Note on Surjective Polynomial Operators

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Home Editorial board Publication ethics Peer review guidelines Latest issue All issues Rules for authors Online submission system’s guidelines Submit manuscript Contacts Address: Vatutina st. 53, Vladikavkaz, 362025, RNO-A, Russia Phone: (8672)23-00-54 E-mail: rio@smath.ru	Dear authors! Submission of all materials is carried out only electronically through Online Submission System in personal account. DOI: 10.23671/VNC.2018.4.9169 Note on Surjective Polynomial Operators Saburov M. A. Vladikavkaz Mathematical Journal 2017. Vol. 19. Issue 4. Abstract: A linear Markov chain is a discrete time stochastic process whose transitions depend only on the current state of the process. A nonlinear Markov chain is a discrete time stochastic process whose transitions may depend on both the current state and the current distribution of the process. These processes arise naturally in the study of the limit behavior of a large number of weakly interacting Markov processes. The nonlinear Markov processes were introduced by McKean and have been extensively studied in the context of nonlinear Chapman-Kolmogorov equations as well as nonlinear Fokker-Planck equations. The nonlinear Markov chain over a finite state space can be identified by a continuous mapping (a nonlinear Markov operator) defined on a set of all probability distributions (which is a simplex) of the finite state space and by a family of transition matrices depending on occupation probability distributions of states. Particularly, a linear Markov operator is a linear operator associated with a square stochastic matrix. It is well-known that a linear Markov operator is a surjection of the simplex if and only if it is a bijection. The similar problem was open for a nonlinear Markov operator associated with a stochastic hyper-matrix. We solve it in this paper. Namely, we show that a nonlinear Markov operator associated with a stochastic hyper-matrix is a surjection of the simplex if and only if it is a permutation of the Lotka-Volterra operator. Keywords: Stochastic hyper-matrix, polynomial operator, Lotka-Volterra operator Language: English Download the full text For citation: Saburov M. A Note on Surjective Polynomial Operators // Vladikavkazskii matematicheskii zhurnal [Vladikavkaz Math. J.], 2017, vol. 19, no. 1, pp. 70-75. DOI 10.23671/VNC.2018.4.9169 + References 1. Barvinok A. I. Problems of distance geometry and convex properties of quadratic maps. Discrete Comput. Geom. 1995, vol. 13(2), pp. 189-202. DOI 10.1007/BF02574037. 2. Hiriart-Urruty J.-B., Torki M. Permanently going back and forth between the "Quadratic World" and the "Convexity World" in optimization. Appl. Math. Optim. 2002, vol. 45, pp. 169-184. DOI 10.1007/s00245-001-0034-6. 3. Kolokoltsov V. Nonlinear Markov Processes and Kinetic Equations. Cambridge Univ., 2010. DOI 10.1017/CBO9780511760303. 4. Polyak B. T. Convexity of quadratic transformations and its use in Control and Optimization. J. Optim. Theory Appl., 1998, vol. 99, pp. 553-583. DOI 10.1023/A:1021798932766. 5. Saburov M. On the surjectivity of quadratic stochastic operators acting on the simplex. Math. Notes. 2016, vol. 99(4), p. 623-627. DOI 10.1134/S0001434616030391. 6. Saburov M. Ergodicity of nonlinear Markov operators on the finite dimensional space. Nonlinear Anal. Theory Methods. 2016, vol. 143, pp. 105-119. DOI 10.1016/j.na.2016.05.006. 7. Sheriff J. L. The convexity of quadratic maps and the controllability of coupled systems: Doctoral dissertation. Harvard Univ., 2013. 8. Vershik A. M. Quadratic forms positive on a cone and quadratic duality. J. Soviet Math. 1984, vol. 36(1), pp. 39-56. DOI 10.1007/BF01104972. ← Contents of issue


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