On the singular problem involving g-Laplacian
Abstract
In this paper, we show that the existence of a positive weak solution to the equation (-g)s u=f u-q(x)\;in\; , where is a smooth bounded domain in RN, q∈ C1(), and (-g)s is the fractional g-Laplacian with g is the antiderivative of a Young function and f in suitable Orlicz space subjected to zero Dirichlet condition. This includes the mixed fractional (p,q)-Laplacian as a special case. The solution so obtained is also shown to be locally H\"older continuous.
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