Yakubovich SB. On the convolution for the Kontorovich-Lebedev transformation and its applications to integral equations. Dokl. Akad. Nauk BSSR. 1987;31:101-103, 188.

Yakubovich SB. Convolution Hilbert spaces associated with the Kontorovich-Lebedev transformation. Thai J. Math.. 2003;1:9-16.

Yakubovich SB, Gusarevich L.. On convolution integral equations associated with the Kontorovich-Lebedev transform. In: Boundary value problems, special functions and fractional calculus (Russian) (Minsk, 1996). Belorus. Gos. Univ., Minsk; 1996. 3. p. 391-400p. Edit

Raina R., Yakubovich SB, Saigo M. On convolution integrals associated with $H$-transforms. J. Fract. Calc.. 1997;11:53-65.Edit

Srivastava H., Yakubovich SB, Luchko Y.. The convolution method for the development of new Leibniz rules involving fractional derivatives and of their integral analogues. Integral Transform. Spec. Funct.. 1993;1:119-134.Edit

[2011-15] Yakubovich SB, Vieira N, Rodrigues M.. A convolution operator related to the generalized Mehler-Fock and Kontorovich-Lebedev transforms .Edit

Rodrigues M., Vieira N, Yakubovich SB. A convolution operator related to the generalized Mehler-Fock and Kontorovich-Lebedev transforms. Results Math.. 2013;63:511-528.Edit

[2008-7] Yakubovich SB, Britvina LE. Convolution operators related to Fourier cosine and Kontorovich-Lebedev Transformations .Edit

Yakubovich SB, Britvina LE. Convolution operators related to the Fourier cosine and Kontorovich-Lebedev transformations. Results Math.. 2009;55:175-197.Edit

[2006-43] Yakubovich SB, Britvina LE. A convolution related to the inverse Kontorovich-Lebedev transform .Edit

Yakubovich SB, Britvina LE. A convolution related to the inverse Kontorovich-Lebedev transform. Sarajevo J. Math.. 2007;3(16):215-232.Edit

Fisher B, Yakubovich SB, Telci M.. Convolutions and neutrix convolution in connection with the incomplete gamma function. Rad. Mat.. 2002;11:37-47.Edit

Yakubovich SB, Hai NT, Buschman R.. Convolutions for $H$-function transformations. Indian J. Pure Appl. Math.. 1992;23:743-752.Edit

Luchko Y., Yakubovich SB. Convolutions of the generalized fractional integration operator. In: Complex analysis and generalized functions (Varna, 1991). Publ. House Bulgar. Acad. Sci., Sofia; 1993. 1. p. 199-211p. Edit

[2009-16] Yakubovich SB, Britvina LE. Convolutions related to the Fourier and Kontorovich-Lebedev transforms revisited .Edit

Yakubovich SB, Britvina LE. Convolutions related to the Fourier and Kontorovich-Lebedev transforms revisited. Integral Transforms Spec. Funct.. 2010;21:259-276.Edit

Garrido-da-Silva L. Core-Periphery Model in Discrete Time - An Analysis. SSRN.2402196. 2014.

Leite V, Castro SB, Correia-da-Silva J.. The core-periphery model with asymmetric inter-regional and intra-regional trade costs . Portuguese Economic Journal. 2009:37-44.Edit

Castro SB, Correia-da-Silva J., Mossay P. The core-periphery model with three regions and more. PAPERS IN REGIONAL SCIENCE. 2012;91(2):401-418.Edit

Rosales J., García-Sánchez PA, Urbano-Blanco J.. Correction to: ``Modular Diophantine inequalities and numerical semigroups'' [Pacific J. Math. \bf 218 (2005), no. 2, 379–398; \refcno 2218353]. Pacific J. Math.. 2005;220:199.Edit

Gouveia S., Rocha AP, Laguna P, Van De Borne P.. Correlation between time domain baroreflex sensitivity and Sympathetic Nerve Activity. In: Murray A, editor. {37th Annual Conference of the Computing-in-Cardiology}. Vol {37}. {IEEE}; 2010. {. {p. 5-8p. }.Edit

[2006-22] Matos J., Gama SM, Ruskin HJ, Sharkasi A, Crane M. Correlation of worldwide markets’ entropies .Edit

[2006-30] Matos J., Gama SM, Ruskin HJ, Sharkasi A, Crane M. Correlation of worldwide markets’ entropies: time-scale approach .Edit

Yakubovich SB. Corrigendum to the note ``The Fourier-Stieltjes transform of Minkowski's $?(x)$ function and an affirmative answer to Salem's problem'' [C. R. Acad. Sci. Paris, Ser. I 349 (11–12) (2011) 633–636] [\refcno 2817381]. C. R. Math. Acad. Sci. Paris. 2012;350:147.

Costa JP, J Da Costa P, Alonso H., Cardoso JS. Corrigendum to "The unimodal model for the classification of ordinal data" [Neural Netw. 21, (2008) 78-79] DOI: 10.1016/j.neunet.2007.10.003. 2014.Edit