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A belief revision approach for argumentation-based negotiation agents

References Alchourrón, C., Gärdenfors, P. and Makinson, D. (1985). On the logic of theory change: Partial meet contraction and revision functions, Journal of Symbolic Logic 50(2): 510-530. Amgoud, L., Dimopoulos, Y. and Moraitis, P. (2007). A unified and general framework for argumentation-based negotiation, 6th International Joint Conference on Autonomous Agents and Multiagent Systems (AAMAS 2007), Honolulu, HI, USA, p. 158. Amgoud, L., Parsons, S. and Maudet, N. (2000). Arguments, dialogue and negotiation, inW

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Oscillation and Periodicity of a Second Order Impulsive Delay Differential Equation with a Piecewise Constant Argument

References [1] M. Akhmet: Nonlinear hybrid continuous/discrete-time models.. Springer Science & Business Media (2011). [2] H. Bereketoglu, G.S. Oztepe: Convergence of the solution of an impulsive differential equation with piecewise constant arguments. Miskolc Math. Notes 14 (2013) 801-815. [3] H. Bereketoglu, G.S. Oztepe: Asymptotic constancy for impulsive differential equations with piecewise constant argument. Bull. Math. Soc. Sci. Math. Roumanie Tome 57 (2014) 181-192. [4] H. Bereketoglu, G

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Integrals of polylogarithmic functions with negative argument

Abstract

The connection between polylogarithmic functions and Euler sums is well known. In this paper we explore the representation and many connections between integrals of products of polylogarithmic functions and Euler sums. We shall consider mainly, polylogarithmic functions with negative arguments, thereby producing new results and extending the work of Freitas. Many examples of integrals of products of polylogarithmic functions in terms of Riemann zeta values and Dirichlet values will be given.

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Against the Argument-Adjunct Distinction in Functional Generative Description

Representation of Grammatical Relations Bresnan (1982a), pages 149-172. Chomsky, Noam. Lectures on Government and Binding. Foris, Dordrecht, 1981. Dalrymple, Mary. Lexical Functional Grammar. Academic Press, San Diego, CA, 2001. Dowty, David. On the Semantic Content of the Notion of ‘Thematic Role’. In Chierchia, Gennero, Barbara H. Partee, and Raymond Turner, editors, Properties, Types and Meaning: II, pages 69-129. Kluwer, Dordrecht, 1989. Dowty, David. Thematic Proto-roles and Argument Selection. Language, 67

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Oscillation Criteria for Third Order Neutral Nonlinear Dynamic Equations with Distributed Deviating Arguments on Time Scales

Abstract

Some new oscillation criteria for third order neutral nonlinear dynamic equations with distributed deviating arguments on time scales are established. The obtained results extend, improve and correlate many known oscillation results for third order dynamic equations

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Properties of certain class of analytic functions with varying arguments defined by Ruscheweyh derivative

References [1] H. S. Al-Amiri,On Ruscheweyh derivatives, Ann. Polon. Math., 38 (1980), 87-94. [2] A. A. Attiya, M. K. Aouf, A study on certain class of analytic functions defined by Ruscheweyh derivative, Soochow J. Math., 33 (2)(2007), 273-289. [3] R. M. El-Ashwah, M. K. Aouf, A. A. Hassan, A. H. Hassan, Certain Class of Analytic Functions Defined by Ruscheweyh Derivative with Varying Arguments, Kyungpook Math. J., 54 (3)(2014), 453-461. [4] St. Ruscheweyh, New criteria for univalent functions

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In favour of the Argument-Adjunct Distinction (from the Perspective of FGD)

-90-272-5598-3. Panevová, Jarmila, Eva Benešová, and Petr Sgall. Čas a modalita v češtině. Univ. Karlova, 1971. Przepiórkowski, Adam. Against the Argument-Adjunct Distinction in Functional Generative Description. The Prague Bulletin of Mathematical Linguistics, 106:5-20, 2016. Sgall, Petr and Eva Hajičová. A “Functional” Generative Description. The Prague Bulletin of Mathematical Linguistics, 14:9-37, 1970. Sgall, Petr, Eva Hajičová, and Jarmila Panevová. The Meaning of the Sentence in Its Semantic and Pragmatic Aspects. Reidel, Dordrecht

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Stability of the solutions of nonlinear third order differential equations with multiple deviating arguments

References [1] T. A. Burton, Stability and periodic solutions of ordinary and functional differential equations , Mathematics in Science and Engineering, 178. Academic Press, Inc., Orlando, FL, 1985. [2] T. A. Burton, Volterra Integral and Differential Equations , Mathematics in Science and Engineering V(202) (2005), 2nd edition. [3] L. É. Él’sgol’ts, Introduction to the theory of differential equations with deviating arguments , Translated from the Russian by Robert J. McLaughlin Holden-Day, Inc., San Francisco, Calif. London-Amsterdam, 1966

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Existence and uniqueness of a periodic solution to certain third order nonlinear delay differential equation with multiple deviating arguments

References [1] A. M. Abou-El-Ela, A. I. Sadek, A. M. Mahmoud, Existence and uniqueness of a periodic solution for third-order delay differential equation with two deviating arguments, IAENG Int. J. Appl. Math., 42 (1), IJMA−42−1−02 2012. [2] A. T. Ademola, P. O. Arawomo, Uniform stability and boundedness of solutions of nonlinear delay differential equations of the third order, Math. J. Okayama Univ. 55 (2013), 157-166. [3] A. T. Ademola, P. O. Arawomo, M. O. Ogunlaran, E. A. Oyekan, Uniform stability

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Conditions for Factorization of Linear Differential-Difference Equations

. L.-LÓPEZ, J. L.: Variation of parameters and solutions of composite products of linear differential equations , J. Math. Anal. Appl. 369 (2010), 658-670. [11] MYSHKIS, A. D.: On certain problems in the theory of differential equations with deviating argument , Uspekhi Mat. Nauk 32 (1977), No. 2, 173-202. (In Russian) [12] RYABOV, YU. A.: Certain asymptotic properties of linear systems with small time delay , Sov. Math. Dokl. 4 (1963), 928-930. [13] VALEEV, K. G.: Splitting of Matrix Spectra . Vishcha Shkola

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