Finite-time well-posedness, uniqueness, and kernel-stability bounds are proved for diffusion equations with arbitrary finite measure-valued memory, unifying continuous and discrete delay regimes.
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2 Pith papers cite this work. Polarity classification is still indexing.
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math.AP 2years
2026 2representative citing papers
Establishes well-posedness in history space, Lipschitz and weak-star robustness, and compact global attractors with upper semicontinuity for semilinear reaction-diffusion equations with measure-valued delays.
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Well-posedness and kernel stability for diffusion equations with mixed measure-valued memory
Finite-time well-posedness, uniqueness, and kernel-stability bounds are proved for diffusion equations with arbitrary finite measure-valued memory, unifying continuous and discrete delay regimes.
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Kernel-Robust Dynamics for Reaction-Diffusion Equations with Measure-Valued Delay
Establishes well-posedness in history space, Lipschitz and weak-star robustness, and compact global attractors with upper semicontinuity for semilinear reaction-diffusion equations with measure-valued delays.