Continuity property of pseudodifferential operators from the weak Hardy spaces to the weak Lebesgue space
Abstract
This paper discusses the boundedness of pseudodifferential operator on weak Hardy space and provides a sufficient condition such that the operator is continuous from the weak Hardy space into the weak Lebesgue space.
Funding statement: This research has been supported by the Key Scientic Research Projects of Hunan Education Department (21A0617, 24A0792).
Acknowledgements
The author thanks the referees for their time and comments.
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Articles in the same Issue
- Frontmatter
- Action of higher derivations on prime rings with involution
- On singular integral operators along surfaces
- Power inequalities for weighted numerical radius and norm of operators
- q-Fibonacci statistical convergence
- Some spectral properties of left and right generalized Fredholm operators
- On generating properties of the weak commutativity of p-groups, p odd
- The heat equation for singular Dunkl–Laplacian operator
- When every finitely generated regular ideal is principal
- Continuity property of pseudodifferential operators from the weak Hardy spaces to the weak Lebesgue space
- Fibrations of classifying spaces in the simplicial setting
- New results on exponential stability of time-varying systems using logarithmic norm
- Propagation of waves from finite sources arranged in line segments within an infinite triangular lattice
- Asymptotic behavior of impulsive parabolic problem with infinite-dimensional impulsive set
- 3D quadratic ODE systems with hidden oscillations
- One-sided extended g-Drazin inverses
- Matrix-weighted fractional type operators on spaces of homogeneous type
