We establish the existence of large positive radial solutions for the elliptic system
\[ łeft\{ begin{c} -Δ u=λ f (v)\enspace text\enspace B , -Δ v=λ g (u)\enspace text\enspace B , u=v=0\enspace text\enspace i B , end i.
\]
when the parameter $\lambda >0$ is small, where $B$ is the open unit ball $ \mathbb{R}^{N},N>2, f,g:(0,\infty )\rightarrow \mathbb{R}$ are possibly singular at 0 and $f (u)\sim u^{p},g (v)\sim v^{q}$ at $\infty $ for some $ p,q>0$ with $pq>1.\ $Our approach is based on fixed point theory in a cone.
We classify irreducible polar foliations of codimension $q$ on quaternionic projective spaces $\mathbb{H}P^n$, for all $(n,q)\neq (7,1)$. We prove that all irreducible polar foliations of any codimension (resp. of codimension one) on $\mathbb{H}P^n$ are homogeneous if and only if $n+1$ is a prime number (resp. $n$ is even or $n=1$). This shows the existence of inhomogeneous examples of codimension one and higher.
The aim of this article is to give a new proof of Cohen-Gabber theorem in the equal characteristic $p>0$ case.
We estimate the order of isometry groups of compact Riemannian manifolds which have negative Ricci curvature except for small portions, in terms of geometric quantities.
Let $S$ be a surface isogenous to a product of curves of unmixed type. After presenting several results useful to study the cohomology of $S$ we prove a structure theorem for the cohomology of regular surfaces isogenous to a product of unmixed type with $\chi (\mathcal{O}_S)=2$. In particular we found two families of surfaces of general type with maximal Picard number.
We prove that various notions of supersolutions to the porous medium equation are equivalent under suitable conditions. More spesifically, we consider weak supersolutions, very weak supersolutions, and $m$-superporous functions defined via a comparison principle. The proofs are based on comparison principles and a Schwarz type alternating method, which are also interesting in their own right. Along the way, we show that Perron solutions with merely continuous boundary values are continuous up to the parabolic boundary of a sufficiently smooth space-time cylinder.
We study double line structures in projective spaces and quadric hypersurfaces, and investigate the geometry of irreducible components of Hilbert scheme of curves and moduli of stable sheaves of pure dimension 1 on a smooth quadric threefold.
We explicitly determine tori that have a parallel mean curvature vector, both in the complex projective plane and the complex hyperbolic plane.