[PDF] Top 20 Aperiodic points in $\mathbb Z^2$-subshifts

$Aperiodic points in $\mathbb Z^2$-subshifts$

Aperiodic points in $\mathbb Z^2$-subshifts

... of aperiodic points in Z 2 -SFTs, and in particular the repartition of the coordinates where it avoids to be ...a Z 2 -subshift such that for any finite set of ... Voir le document complet

14

$Effective results for division points on curves in $\mathbb{G}_m^2$$

Effective results for division points on curves in $\mathbb{G}_m^2$

... Effective results for division points on curves in G 2 m Tome 27, n o 2 (2015), p. 405-437. < http://jtnb.cedram.org/item?id=JTNB_2015__27_2_405_0 > © Société Arithmétique de Bordeaux, ... Voir le document complet

34

$About the Decidability of Polyhedral Separability in the Lattice $\mathbb {Z}^d$$

About the Decidability of Polyhedral Separability in the Lattice $\mathbb {Z}^d$

... 24 In the case of aligned points of Z 2 , a triangle solution namely a solution of [Reco(2, P 3 , S)] can be easily ...the points of Z 2 ...given in ... Voir le document complet

18

$On rational torsion points of central $\mathbb{Q}$-curves$

On rational torsion points of central $\mathbb{Q}$-curves

... k. In this article we give an upper bound for prime divisors of the order of the k-rational torsion subgroup E tors (k) (see Theorems ...Theorem 2 of Mazur [12], and it is a precision of the upper bounds of ... Voir le document complet

20

$Rational points on $X_0^+ (N)$ and quadratic $\mathbb {Q}$-curves$

Rational points on $X_0^+ (N)$ and quadratic $\mathbb {Q}$-curves

... is two or more. For these cases there are only finitely many rational points. The following table lists all the composite values of N for which the genus of Xo (N) is between 2 and 5 and for which Momose’s ... Voir le document complet

16

$Density of rational points on cyclic covers of $\mathbb{P}^n$$

Density of rational points on cyclic covers of $\mathbb{P}^n$

... Heath-Brown in [7]. These methods, though elementary, have proved to be powerful in many ...situations. In fact the last result of Broberg for degree two covers of P 2 , is the best known ... Voir le document complet

8

$Parabolic implosion for endomorphisms of $\mathbb C^2$$

Parabolic implosion for endomorphisms of $\mathbb C^2$

... − z 1 − q log(−z), where log is the principal branch of the logarithm and q + 1 is the coefficient of z 3 in the expression of f ...normalization in the ...of points converging ... Voir le document complet

24

$On the Hilbert function of general fat points in $\mathbb{P}^1 \times \mathbb{P}^1$$

On the Hilbert function of general fat points in $\mathbb{P}^1 \times \mathbb{P}^1$

... e Z ,P 2 ) d ≤ dim (I Res r ( e Z ),P 2 ) d −1 + dim (I Tr r ( e Z ),r ) d ...( Z e )) of plane curves with lower degree and the dimension of the ideal of a 0-dimensional scheme ... Voir le document complet

26

$Fatou-Julia dichotomy and non-uniform hyperbolicity for holomorphic endomorphisms on $\mathbb{P}^2(\mathbb{C})$$

Fatou-Julia dichotomy and non-uniform hyperbolicity for holomorphic endomorphisms on $\mathbb{P}^2(\mathbb{C})$

... J 2 = Supp µ. From the definitions we know that J 2 ⊂ J 1 ...J 2 is contained in the closure of the set of repelling periodic ...J 2 . A major problem in holomorphic dynamics is ... Voir le document complet

117

Simulation of Effective Subshifts by Two-dimensional Subshifts of Finite Type

... once in every ...problem in tiling theory is the construction of aperiodic tilings, that are sets of tiles that can only produce aperiodic ...an aperiodic tiling, which codes ... Voir le document complet

25

$Local $L^p$ norms of Schrödinger eigenfunctions on $\mathbb{S}^2$$

Local $L^p$ norms of Schrödinger eigenfunctions on $\mathbb{S}^2$

... Galkowski in a series of work using Gaussian beams [13, 14]. In [14, ...notion in order to give quantitative and at most logarith- mic improvements on the growth of L p -norms near a point x0 when ... Voir le document complet

29

$Gross’ conjecture for extensions ramified over four points of $\mathbb{P}^1$$

Gross’ conjecture for extensions ramified over four points of $\mathbb{P}^1$

... This main theorem is proved in Section 3.1, as a consequence of Theo- rem 3.2 which is a special case and whose proof will be given at the end of this paper. The proof is based on an expressing of the difference ... Voir le document complet

20

$On the maximal number of real embeddings of minimally rigid graphs in $\mathbb{R}^2$, $\mathbb{R}^3$ and $S^2$$

On the maximal number of real embeddings of minimally rigid graphs in $\mathbb{R}^2$, $\mathbb{R}^3$ and $S^2$

... bounds in all ...sampling. In the case of Laman graphs, we faced the problem that homotopy solvers like phcpy are not always able to track all solutions when c d (G) is very big (> 1000 solutions for ... Voir le document complet

25

Realization of aperiodic subshifts and uniform densities in groups

... strongly aperiodic G-effectively closed ...strongly aperiodic subshift then its word problem is ...strongly aperiodic effectively closed subshift. In the remainder of this section we prove ... Voir le document complet

23

$Multidimensional Gauss reduction theory for conjugacy classes of $\mathrm{SL}(n,\mathbb{Z})$$

Multidimensional Gauss reduction theory for conjugacy classes of $\mathrm{SL}(n,\mathbb{Z})$

... Abstract. In this paper we describe the set of conjugacy classes in the group SL(n, ...SL(2, Z) to the multidimensional case, where ς-reduced Hessenberg matrices play the role of reduced ... Voir le document complet

12

$Search via Parallel Lévy Walks on ${\mathbb Z}^2$$

Search via Parallel Lévy Walks on ${\mathbb Z}^2$

... participating in the foraging. In that setting, no universally optimal exponent value exists, as the optimal exponent depends on k and ...variation in the search patterns among individuals of the ... Voir le document complet

47

$Control and Stabilization of the Benjamin-Ono Equation in ${L^2({\mathbb{T})}}$$

Control and Stabilization of the Benjamin-Ono Equation in ${L^2({\mathbb{T})}}$

... made in the equation in (1.11). The results in Theorem A remain valid for the new equation in e ...usual in control theory (see for instance [13, 12, 26, 27, ...v)k 2 X ) and ... Voir le document complet

41

$On a construction of $C^1(\mathbb{Z}_p)$ functionals from $\mathbb{Z}_p$-extensions of algebraic number fields$

On a construction of $C^1(\mathbb{Z}_p)$ functionals from $\mathbb{Z}_p$-extensions of algebraic number fields

... k (n) = Q(ζ dp n+1 ), and let G n = Gal(k (n) /k (0) ). We take a moment to review some classical theory from which this paper draws inspiration. Let θ n ∈ Q[Gal(k (n)/Q)] denote the classical Stickel- berger element ... Voir le document complet

23

$On the maximal unramified pro-2-extension over the cyclotomic $\mathbb{Z}_2$-extension of an imaginary quadratic field$

On the maximal unramified pro-2-extension over the cyclotomic $\mathbb{Z}_2$-extension of an imaginary quadratic field

... field in which the prime number 2 splits. Then the unique Z ⊕2 2 -extension k of k is unramified over k e ∞ , ...' Z 2 . In this case, Greenberg’s generalized ... Voir le document complet

25

$Réalisation de formes $\mathbb {Z}$-bilinéaires symétriques comme formes trace hermitiennes amplifiées$

Réalisation de formes $\mathbb {Z}$-bilinéaires symétriques comme formes trace hermitiennes amplifiées

... ABSTRACT. In this paper, we show by an explicit method that every non degenerate symmetric Z-bilinear form of even rank, which is not Q-isomorphic to the hyperbolic plane, can be realized as a hermitian ... Voir le document complet

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