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Landscape Boundaries – Belts or Lines ? Examples from Southern and Northern Poland

fizyczna [Complex physical geography; in Polish], PWN, Warszawa. Widacki W., 1979, Typologia granic geokompleksów w Karpatach [Typology of geocomplexes’ boundaries in Carpathian; in Polish], Zeszyty Naukowe Uniwersytetu Jagiellońskiego, Prace Geograficzne, 47, Kraków.

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Positive solutions for singular nonlocal boundary value problems involving integral conditions with derivative dependence

References [1] R.P. Agarwal and D.O’Regan, Existence theory for single and multiple solutions to singular positone boundary value problems, Jour. Differential Equations, 175(2001), 393-414. [2] R.P. Agarwal and D.O’ Regan, A survey of recent results for initial and boundary value problems singular in the dependent variable, Original Re- search Article Handbook of Differential Equations: Ordinary Differential Equations, 1(2000), 1-68. [3] J.V. Baxley, A singular nonlinear boundary value problem: membrane response

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Effect of a Convective Boundary Condition on Boundary Layer Slip Flow and Heat Transfer Over a Stretching Sheet in View of the Exact Solution

References [1] ALY, E. H., A. EBAID. New Analytical and Numerical Solutions for mixed Convection Boundary-layer Nanofluid Flow along an Inclined Plate Embedded in a Porous Medium. Journal of Applied Mathematics, Volume (2013), Article ID 219486, 7 pages, http://dx.doi.org/10.1155/2013/219486. [2] ADOMIAN, G. Solving Frontier Problems of Physics: The Decomposition Method, Boston, Kluwer. Acad., 1994. [3] EBAID, A. Approximate Analytical Solution of a Nonlinear Boundary Value Problem and its Application in Fluid

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Uniqueness intervals and two–point boundary value problems

References [1] GUSTAFSON, G. B.-RIDENHOUR, J. R.: Lower order branching and conjugate function discontinuity , J. Differential Equations 27 (1978), 167-179. [2] GUSTAFSON, G. B.-RIDENHOUR, J. R.: Uniqueness intervals for multipoint boundary value problems (preprint 2008). [3] HARTMAN, P.: Unrestricted n-parameter families , Rend. Circ. Mat. Palermo (2) 7 (1958), 123-142. [4] HARTMAN, P.: Ordinary Differential Equations, John Wiley and Sons, Inc., New York, 1964

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The Existence of a Generalized Solution of an m-Point Nonlocal Boundary Value Problem

References [1] A. Ashyralyev, O. Gercek: Nonlocal boundary value problem for elliptic-parabolic differential and difference equations. Discrete Dyn. Nat. Soc. (2008) 16p. [2] R. Beals: Nonlocal Elliptic Boundary Value Problems. Bull. Amer. Math. Soc. 70 (5) (1964) 693-696. [3] V. Beridze, D. Devadze, H. Meladze: On one nonlocal boundary value problem for quasilinear differential equations. In: Proceedings of A. Razmadze Mathematical Institute. (2014) 31-39. [4] G. Berikelashvili: Construction

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Study of the Sensitization on the Grain Boundary in Austenitic Stainless Steel Aisi 316

References 1. LAI, J. K. L., SHEK, Ch. H. 2012. Stainless steels: An introduction and their recent developments. Bentham eBooks, 23. 2. V.Y. GERTSMAN, S. M. BRUEMMER. 2001. Study of grain boundary character along intergranular stress corrosion crack paths in austenitic alloys. Acta mater., 49, 1589-1598. ISSN 1359-5803 3. JONES, R., RANDLE, V. 2010. Sensitization behavior of grain boundary engineered austenitic stainless steel. Material Science and Engineering, A 527, 4275 - 4280. ISSN 0921

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On a boundary value problem for differential equation with p-Laplacian

References [1] GAINES, R. E.-MAWHIN, J.: Coincidence Degree and Nonlinear Differential Equations. Lecture Notes in Math., Vol. 568, Springer-Verlag, Berlin, 1977. [2] LIU, Y.: The existence of multiple positive solutions of p-Laplacian boundary value prob- lems, Math. Slovaca 57 (2007), 225-242. [3] RACH°UNKOV´A, I.-STANˇEK, S.-TVRD´Y,M.: Singularities and Laplacians in Bound- ary Value Problems for Nonlinear Ordinary Differential Equations, in: Handbook of dif- ferential equations, Vol. 3, Elsevier

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On the Numerical Solution of the Initial-Boundary Value Problem with Neumann Condition for the Wave Equation by the Use of the Laguerre Transform and Boundary Elements Method

REFERENCES 1. Bamberger A., Ha-Duong T. (1986a), Variational formulation for calculating the diffraction of an acoustic wave by a rigid surface, Math. Methods Appl. Sci., 8(4), 598-608 (in French). 2. Bamberger A., Ha-Duong T. (1986b), Variational space-time formulation for computation of the diffraction of an acoustic wave by the retarded potential (I), Math. Methods Appl. Sci., 8(3), 405-435 (in French). 3. Chapko R., Johansson B. T. (2016), Numerical solution of the Dirichlet initial boundary value problem for the heat equation in

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Parametrization for some boundary value problems of interpolation type

References [1] GOMA, I. A.: Method of successive approximations in a two-point boundary problem with parameter, Ukrainian Math. J. 29 (1977), No. 6, 594-599. [2] GOMA, I. A.: On the theory of the solutions of a boundary value problem with a parameter, Azerba˘ıdˇzan. Gos. Univ. Uˇcen. Zap. Ser. Fiz.-Mat. Nauk 1 (1976), 11-16. [3] HOSABEKOV, O.: Sufficient conditions for the convergence of the Newton-Kantoroviˇc method for a boundary value problem with a parameter, Dokl. Akad. Nauk Tadˇzik. SSR

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Time-Optimal Boundary Control of an Infinite Order Parabolic System with Time Lags

References Choquet, G. (1969). Lectures on Analysis, Vol. 2 , W.A. Benjamin, New York. Dubinskii, J. A. (1975). Sobolev spaces of infinite order and behavior of solution of some boundary value problems with unbounded increase of the order of the equation, Matiematiczeskii Sbornik 98: 163-184, (in Russian). Dubinskii, J. A. (1976). Non-trivality of Sobolev spaces of infinite order for a full Euclidean space and a torus, Matiematiczeskii Sbornik 100: 436-446, (in Russian

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