TY - GEN
T1 - Reconstructing data perturbed by random projections when the mixing matrix is known
AU - Sang, Yingpeng
AU - Shen, Hong
AU - Tian, Hui
N1 - Funding Information:
This work is partially supported by Australian Research Council Discovery Project grant #DP0985063.
PY - 2009
Y1 - 2009
N2 - Random Projection (RP) has drawn great interest from the research of privacy-preserving data mining due to its high efficiency and security. It was proposed in [27] where the original data set composed of m attributes, is multiplied with a mixing matrix of dimensions k×m (m;>;k) which is random and orthogonal on expectation, and then the k series of perturbed data are released for mining purposes. To our knowledge little work has been done from the view of the attacker, to reconstruct the original data to get some sensitive information, given the data perturbed by and some priori knowledge, e.g. the mixing matrix, the means and variances of the original data. In the case that the attributes of the original data are mutually independent and sparse, the reconstruction can be treated as a problem of Underdetermined Independent Component Analysis (UICA), but UICA has some permutation and scaling ambiguities. In this paper we propose a reconstruction framework based on UICA and also some techniques to reduce the ambiguities. The cases that the attributes of the original data are correlated and not sparse are also common in data mining. We also propose a reconstruction method for the typical case of Multivariate Gaussian Distribution, based on the method of Maximum A Posterior (MAP). Our experiments show that our reconstructions can achieve high recovery rates, and outperform the reconstructions based on Principle Component Analysis (PCA).
AB - Random Projection (RP) has drawn great interest from the research of privacy-preserving data mining due to its high efficiency and security. It was proposed in [27] where the original data set composed of m attributes, is multiplied with a mixing matrix of dimensions k×m (m;>;k) which is random and orthogonal on expectation, and then the k series of perturbed data are released for mining purposes. To our knowledge little work has been done from the view of the attacker, to reconstruct the original data to get some sensitive information, given the data perturbed by and some priori knowledge, e.g. the mixing matrix, the means and variances of the original data. In the case that the attributes of the original data are mutually independent and sparse, the reconstruction can be treated as a problem of Underdetermined Independent Component Analysis (UICA), but UICA has some permutation and scaling ambiguities. In this paper we propose a reconstruction framework based on UICA and also some techniques to reduce the ambiguities. The cases that the attributes of the original data are correlated and not sparse are also common in data mining. We also propose a reconstruction method for the typical case of Multivariate Gaussian Distribution, based on the method of Maximum A Posterior (MAP). Our experiments show that our reconstructions can achieve high recovery rates, and outperform the reconstructions based on Principle Component Analysis (PCA).
KW - Data Perturbation
KW - Data Reconstruction
KW - Maximum A Posteriori
KW - Principle Component Analysis
KW - Privacy-preserving Data Mining
KW - Underdetermined Independent Component Analysis
UR - http://www.scopus.com/inward/record.url?scp=70349967916&partnerID=8YFLogxK
U2 - 10.1007/978-3-642-04174-7_22
DO - 10.1007/978-3-642-04174-7_22
M3 - Conference contribution
AN - SCOPUS:70349967916
SN - 3642041736
SN - 9783642041730
T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)
SP - 334
EP - 349
BT - Machine Learning and Knowledge Discovery in Databases - European Conference, ECML PKDD 2009, Proceedings
T2 - European Conference on Machine Learning and Knowledge Discovery in Databases, ECML PKDD 2009
Y2 - 7 September 2009 through 11 September 2009
ER -