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• [1] I. Adler, Composition rings, Duke Math. J. 29, 607-623, 1962.
• [2] S. M. Anvariyeh and B. Davvaz, Strongly transitive geometric spaces associated to hypermodules, J. Algebra 332, 1340-1359, 2009.
• [3] J. Chvalina, Commutative hypergroups in the sense of Marty and ordered sets, General Algebra and Ordered Sets, Proc. Int. Conf. Olomouc, 19-30, 1994.
• [4] J. Chvalina, Functional Graphs, Quasi-ordered Sets and Commutative Hypergroups (in Czech), Masaryk University, Brno, 1995.
• [5] J. Chvalina and L. Chvalinová, Transposition hypergroups formed by transformation operators on rings of differentiable functions, Ital. J. Pure Appl. Math. 15, 93-106, 2004.
• [6] J. Chvalina, Š. Hošková–Mayerová and A.D. Nezhad, General actions of hyperstruc- tures and some applications, An. Şt. Univ. Ovidius Constanta, 21 (1), 59-82, 2013.
• [7] A. Connes and C. Consani, The hyperring of adéle classes, J. Number Theory 131 (2), 159-194, 2011.
• [8] P. Corsini, Hyperstructures associated with ordered sets, Bull. Greek Math. Soc. 48, 7-18, 2003.
• [9] P. Corsini and V. Leoreanu, Applications of Hyperstructure Theory, Kluwer Academic Publishers, Dodrecht, 2003.
• [10] I. Cristea and S. Jančić-Rašović, Composition hyperrings, An. Şt. Univ. Ovidius Con- stanţa 21 (2), 81-94, 2013.
• [11] B. Davvaz and V. Leoreanu Fotea, Applications of Hyperring Theory, International Academic Press, Palm Harbor, 2007.
• [12] B. Davvaz, N. Rakhsh-Khorshid and K.P. Shum, Construction of composition (m, n, k)–hyperrings, An. Şt. Univ. Ovidius Constanţa 24 (1), 177-188, 2016.
• [13] B. Davvaz and A. Salasi, A realization of hyperrings, Comm. Algebra 34, 4389-4400, 2006.
• [14] A. Deghan Nezhad and B. Davvaz, An Introduction to the Theory of Hv–Semilattices, Bull. Malays. Math. Sci. Soc. 32 (3), 375-390, 2009.
• [15] S.H. Ghazavi and S.M. Anvariyeh, EL–hyperstructures associated to n-ary relations, Soft Comput. 21 (19), 5841-5850, 2017.
• [16] D. Heidari and B. Davvaz, On ordered hyperstructures, U.P.B. Sci. Bull. Series A, 73 (2), 2011.
• [17] K. Iwasava, On linearly ordered groups, J. Math. Soc. 1 (1), 1-9, 1948.
• [18] S. Jančić-Rašović, About the hyperring of polynomials, Ital. J. Pure Appl. Math. 28, 223-234, 2007.
• [19] M. Krasner, A class of hyperrings and hyperfields, Int. J. Math. Sci. 6 (2), 307-312, 1983.
• [20] M. Krasner, Approximation des corps values complets de characteristique p 6 = 0 par ceux de characteristique 0, Colloque d’Algebre Superieure, CBRM, Bruxelles, 1957.
• [21] Š. Křehlík and M. Novák, From lattices to Hv–matrices, An. Şt. Univ. Ovidius Con- stanţa 24 (3), 209-222, 2016.
• [22] Ch.G. Massouros, On the theory of hyperrings and hyperfields, Algebra i Logika 24 (6), 728-742, 1985.
• [23] G.G. Massouros, The hyperringoid, Multiple Valued Logic 3, 217-234, 1998.
• [24] Ch.G. Massouros and G.G. Massouros, On join hyperrings, Proceedings of the 10th International Congress on Algebraic Hyperstructures and Applications, Brno, Czech Republic, 203-215, 2009.
• [25] Ch.G. Massouros and G. G. Massouros, The transposition axiom in hypercomposi- tional structures, Ratio Mathematica 21, 75-90, 2011.
• [26] S. Mirvakili and B. Davvaz, Applications of the a∗–relation to Krasner hyperrings, J. Algebra 362, 145-156, 2012.
• [27] J.D. Mittas, Sur certaines classes de structures hypercompositionnelles, Proceedings of the Academy of Athens, 48, 298-318, 1973.
• [28] A. Nakasis, Recent results in hyperring and hyperfield theory, Internat. J. of Math. & Math. Sci. 11 (2), 209-220, 1988.
• [29] M. Novák, Some basic properties of EL–hyperstructures, European J. Combin. 34, 446-459, 2013.
• [30] M. Novák, Potential of the “Ends lemma" to create ring-like hyperstructures from quasi-ordered (semi)groups, South Bohemia Mathem. Letters 17 (1), 39-50, 2009.
• [31] M. Novák, On EL–semihypergroups, European J. Combin. 44 Part B, 274-286, 2015.
• [32] S. Spartalis, A class of hyperrings, Riv. Mat. Pura Appl. 4, 55-64, 1989.
• [33] Th. Vougiouklis, On some representations of hypergroups, Annales scientifiques de l’Université de Clermont-Ferrand 2, Série Mathematiques 26, 21-29, 1990.