On sums of projections SA Kruglyak, VI Rabanovich, YS Samoilenko Functional Analysis and Its Applications 36 (3), 182-195, 2002 | 128* | 2002 |
Every matrix is a linear combination of three idempotents V Rabanovich Linear algebra and its applications 390, 137-143, 2004 | 33 | 2004 |
When a Sum of Idempotents or Projections is a Multiple of the Identity VI Rabanovich, YS Samoilenko Functional analysis and its applications 34 (4), 311-313, 2000 | 32* | 2000 |
Decomposition of a scalar matrix into a sum of orthogonal projections S Kruglyak, V Rabanovich, Y Samoı̆lenko Linear algebra and its applications 370, 217-225, 2003 | 28 | 2003 |
When is a sum of partial reflections equal to a scalar operator? AS Mellit, VI Rabanovich, YS Samoilenko Functional Analysis and Its Applications 38, 157-160, 2004 | 17* | 2004 |
Scalar operators representable as a sum of projectors VI Rabanovich, YS Samoilenko Ukrainian Mathematical Journal 53 (07), 939-952, 2001 | 17* | 2001 |
On a Class of Unitary Representations of the Braid Groups B3 and B4 S Albeverio, S Rabanovich SFB 611 327, 1-11, 2007 | 16* | 2007 |
On identities in algebras Q n, λ generated by idempotents VI Rabanovich, YS Samoilenko, AV Strelets Ukrainian Mathematical Journal 53 (10), 1673-1687, 2001 | 12* | 2001 |
Samoilenko Yu. S SV Rabanovich Representations of Fn-algebras and applications//Meth. Funct. Anal. and Top …, 2000 | 10* | 2000 |
Decomposition of a scalar operator into a product of unitary operators with two points in spectrum S Albeverio, S Rabanovich Linear algebra and its applications 433 (6), 1127-1137, 2010 | 8 | 2010 |
On the decomposition of the identity into a sum of idempotents T Ehrhardt, V Rabanovich, Y Samoǐlenko, B Silbermann Methods of Functional Analysis and Topology 7 (02), 1-6, 2001 | 7 | 2001 |
On the decomposition of an operator into a sum of four idempotents VI Rabanovych Ukrainian Mathematical Journal 56 (3), 512-519, 2004 | 6 | 2004 |
Every bounded self-ajoint operator is a real linear combination of orthoprojections V Rabanovich arXiv preprint arXiv:1608.04445, 2016 | 5 | 2016 |
On the identities in algebras generated by linearly connected idempotents VI Rabanovich, YS Samoilenko, AV Strelets Ukrainian Mathematical Journal 56, 929-946, 2004 | 5 | 2004 |
On the decomposition of a diagonal operator into a linear combination of idempotents or projectors VI Rabanovych Ukrainian Mathematical Journal 57 (3), 466-473, 2005 | 4 | 2005 |
Matrix Banach Algebras and Representation Theory VI Rabanovich Ph. D. thesis, Kiev, 2000 | 4* | 2000 |
On Representations of F n-Algebras and Invertibility Symbols S Rabanovich, Y Samoĭlenko Operator Theory and Related Topics, OT Adv. and Appl. 118, 347-357, 2000 | 4 | 2000 |
On the spectra of sums and the norms of products of orthogonal projections VI Rabanovich Book of Abstracts of 17-th International Conference on Domain Decomposition …, 2006 | 3 | 2006 |
Banach algebras generated by three idempotents VI Rabanovitch Methods of Functional Analysis and Topology 4 (01), 65-67, 1998 | 3 | 1998 |
Each n-by-n matrix with n> 1 is a sum of 5 coninvolutory matrices MNM Abara, DI Merino, VI Rabanovich, VV Sergeichuk, JPS Maria Linear Algebra and its Applications 508, 246-254, 2016 | 1 | 2016 |