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This paper is devoted to studying the weak Harnack inequalities for nonlocal double phase functionals by using expansion of positivity, whose prototype is ₑ䂞䂞 (|u (x) -u (y) |ᵖ|x-y|^{n+sp}+a (x, y) |u (x) -u (y) |q|x-y|^{n+tq}) \, dxdy with a0 and 0<s t<1<p q. The core of our approach is to establish several measure theoretical estimates based on the nonlocal Caccioppoli-type inequality, where the challenges consist in controlling subtle interaction between the pointwise behaviour of modulating coefficient and the growth exponents. Meanwhile, a quantitative boundedness result on the minimizer of such functionals is also discussed.
Fang et al. (Thu,) studied this question.