Zeros of solutions of functional equations in the space of discontinuous functions of two variables |
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| Authors: | Alexander Domoshnitsky |
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| Affiliation: | Department of Mathematics and Computer Sciences, The College of Judea and Samaria, Ariel 44837, Israel |
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| Abstract: | In this paper distribution of zeros of solutions of functional equations in the space of functions of two variables is studied. A zero of a solution in the space of noncontinuous functions is defined. It is demonstrated that oscillatory properties of functional equations are determined by the spectral radius of a corresponding operator acting in the space of essentially bounded functions. Zones of solution positivity are estimated. Various exact oscillation and non-oscillation tests are proposed. A necessary and sufficient condition of oscillation is obtained. |
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| Keywords: | Zeros of solution Oscillation and nonoscillation Zones of positivity Difference equations |
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