One class of solutions of Volterra equations with regular singularity
Abstract
The Volterra integral equation of the second order with a regular singularity is considered. Under the conditions that a kernel K(x,t) is a real matrix function of order n×n with continuous partial derivatives up to order N+1 inclusively and K(0,0) has complex eigenvalues ν±i μ (ν>0), it is shown that if ν>2|‖K|‖ C -N-1, then a given equation has two linearly independent solutions.
Published
25.03.1997
How to Cite
KreinS. G., and SapronovI. V. “One Class of Solutions of Volterra Equations With Regular Singularity”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 49, no. 3, Mar. 1997, pp. 424–432, https://umj.imath.kiev.ua/index.php/umj/article/view/5015.
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Section
Research articles