Self-similar sets in complete metric spaces

We develop a theory for Hausdorff dimension and measure of self-similar sets in complete metric spaces. This theory differs significantly from the well-known one for Euclidean spaces. The open set condition no longer implies equality of Hausdorff and similarity dimension of self-similar sets and that has nonzero Hausdorff measure in this dimension. We investigate the relationship between such properties in the general case.

     

Structure of the Space of Diametrically Complete Sets in a Minkowski Space

We study the structure of the space of diametrically complete sets in a finite dimensional normed space. In contrast to the Euclidean case, this space is in general not convex. We show that its starshapedness is equivalent to the completeness of the parallel bodies of complete sets, a property studied in Moreno and Schneider (Isr. J. Math. 2012, doi:10.1007/s11856-012-0003-6), which is generically not satisfied. The space in question is, however, always contractible. Our main result states that in the case of a polyhedral norm, the space of translation classes of diametrically complete sets of given diameter is a finite polytopal complex. The proof makes use of a diagram technique, due to P. McMullen, for the representation of translation classes of polytopes with given normal vectors. The paper concludes with a study of the extreme diametrically complete sets.     

Minkowski iteration of sets

The Minkowski addition, ⊕, is a natural generalization of vector addition. However, ⊕ and scalar multiplication do not follow all the usual laws of vector space operations. This is reflected upon the properties of a new operation, °, which maps vector sets into vector sets. The study of a linear iterative process (with ° acting recurrently on vector sets) brings out the outstanding value of vector balls and convex hulls for obtaining explicit solutions or bounds.     

Minimal 1-saturating sets and complete caps in binary projective spaces

In binary projective spaces PG(v,2), minimal 1-saturating sets, including sets with inner lines and complete caps, are considered. A number of constructions of the minimal 1-saturating sets are described. They give infinite families of sets with inner lines and complete caps in spaces with increasing dimension. Some constructions produce sets with an interesting symmetrical structure connected with inner lines, polygons, and orbits of stabilizer groups. As an example we note an 11-set in PG(4,2) called “Pentagon with center”. The complete classification of minimal 1-saturating sets in small geometries is obtained by computer and is connected with the constructions described.     

Unit-distance graphs in Minkowski metric spaces

The Unit-Distance Graph problem in Euclidean plane asks for the minimum number of colors, so that each point on the Euclidean plane can be assigned a single color with the condition that the points at unit distance apart are assigned different colors. It is well known that this number is between 4 and 7, but the exact value is not known. Here this problem is generalized to Minkowski metric spaces and once again the answer is shown to be between 4 and 7. In extreme special cases where the unit circle is a parallelogram or a hexagon the answer is shown to be exactly 4.     

The Fermat problem in Minkowski spaces

A weakly neighborly polyhedral map (w.n.p. map) is a 2-dimensional cell-complex which decomposes a closed 2-manifold without a boundary, such that for every two vertices there is a 2-cell containing them. We prove that there are just five distinct w.n.p. maps on the torus, and that only three of them are geometrically realizable as polyhedra with convex faces.     

Minkowski decomposition of convex sets

A setK is decomposable if it can be written as the Minkowski sumA+B where neitherA norB is homothetic toK. In this paper, it is shown that a wide class of convex sets is decomposable including those which contain a sufficiently smooth neighborhood on their boundary.     

Minkowski content for reachable sets

In 1955, Martin Kneser showed that the Minkowski content of a compact p-rectifiable subset M of ${\mathbb {R}^n}$ is equal to its p-Hausdorff measure: $$\lim_{t\to 0, t > 0}\frac{{\mathcal{L}}^n\left(\overline{B}(M,t)\right)}{\alpha(n-p) t^{(n-p)}}={\mathcal{H}}^p(M).$$ We extend his result to the reachable sets of a linear control system $$\dot{x}= f(x) u,$$ and we give an interpretation in terms of a Riemannian distance.     

Minkowski operations and vector spaces

Mathematical morphology started as a set of tools for analysing images by the use of transformations based on set-theoretical operations which are the Minkowski sum and subtraction. It was first developed for the analysis of binary images. Its extension to grey-level images was a later development with the extension of the Minkowski operations to real-valued functions in terms of sup-convolution and inf-convolution. The purpose of this paper is to define a type of convolution between set-valued maps, to study its properties, and to establish some associated differential relations. This set-convolution map allows us to extend the Minkowski sum and substraction to multivalued functions and to functions with vectorial values.     

Quasicrystallographic groups on Minkowski spaces

We generalize the quasicrystallographic groups in the sense of Novikov and Veselov from Euclidean spaces to pseudo-Euclidean and affine spaces. We prove that the quasicrystallographic groups on Minkowski spaces whose rotation groups satisfy an additional assumption are projections of crystallographic groups on pseudo-Euclidean spaces. An example shows that the assumption cannot be dropped. We prove that each quasicrystallographic group is a projection of a crystallographic group on an affine space.     

The mean curvature flow in Minkowski spaces

Studying the geometric flow plays a powerful role in mathematics and physics. In this paper, we introduce the mean curvature flow on Finsler manifolds and give a number of examples of the mean curvature flow. For Minkowski spaces, a special case of Finsler manifolds, we prove the short time existence and uniqueness for solutions of the mean curvature flow and prove that the flow preserves the convexity and mean convexity. We also derive some comparison principles for the mean curvature flow.     

Cohomogeneity one actions on Minkowski spaces

We study isometric cohomogeneity one actions on the \((n+1)\)-dimensional Minkowski space \(\mathbb {L}^{n+1}\) up to orbit-equivalence. We give examples of isometric cohomogeneity one actions on \(\mathbb {L}^{n+1}\) whose orbit spaces are non-Hausdorff. We show that there exist isometric cohomogeneity one actions on \(\mathbb {L}^{n+1}\), \(n \ge 3\), which are orbit-equivalent on the complement of an n-dimensional degenerate subspace \(\mathbb {W}^n\) of \(\mathbb {L}^{n+1}\) and not orbit-equivalent on \(\mathbb {W}^n\). We classify isometric cohomogeneity one actions on \(\mathbb {L}^2\) and \(\mathbb {L}^3\) up to orbit-equivalence.     

Weakly Regular and Regular sets in Minkowski planes

A Regular (respectively Weakly Regular) set for an incidence structure Q is a set of points such that the identity is the only automorphism of Q which maps onto itself (respectively which fixes pointwise). In this work Weakly Regular and Regular sets in Minkowski planes are investigated.Work done within the activity of G.N.S.A.G.A. of C.N.R. and supported by 40 % grants of M.U.R.S.T.G.Rinaldi thanks Fondazione Francesco Severi and Banca Popolare dell'Etruria e del Lazio for the prize which allowed this research.     

Minkowski content and local Minkowski content for a class of self-conformal sets

We investigate (local) Minkowski measurability of ${\mathcal {C}^{1+\alpha}}$ images of self-similar sets. We show that (local) Minkowski measurability of a self-similar set K implies (local) Minkowski measurability of its image F and provide an explicit formula for the (local) Minkowski content of F in this case. A counterexample is presented which shows that the converse is not necessarily true. That is, F can be Minkowski measurable although K is not. However, we obtain that an average version of the (local) Minkowski content of both K and F always exists and also provide an explicit formula for the relation between the (local) average Minkowski contents of K and F.