The boundedness and the Fredholm property of integral operators with anisotropically homogeneous kernels of compact type and variable coefficients
From MaRDI portal
Publication:1759294
DOI10.3103/S1066369X12070018zbMath1269.47035OpenAlexW2026512753MaRDI QIDQ1759294
V. M. Deundyak, E. I. Miroshnikova
Publication date: 20 November 2012
Published in: Russian Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3103/s1066369x12070018
Related Items (4)
Two-dimensional homogenous integral operators and singular operators with measurable coefficients in fibers ⋮ Fredholm property of integral operators with homogeneous kernels of compact type in the \(L_2\) space on the Heisenberg group ⋮ Projection method for solving equations for multidimensional operators with anisotropically homogeneous kernels of compact type ⋮ Convolution operators with weakly oscillating coefficients in Hilbert moduli on groups and applications
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- \(C^\ast\)-algebras of singular integral operators in domains with oscillating conical singularities
- On the index of multidimensional integral operators with bihomogeneous kernel and variable coefficients
- Necessary conditions for the boundedness of an operator with nonnegative quasihomogeneous kernel
- On compactness of commutators of multiplications and convolutions, and boundedness of pseudodifferential operators
- Algebra of multidimensional integral operators with homogeneous kernels with varying coefficients
- On the algebra of pair integral operators with homogeneous kernels
- Limit operators and their applications in operator theory
- [Russian Text Ignored.]
This page was built for publication: The boundedness and the Fredholm property of integral operators with anisotropically homogeneous kernels of compact type and variable coefficients
