About your first question, I was about to recommend Fionn Murtagh's book, Correspondence Analysis and Data Coding with R and Java (CRC Press, 2005), until I realized it only deals with simple CA. (MCA is only discussed in §2.4.5). Anyway, it has been reviewed in the Journal of Statistical Software by Jan de Leeuw himself. The companion website offers example and Java source code, and provides additional information. I'm not sure there exist dedicated Java libraries for MCA, but you can always browse the many R implementations that are available on-line and translate them to Java. I would recommend looking at FactoMineR, ca (by Greenacre, but see this tutorial), or the ade-4 ecosystem of R functions for factor-related data analysis.

About your second question, assuming you are familiar with simple CA, you can view MCA as an extension of CA applied to a dummy-coded matrix of cases by variables. Most commonly, however, we use its Burt's matrix representation, which is simply computed as the inner product of the matrix of dummy variables categories (I should note here that other coding schemes were proposed, such as fuzzy membership, and that analyzing binary variables with MCA is equivalent to using PCA). Here are some concise overview of MCA:

- Abdi, H., & Valentin, D. (2007). Multiple Correspondence Analysis. In N.J. Salkind (Ed.): Encyclopedia of Measurement and Statistics. Thousand Oaks (CA): Sage. pp. 651-657.
- Tenenhaus, M. and Young, F.W. (1985). An analysis and synthesis of Multiple Correspondence Analysis, Optimal Scaling, Dual Scaling, Homogeneity Analysis and other methods for quantifying categorical multivariate data.
*Psychometrika*, *50(1)*, 91-119.

For an extensive discussion of MCA and its application, I warmly recommend reading

Greenacre, M. and Blasius, J.
(editors) (2006). *Multiple
Correspondence Analysis and Related
Methods*. London: Chapman & Hall/CRC.

which summarizes the CARME 2003 conference.