Linear functional equations on an arbitrary piecewise smooth curve are considered. Such equations are studied in connection with the theory of singular integral equations, which are a mathematical tool in the study of mathematical models of elasticity theory in which the conjugation conditions contain a boundary shift. Such equations also arise in the mathematical modeling of the transfer of charged particles and ionized radiation. The shift function is assumed to act cyclically on a set of simple curves forming a given curve, with only the ends of simple curves being periodic points. The aim of the work is to find the conditions for the existence and cardinality of a set of continuous solutions to such equations in the classes of Helder functions and primitive Lebesgue integrable functions with coefficients and the right side of the equation from the same classes. The solutions obtained have the form of convergent series and can be calculated with any degree of accuracy. The method of operation consists in reducing this equation to an equation of a special type in which all periodic points are fixed, which allows you to use the results for the case of a simple smooth curve.

linear functional equations from one variable; classes of primitive Lebesgue integrable functions, piecewise smooth curves

Litvinchuk G.S. Solvability Theory of Boundary Value Problems and Singular Integral Equations with Shift. Dodrecht, Springer Science, Business Media, 2012. DOI: 10.1007/978-94-011-4363-9

Kravchenko V.G., Litvinchuk G.S. Introduction to the Theory of Singular Integral Operators with Shift. Kluwer Academic Publishers, Dordrecht, Boston, London, 1994. DOI: 10.1007/978-94-011-1180-5

Karlovich Y.I., Kravchenko V.G., Litvinchuk G.S. Noether Theory of Singular Integral Operators with Shift. Soviet Math. (Iz. VUZ), 1983, no. 4, pp. 3-27.

Dilman V.L., Chibrikova L.I. On Solutions of an Integral Equation with a Generalized Logarithmic Kernel in Lp, p>1. Soviet Math. (Iz. VUZ), 1986, no. 4, pp. 26-36.

Dilman V.L. Linear Functional Equations in Helder Classes of Functions on a Simple Smooth Curve. Bulletin of the South Ural State University. Series: Mathematics. Mechanics. Physics, 2020, vol. 12, no. 2, pp. 5-12. DOI: 10.14529/mmph200201

Muskhelishvili N.I. Singular Integral Equations. Moscow, Nauka, 1968.

Dilman V.L., Komissarova D.A. Conditions for the Existence and Uniqueness of Solutions of Linear Functional Equations in Classes of Primitive Lebesgue Functions on a Simple Smooth Curve. Bulletin of the South Ural State University. Series: Mathematics. Mechanics. Physics, 2021, vol. 13, no. 4, pp. 13-23. DOI: 10.14529/mmph210402

Dilman V.L., Komissarova D.A. Linear Functional Equations in Classes of Primitive Lebesgue Functions on Segments of Curves. Chelyabinsk Physical and Mathematical Journal, 2023, vol. 8, iss. 1, pp. 5-17. DOI: 10.47475/2500-0101-2023-18101

Dilman V.L. Properties and Description of Solutions Sets of Linear Functional Equations on a Simple Smooth Curve. Bulletin of the South Ural State University. Series: Mathematics. Mechanics. Physics, 2023,

vol. 15, no. 4, pp. 5-13. DOI: 10.14529/mmph230401

Dilman V.L. Linear Functional Equations With a Cyclic Set of Periodic Points of the Shift Function. Bulletin of the South Ural State University. Series: Mathematics. Mechanics. Physics, 2024, vol. 16, no. 2, pp. 5-11. DOI: 10.14529/mmph240201

Kuczma M. An Introduction to the Theory of Functional Equations and Inequalities, Cauchy's Equation and Jensen's Inequality. Katowice, Panstwowe Wydawnictwo Naukowe, 1985.

Kravchenko V.G. On a Functional Equation with a Shift in the Space

of Continuous Functions. Mathematical Notes, 1977, vol. 22, iss. 2, pp. 660-665.

Pelyuh G.P., Sharkovskiy A.N. Method of Invariants in the Functional Equation Theory. Kiyev, Inst. of Math. NAS, 2013.

Brodskii Y.S. Functional Equations. Kiyev, Visha shkola, 1983.

Ilolov M., Avezov R. On a Class of Linear Functional Equations with Constant Coefficients. Academy of Sciences of the Republic of Tadjikistan, 2019, vol. 177, no. 4, pp. 7-12.

Antonevich A.B. Linear Functional Equations: An Operator Approach. Basel, Boston, Berlin, Birkhauser, 1996.

Likhtarnikov L. An Elementary Introduction to Functional Equations. Saint Petersburg, Lan', 1997.

Cherniavsky V.P. Unambiguity of Solutions when Using a Linear Functional

Equation in the Radiation Protection Model. Global Nuclear Security, 2019, no. 4(33), pp. 18-26.

Kryuk Y.E., Kunets I.E. Mathematical Modeling Methods for Optimizing Radiation Protection. Bulletin of NTUHPI. Series: Computer Science and Modeling, 2011, no. 36, pp. 95-100.