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• [1] Albeverio S, Ayupov SA, Kudaybergenov KK. Non-commutative Arens algebras and their derivations. J Funct Anal 2007; 253: 287–302.
• [2] ChilinVI,GanievIG.AnindividualergodictheoremforcontractionsintheBanach–Kantorovichlattice Lp(∇,µ). Russian Math 2000; 44: 77–79.
• [3] Foguel SR. On the “zero-two” law. Israel J Math.1971; 10: 275–280.
• [4] Ganiev IG. Measurable bundles of Banach lattices. Uzbek Math Zh 1998; 5: 14–21 (in Russian).
• [5] Ganiev IG. The martingales convergence in the Banach–Kantorovich’s lattices Lp(? ∇,? µ). Uzbek Math J 2000; 1: 18–26.
• [6] Ganiev IG. Abstract characterization of non-commutative Lp-spaces constructed by center valued trace. Dokl Akad Nauk Rep Uzb 2000; 7: 6–8.
• [7] Ganiev IG. Measurable bundles of lattices and their applications. In: Studies on Functional Analysis and Its Application. Moscow, Russia: Nauka, 2006, pp. 9–49. (Russian).
• [8] Ganiev IG, Chilin VI. Measurable bundles of noncommutative Lp-spaces associated with a center-valued trace. Siberian Adv Math 2002; 12: 19–33.
• [9] Ganiev IG, Kudaybergenov KK. The Banach–Steinhaus uniform boundedness principle for operators in Banach– Kantorovich spaces over L0. Siberian Adv Math 2006; 16: 42–53.
• [10] Ganiev IG, Mukhamedov F. On the “Zero-Two” law for positive contractions in the Banach–Kantorovich lattice Lp(∇,µ). Comment Math Univ Carolinae 2006; 47: 427–436.
• [11] Ganiev I,Mukhamedov F.On weighted ergodic theorems for Banach–Kantorovich lattice Lp(∇,µ).Lobachevskii J Math 2013; 34: 1–10.
• [12] Ganiev I, Mukhamedov F. Measurable bundles of C∗-dynamical systems and its applications. Positivity 2014; 18: 687–702.
• [13] Gierz G. Bundles of Topological Vector Spaces and Their Duality. Berlin, Germany: Springer, 1982.
• [14] Gutman AE. Banach bundles in the theory of lattice-normed spaces, III. Siberian Adv Math 1993; 3: 8–40.
• [15] Gutman AE. Banach fiberings in the theory of lattice-normed spaces. Order-compatible linear operators. Trudy Inst Mat 1995; 29: 63–211 (in Russian).
• [16] Katznelson Y, Tzafriri L. On power bounded operators. J Funct Anal 1986; 68: 313–328.
• [17] Kusraev AG. Vector Duality and Its Applications. Novosibirsk, Russia: Nauka, 1985 (in Russian).
• [18] Kusraev AG. Dominanted Operators. Dordrecht, the Netherlands: Kluwer Academic Publishers, 2000.
• [19] Lee Y, Lin Y,Wahba G. Multicategory support vector machines: theory and application to the J Am Stat Assoc 2004; 99: 67–81.
• [20] Mukhamedov F.On dominant contractions and a generalization of the zero-two law.Positivity 2011; 15: 497–508.
• [21] Mukhamedov F, Temir S, Akın H. A note on dominant contractions of Jordan algebras. Turk J Math 2010; 34: 85–93.
• [22] Ornstein D, Sucheston L. An operator theorem on L1 convergence to zero with applications to Markov kernels. Ann Math Stat 1970; 41: 1631–1639.
• [23] von Neumann, J. On rings of operators III. Ann Math 1940; 41: 94–161.
• [24] Vulih BZ. Introduction to Theory of Partially Ordered Spaces. Groningen, the Netherlands: Noordhoff, 1967.
• [25] Wittman R. Ein starkes “Null-Zwei Gesetz in Lp. Math Z 1988; 197: 223229 (in German).
• [26] Woyczynski WA. Geometry and martingales in Banach spaces. Lect Notes Math 1975; 472: 235–283.
• [27] Zaharopol R. The modulus of a regular linear operators and the “zero-two” law in Lp-spaces (1 _____ p _____ ∞, p ̸= 2). J Funct Anal 1986; 68: 300–312.