Limiting Behaviors of Besov Seminorms for Dunkl Operators (2503.20809v1)

Abstract: As $s\rightarrow0^+$, we establish limiting formulas of Besov seminorms and nonlocal perimeters associated with the Dunkl operator, a (nonlocal) differential-difference operator parameterized by multiplicity functions and finite reflection groups. Our results are further developments of both the Maz'ya--Shaposhnikova limiting formula for the Gagliardo seminorm and the asymptotic behavior of the (relative) fractional $s$-perimeter. The main contribution is twofold. On the one hand, to establish our dimension-free Maz'ya--Shaposhnikova limiting formula, we develop a simplified approach which do not depend on the density property of the corresponding Besov space and turns out to be quite robust. On the other hand, to derive the limiting formula of our nonlocal perimeter, we do not demand additional regularity on the (topological) boundary of the domain, and to obtain the converse assertion, our assumption on the boundary regularity of the domain, which allows for fractals, is much weaker than those in existing literatures.