-ordinates will be recorded for cells that are negative for all markers in . Therefore, any of 2N-1 CMPs may be observed. Each possible CMP can be assigned a unique number according to a suitable binary counting scheme. If the right-most element of a CMP represents the least significant binary digit and the next right-most element represents the next least significant digit and so on, then the vectors (0, 1, 0), (1, 0, 0), and (1, 1, 1) can be numbered 2, 4, and 7, respectively. Because this numbering system begins at 1, it is useful for indexing the matrices we introduce later in this paper.
Combinatorial Molecular Phenotype Approximation
Some software can automatically and accurately segment individual cells using full multispectral data. However, less sophisticated software is limited to segmenting regions from particular sub-bands, giving rise to separate sets of region centroid co-ordinates for each stain, some of which may encompass multiple cells (i.e., inaccurate segmentation). However, it is possible to use the region centroid co-ordinates-obtained for each marker independently-to identify regions that are so sufficiently close that they are likely to correspond to the same cell, and, therefore, to approximate CMPs.
First, regions likely to encompass multiple cells are rejected by discarding those that are larger than the maximum area expected for typical cells. Then, co-ordinates from different markers that are within a "pairing distance," d P, are combined into a single co-ordinate to which the appropriate cell CMP is associated. Later in the paper, we have shown how distance d P may be chosen statistically.
Hypothesized Interaction Distributions
We hypothesized that two cells-sufficiently close together and with identical or different CMPs-may interact to varying degrees of patient benefit or detriment. We call this a "hypothesized interaction." By extension, we hypothesize that if a particular hypothesized interaction does indeed act in this way, then many such interactions between pairs of cells will have a larger effect on patient outcome.
We formalize the notion of hypothesized interactions and quantify their occurrence by introducing a commutative arrow operator. A particular hypothesized interaction y can be denoted by . The notation can be understood as follows. Consider all possible pairings of cells within a given section, such that no two paired cells are located further than an "interaction distance," d I, from one another. The arrow notation specifies that a proportion, p, of all pairings, are between a cell with CMP number i and another with j. This notation is convenient because it can be used to form graphs, which may aid visualization. Later in this paper, we explain how an optimal value of d I can be chosen statistically.
The proportion p can also be interpreted as a probability. By calculating p for each possible hypothesized interaction, we can define a statistical distribution over them. Let D be a (2N − 1) × (2N − 1) symmetric matrix, whose (i, j) th element is the probability of observing a cell with CMP number i within a distance d I of a cell with CMP number j. If Y is a random variable that represents a hypothesized interaction, then the statistical distribution of Y can be written as Y ~ D, and we call D a "hypothesized interaction distribution" (HID). [Figure 1] shows an example of HIDs and their graphs.
|Figure 1: Example hypothesized interaction distributions and their corresponding graphs|
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Scalar Summaries of Hypothesized Interaction Distributions
We are interested in testing the hypothesis that cells of particular "types" may interact to varying degrees of patient benefit or detriment. Specifically, we are interested in investigating whether HIDs facilitate the assignment of patients into groups with good versus poor survival. Taking inspiration from grey-level co-occurrence matrix analysis methodology in the texture analysis literature,  [Table 1] defines three scalar summary statistics that can be used to characterize a HID. Note that the indexing used in the summations accounts for the fact that the upper and lower triangles are symmetric and that only one of these triangles is required to specify the HID (i.e., the elements in one of the triangles sum to unity).
Distribution "peakiness" is characterized in different ways by D E and H(D); Dmax characterizes the degree to which the most common hypothesized interaction occurs. Shannon entropy, H(D), measures the expected information (in bits) required to transmit a randomly chosen hypothesized interaction, drawn from the distribution D, over an idealized channel. Hypothesized interactions associated with uniform distributions require more information than those from non-uniform distributions.
Assigning Patients to Groups for Survival Analysis
Given a vector of values of a particular summary statistic (e.g., D max ) for n patients, γ = (γ 1 , …, γn), we can choose an optimal threshold, ,on that statistic that best assigns patients to groups on the basis of survival via the optimization
Here, the ith element of the vector s is the survival time for the ith patient and the function gγΤ returns a vector whose ith element is the group assignment of the ith patient resulting from the application of threshold γT to the ith element of the vector γ. The objective function χ2 computes the value of the χ2 statistic associated with the null hypothesis that the survival curves arising from the group assignments are equal;  high values of χ2 have corresponding low P values.
Selecting Optimal Pairing and Interaction Distances
The distances d I and d P may in principle be selected by the investigator, for example, by drawing upon expert clinical knowledge. However, this approach is subjective and we therefore proposed an objective method. Optimal values can be chosen statistically via the optimization
This is a modification of equation 1, where γ(d I, d P) returns a vector of summary statistics for HIDs computed using distances d I and d P.
Application in Follicular Lymphoma
The aims of this experiment were to demonstrate the application of HID analysis to data from multispectral microscopy of multiple-stained tissue sections from a sample of FL patients and to evaluate the method's ability to identify patient groups that differ in survival.
Twenty six archived human lymph nodes from patients (16 male, 10 female, aged 36-77 years, mean 55 years) with a diagnosis of FL were collected at initial diagnosis, prior to the treatment. Written informed consent and local research ethics committee approval were obtained. The material was routinely processed by fixation in formalin and paraffin embedding. Clinical data and up to 14 years of follow-up and survival data were available for each sample (19 dead, 7 alive; median time to death 32 months; range 2-170 months; 171 months follow-up in all patients alive at the end of the study period). Paraffin-embedded sections from these cases were reviewed by two pathologists.
Duplex quantum dot-based immunofluorescence was used to co-localize YY1 with CD20 using a duplex QD-IF protocol.  Briefly, tissue sections were subjected to antigen retrieval by microwave heating in Tris-EDTA buffer and incubated with YY1 monoclonal primary antibody (Santa Cruz Biotechnology, Santa Cruz, CA, USA) diluted 1:50 (v/v) in 1:10 (v/v) goat serum overnight at 4°C. Secondary detection was performed using a goat anti-mouse secondary antibody diluted 1:250 (v/v) in 1:10 (v/v) goat serum, followed by 655 nm quantum dot solution (Invitrogen, Carlsbad, CA, USA) (1:50 (v/v) in 1:10 (v/v) goat serum). Sections were washed and incubated with Avidin solution followed by incubation with Biotin solution (Vector Laboratories, Burlingame, CA, USA). An anti-CD20 monoclonal primary antibody (Dako, Glostrup, Denmark) diluted 1:50 (v/v) in 1:10 (v/v) goat serum was then applied for 1 hour at room temperature. Secondary detection was performed using the same protocol as for YY1 with the exception of use of a 605 nm quantum dot solution (Invitrogen) diluted 1:50 (v/v) in 1:10 (v/v) goat serum. Finally, sections were rinsed and mounted in polyvinyl mounting medium with DABCO (Sigma-Aldrich, St. Louis, MO, USA) and sealed with clear nail varnish.
Areas positive for YY1 or CD20 expression were identified by spectral imaging using a LeitzDiaplan fluorescence microscope and a Nuance spectral analyzer. Image cubes were collected and subjected to spectral unmixing using Nuance software version 2.4.2 to generate 2D intensity distributions of YY1 and CD20 positivity; up to five images from different portions of each specimen were taken to help ensure that inferred characteristics were representative. Composite images taken of sections double stained for YY1 and CD20 were unmixed using spectra for 605 nm and 655 nm quantum dots and the resultant 2D intensity maps for each of YY1 and CD20 thresholded to generate biologically relevant positive regions of interest; regions of interest were at least 100 pixels in area. Region centroid co-ordinates, region area, maximum intensity, and average intensity were exported to Excel (Microsoft Corporation, Redmond, WA, USA). All images were captured at a total magnification of ×400 with standardized and uniform image illumination and magnification such that all images captured were directly comparable in terms of intensity and scale.
Very large regions-representing incorrect discrimination between distinct cells-were rejected by discarding regions with area greater than 200 pixels. The topology of the χ2 function (equation 2) for each summary statistic was estimated via thin plate spline interpolation  of values of χ2 function computed on a regular 14 × 24 grid of (d I, d P) values. The χ2 function is computationally expensive to compute and tends to have multiple maxima. We therefore selected optimal values of d I and d P for each summary statistic by inspecting contour plots, favoring maxima near (d I, d P) = (0, 0). Approximate CMPs, HIDs, and their summary statistics were constructed for each image. Each patient was represented by the median of each summary statistic, taken over all images acquired for the patient. Finally, Kaplan-Meier survival curves were estimated using leave-one-out validation: at the ith iteration, the ith patient was left out of the analysis and an optimal threshold for each summary statistic calculated for the left-in patients (equation 1); this threshold was used to allocate the left-out patient to one of two groups. Software was implemented in R version 2.13.0. 
| Results|| |
[Figure 2] shows the topology of the objective function (equation 2) for H(D) under the constraint that d P < d I (as we must pair regions before considering that paired regions may interact). [Table 2] shows the results of the leave-one-out survival analyses and the used. There was a statistically significant difference between the survival curves defined by the summary statistic H(D), but not for Dmax and D E; the P value for H(D) would survive Bonferroni correction for multiple comparisons at the α = 0.05 significance level. Kaplan-Meier survival curves for H(D)-estimated via leave-one-out validation-are shown in [Figure 3]. Median survival for the two groups is approximately 7.70 and 110 months. Low H(D) ("peaky" distributions) were associated with poor survival and these peaks were often observed for hypothesized interactions between cells that were positive for both YY1 and CD20. [Figure 1] shows example HIDs and their graphs for patients with poor (D1 ) versus good (D2 ) survival.
|Figure 2: Contour plot showing the value of the χ2 test statistic as a function of pairing distance d P and interaction distance d I for the summary statistic Dmax|
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|Figure 3: Survival curves— estimated using leave-one-out validation— for groups defined by thresholding H(D). The curves are statistically significantly different ( P = 0.00750)|
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|Table 2: Leave-one-out analysis results. Optimal values of dI and dP, and the resulting P values. The statistically significant (P < 0.05) result for H (D) would survive Bonferroni correction|
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| Conclusions|| |
We have developed a statistical framework to represent potential interactions between proximal cells. The method defines a statistical distribution over "hypothesized interactions"-a pairing of cells with particular combinations of IHC characteristics, located within a given distance of one another. These distributions can be represented in matrix and graphical forms. Relatively simple scalar summaries of these distributions can be used to assign patients to groups that may differ in terms of survival, and the distributions themselves can be inspected to identify possible cellular interactions that are associated with short versus long survival.
HID analysis of retrospective data from a study of FL showed that Shannon entropy, H(D), was able to assign patients to groups with significantly different survival curves. Our results suggest that cells that are positive for both YY1 and CD20 may interact to patient detriment. This result is consistent with our understanding of the biology of these cells, but existing analysis tools do not allow testing of this hypothesis.
One limitation of this work is the visual (albeit quantitative and objective) selection of distances d P and d I prior to, and outside of, the leave-one-out analysis. Unfortunately, the high computational cost of evaluating the χ2 function-and the fact that the function tends to have multiple maxima-made automated selection infeasible within the scope of this work. Future research should address this problem.
In conclusion, HID analysis provides a largely automated quantitative method for making inferences about possible interactions between proximal cells-in terms of their IHC characteristics as measured using multispectral microscopy and multiple IHC markers-with potential value for diagnosis and prognosis.
| References|| |
|1.||Byers RJ, Hitchman ER. Quantum dots brighten biological imaging. Prog Histochem Cytochem 2011;45:201-37. |
|2.||Schubert W. A three-symbol code for organized proteomes based on cyclical imaging of protein locations. Cytometry A 2007;71:352-60. |
|3.||Haralick RM, Shanmugam K, Dinstein I. Textural features for image classification. IEEE Trans Syst Man Cybern 1973;3:610-21. |
|4.||Harrington DP, Fleming TR. A class of rank test procedures for censored survival data. Biometrika 1982;69:553-66. |
|5.||Naidoo K, Clay V, Hoyland JA, Swindell R, Linton K, Illidge T, et al. YY1 expression predicts favourable outcome in follicular lymphoma. J Clin Pathol 2011;64:125-9. |
|6.||Duchon J. Splines minimizing rotation-invariant semi-norms in Sobolev spaces. In: Schempp W, Zeller K, editors. Constructive Theory of Functions of Several Variables. Vol. 571. Heidelberg: Springer; 1977. p. 85-100. |
|7.||R Development Core Team. 2012. R: A Language and Environment for Statistical Computing. R Foundation for Statistical Computing, Vienna, Austria. Available from: http://www.R-project.org. [Last accessed on 2013 Jan 21]. |
[Figure 1], [Figure 2], [Figure 3]
[Table 1], [Table 2]