Exponential Ergodicity for McKean-Vlasov SDEs with Singular Interactions

Abstract

Let k∈ (d,∞] and consider the k*-distance \|μ-ν\|k*:= \|μ(f)-ν(f)|:\ f∈b(d),\ \|f\| Lk:=x∈ d\|1B(x,1)f\|Lk 1\ between probability measures on d. The exponential ergodicity in 1-Wasserstein and k* distances is derived for a class of McKean-Vlasov SDEs with small singular interactions measured by \|·\|k*. Moreover, the exponential ergodicity in 2-Wasserstein distance and relative entropy is derived when the interaction term is given by b(0)(x,μ) :=∫dh(x-y)μ( y) for some measurable function h:dd with small \|h\| Lk.