[1] V. M. Bondarenko and A. G. Zavadskij, Posets with an equivalence relation of tame type and of finite growth, Can. Math. Soc. Conf. Proc 11 (1991), 67-88.
[2] A. M. Cañadas and A. G. Zavadskij, Categorical description of some differentiation algorithms, J. Algebra Appl. 5(5) (2006), 629-652.
[3] A. M. Cañadas, Morphisms in categories of representations of equipped posets, JP Journal of Algebra, Number Theory and Applications 25(2) (2012), 145-176.
[4] A. M. Cañadas, Categorical properties of the algorithm of differentiation VII for equipped posets, JP Journal of Algebra, Number Theory and Applications 25(2) (2012), 177-213.
[5] P. Gabriel, Représentations indécomposables des ensemblés ordonnés, Semin. P. Dubreil, 26 annee 1972/73, Algebre, Expose 13 (1973), 301-304.
[6] M. M. Kleiner, Partially ordered sets of finite type, Zap. Nauchn. Semin. LOMI 28 (1972), 32-41 (in Russian); English transl., J. Sov. Math. 3(5) (1975), 607-615.
[7] L. A. Nazarova and A. V. Roiter, Representations of partially ordered sets, Zap. Nauchn. Semin. LOMI 28 (1972), 5-31 (in Russian); English transl., J. Sov. Math. 3 (1975), 585-606.
[8] L. A. Nazarova and A. G. Zavadskij, Partially ordered sets of finite growth, Function. Anal. i Prilozhen. 19(2) (1982), 72-73 (in Russian); English transl., Funct. Anal. Appl. 16 (1982), 135-137.
[9] C. Rodríguez Beltrán and A. G. Zavadskij, On corepresentations of equipped posets and their differentiation, Rev. Colombiana Mat. 41 (2007), 117-142.
[10] D. Simson, Linear Representations of Partially Ordered Sets and Vector Space Categories, Gordon and Breach, London, 1992.
[11] A. V. Zabarilo and A. G. Zavadskij, One-parameter equipped posets and their representations, Functional. Anal. i Prilozhen 34(2) (2000), 72-75 (in Russian); English transl., Funct. Anal. Appl. 34(2) (2000), 138-140.
[12] A. G. Zavadskij, Differentiation with respect to a pair of points, Matrix Problems, Collect. Sci. Works. Kiev (1977), 115-121 (in Russian).
[13] A. G. Zavadskij, The Auslander-Reiten quiver for posets of finite growth, Topics in Algebra, Banach Center Publ. 26(1) (1990), 569-587.
[14] A. G. Zavadskij, An algorithm for posets with an equivalence relation, CMS Conf. Proc., 11, Amer. Math. Soc., Providence, RI, 1991, pp. 299-322.
[15] A. G. Zavadskij, Tame equipped posets, Linear Algebra Appl. 365 (2003), 389-465.
[16] A. G. Zavadskij, Equipped posets of finite growth, Representations of Algebras and Related Topics, AMS, Fields Inst. Comm. Ser. 45, 2005.
[17] A. G. Zavadskij, On two point differentiation and its generalization, Algebraic Structures and their Representations, AMS, Contemporary Math. Ser. 376, 2005. |