We focus on some regularity properties of $\omega$-minima of variational integrals with $\varphi$-growth and we provide an upper bound on the Hausdorff dimension of their singular set.
Upper bounds for parabolic equations and the Landau equation
Integral representation for functionals defined on $SBD^p$ in dimension two
The regularity properties and blow-up for convolution wave equations and applications
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