Publications
On the Weber integral equation and solution to the Weber–Titchmarsh problem. Journal of Mathematical Analysis and Applications. 2018;460(1):400-410.
On the Watson $L_2$-theory for index transforms I. Integral Transforms Spec. Funct.. 2010;21:381-397.
On the Watson $L_2$-theory for index transforms II. Integral Transforms Spec. Funct.. 2010;21:663-673.
[2009-24] On the Watson L2-theory for index transforms .
The word problem for nilpotent inverse monoids. Semigroup Forum. 1995;51:285-293.
A wavelet-based method to measure stock market development. Open Journal of Statistics. 2014;4:86-96.Edit
When the alleged father is a close relative of the real father: The utility of insertion/deletion polymorphisms. Forensic Science International: Genetics Supplement Series. 2011;3.Edit
The word problem for omega-terms over DA. Theoretical Computer Science. 2011;412:6556-6569.
A wavelet-based ECG delineator: Evaluation on standard databases. {IEEE TRANSACTIONS ON BIOMEDICAL ENGINEERING}. 2004;{51}:{570-581}.Edit
Working days on orthogonal polynomials, special functions integral transforms and applications 2007.Edit
When is a smash product semiprime? A partial answer. J. Algebra. 2004;275:339-355.Edit
When weak Hopf algebras are Frobenius. Proc. Amer. Math. Soc.. 2010;138:837-845.Edit
On the weight hierarchy of codes coming from semigroups with two generators. IEEE Trans. Inform. Theory. 2014;60:282-295.Edit
a weighted principal component analysis and its application to gene expression data. ieee-acm transactions on computational biology and bioinformatics. 2011;8:246-252.Edit
A weighted rank measure of correlation. Aust. N. Z. J. Stat.. 2005;47:515-529.Edit
the weighted rank correlation coefficient rw2 in the case of ties. statistics and probability letters. 2015;99:20-26.Edit
A Weighted Principal Component Analysis and Its Application to Gene Expression Data. IEEE-ACM TRANSACTIONS ON COMPUTATIONAL BIOLOGY AND BIOINFORMATICS. 2011.Edit
The weighted rank correlation coefficient in the case of ties. STATISTICS & PROBABILITY LETTERS. 2015.Edit
A working memory model for serial order that stores information in the intrinsic excitability properties of neurons. Journal of Computational Neuroscience. 2013;35:187-199.
A working memory model for serial order that stores information in the intrinsic excitability properties of neurons. Journal of Computational Neuroscience. 2013;35:187-199.