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In this work, we study the structure of multivariable modular codes over finite chain rings when the ambient space is a principal ideal ring. We also provide some applications to additive modular codes over the finite field F4.  相似文献   

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We study the Hénon–Lane–Emden conjecture, which states that there is no non-trivial non-negative solution for the Hénon–Lane–Emden elliptic system whenever the pair of exponents is subcritical. By scale invariance of the solutions and Sobolev embedding on SN?1, we prove this conjecture is true for space dimension N=3; which also implies the single elliptic equation has no positive classical solutions in R3 when the exponent lies below the Hardy–Sobolev exponent, this covers the conjecture of Phan–Souplet [22] for R3.  相似文献   

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For a martingale M starting at x with final variance σ2, and an interval (a,b), let Δ=b?aσ be the normalized length of the interval and let δ=|x?a|σ be the normalized distance from the initial point to the lower endpoint of the interval. The expected number of upcrossings of (a,b) by M is at most 1+δ2?δ2Δ if Δ21+δ2 and at most 11+(Δ+δ)2 otherwise. Both bounds are sharp, attained by Standard Brownian Motion stopped at appropriate stopping times. Both bounds also attain the Doob upper bound on the expected number of upcrossings of (a,b) for submartingales with the corresponding final distribution. Each of these two bounds is at most σ2(b?a), with equality in the first bound for δ=0. The upper bound σ2 on the length covered by M during upcrossings of an interval restricts the possible variability of a martingale in terms of its final variance. This is in the same spirit as the Dubins & Schwarz sharp upper bound σ on the expected maximum of M above x, the Dubins & Schwarz sharp upper bound σ2 on the expected maximal distance of M from x, and the Dubins, Gilat & Meilijson sharp upper bound σ3 on the expected diameter of M.  相似文献   

5.
We generalize results concerning C0-semigroups on Banach lattices to a setting of ordered Banach spaces. We prove that the generator of a disjointness preserving C0-semigroup is local. Some basic properties of local operators are also given. We investigate cases where local operators generate local C0-semigroups, by using Taylor series or Yosida approximations. As norms we consider regular norms and show that bands are closed with respect to such norms. Our proofs rely on the theory of embedding pre-Riesz spaces in vector lattices and on corresponding extensions of regular norms.  相似文献   

6.
We study solutions of the focusing energy-critical nonlinear heat equation ut=Δu?|u|2u in R4. We show that solutions emanating from initial data with energy and H˙1-norm below those of the stationary solution W are global and decay to zero, via the “concentration-compactness plus rigidity” strategy of Kenig–Merle [33], [34]. First, global such solutions are shown to dissipate to zero, using a refinement of the small data theory and the L2-dissipation relation. Finite-time blow-up is then ruled out using the backwards-uniqueness of Escauriaza–Seregin–Sverak [17], [18] in an argument similar to that of Kenig–Koch [32] for the Navier–Stokes equations.  相似文献   

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The purpose of this note is to show a new series of examples of homogeneous ideals I in K[x,y,z,w] for which the containment I(3)?I2 fails. These ideals are supported on certain arrangements of lines in P3, which resemble Fermat configurations of points in P2, see [14]. All examples exhibiting the failure of the containment I(3)?I2 constructed so far have been supported on points or cones over configurations of points. Apart from providing new counterexamples, these ideals seem quite interesting on their own.  相似文献   

10.
The complexity of a module is the rate of growth of the minimal projective resolution of the module while the z-complexity is the rate of growth of the number of indecomposable summands at each step in the resolution. Let g=osp(k|2) (k>2) be the type II orthosymplectic Lie superalgebra of types B or D. In this paper, we compute the complexity and the z-complexity of the simple finite-dimensional g-supermodules. We then give these complexities certain geometric interpretations using support and associated varieties.  相似文献   

11.
Let q be a prime power and n be a positive integer. A subspace partition of V=Fqn, the vector space of dimension n over Fq, is a collection Π of subspaces of V such that each nonzero vector of V is contained in exactly one subspace in Π; the multiset of dimensions of subspaces in Π is then called a Gaussian partition of V. We say that Πcontains a direct sum if there exist subspaces W1,,WkΠ such that W1?Wk=V. In this paper, we study the problem of classifying the subspace partitions that contain a direct sum. In particular, given integers a1 and a2 with n>a1>a21, our main theorem shows that if Π is a subspace partition of Fqn with mi subspaces of dimension ai for i=1,2, then Π contains a direct sum when a1x1+a2x2=n has a solution (x1,x2) for some integers x1,x20 and m2 belongs to the union I of two natural intervals. The lower bound of I captures all subspace partitions with dimensions in {a1,a2} that are currently known to exist. Moreover, we show the existence of infinite classes of subspace partitions without a direct sum when m2?I or when the condition on the existence of a nonnegative integral solution (x1,x2) is not satisfied. We further conjecture that this theorem can be extended to any number of distinct dimensions, where the number of subspaces in each dimension has appropriate bounds. These results offer further evidence of the natural combinatorial relationship between Gaussian and integer partitions (when q1) as well as subspace and set partitions.  相似文献   

12.
The graph grabbing game is a two-player game on weighted connected graphs where all weights are non-negative. Two players, Alice and Bob, alternately remove a non-cut vertex from the graph (i.e., the resulting graph is still connected) and get the weight assigned to the vertex, where the starting player is Alice. Each player’s aim is to maximize his/her outcome when all vertices have been taken, and Alice wins the game if she gathered at least half of the total weight. Seacrest and Seacrest (2017) proved that Alice has a winning strategy for every weighted tree with even order, and conjectured that the same statement holds for every weighted connected bipartite graph with even order. In this paper, we prove that Alice wins the game on a type of a connected bipartite graph with even order called a Km,n-tree.  相似文献   

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We show that if k is an infinite field, then there exists a subspace W?kN of dimension |k|?0, such that no nonzero member of W has infinitely many zeros. This generalizes a result from a paper by Bergman and Nahlus, and partly answers another question from the same paper.  相似文献   

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We investigate the occurrence of Shimura (special) subvarieties in the locus of Jacobians of abelian Galois covers of P1 in Ag and give classifications of families of such covers that give rise to Shimura subvarieties in the Torelli locus Tg inside Ag. Our methods are based on Moonen–Oort works as well as characteristic p techniques of Dwork and Ogus and Monodromy computations.  相似文献   

16.
The quasineutral limit of the two-fluid Euler–Poisson system (one for ions and another for electrons) in a bounded domain of R3 is rigorously proved by investigating the existence and the stability of boundary layers. The non-penetration boundary condition for velocities and Dirichlet boundary condition for electric potential are considered.  相似文献   

17.
We provide a cohomological interpretation of the zeroth stable A1-homotopy group of a smooth curve over an infinite perfect field. We show that this group is isomorphic to the first Nisnevich (or Zariski) cohomology group of a certain sheaf closely related to the first Milnor–Witt K-theory sheaf. This cohomology group can be computed using an explicit Gersten-type complex. We show that if the base field is algebraically closed then the zeroth stable A1-homotopy group of a smooth curve coincides with the zeroth Suslin homology group that was identified by Suslin and Voevodsky with a relative Picard group. As a consequence we reobtain a version of Suslin's rigidity theorem.  相似文献   

18.
We consider random walks in dynamic random environments given by Markovian dynamics on Zd. We assume that the environment has a stationary distribution μ and satisfies the Poincaré inequality w.r.t. μ. The random walk is a perturbation of another random walk (called “unperturbed”). We assume that also the environment viewed from the unperturbed random walk has stationary distribution μ. Both perturbed and unperturbed random walks can depend heavily on the environment and are not assumed to be finite-range. We derive a law of large numbers, an averaged invariance principle for the position of the walker and a series expansion for the asymptotic speed. We also provide a condition for non-degeneracy of the diffusion, and describe in some details equilibrium and convergence properties of the environment seen by the walker. All these results are based on a more general perturbative analysis of operators that we derive in the context of L2- bounded perturbations of Markov processes by means of the so-called Dyson–Phillips expansion.  相似文献   

19.
Some cases of the LFED Conjecture, proposed by the second author [15], for certain integral domains are proved. In particular, the LFED Conjecture is completely established for the field of fractions k(x) of the polynomial algebra k[x], the formal power series algebra k[[x]] and the Laurent formal power series algebra k[[x]][x?1], where x=(x1,x2,,xn) denotes n commutative free variables and k a field of characteristic zero. Furthermore, the relation between the LFED Conjecture and the Duistermaat–van der Kallen Theorem [3] is also discussed and emphasized.  相似文献   

20.
Consider a branching random walk, where the underlying branching mechanism is governed by a Galton–Watson process and the migration of particles by a simple random walk in Zd. Denote by Zn(z) the number of particles of generation n located at site zZd. We give the second order asymptotic expansion for Zn(z). The higher order expansion can be derived by using our method here. As a by-product, we give the second order expansion for a simple random walk on Zd, which is used in the proof of the main theorem and is of independent interest.  相似文献   

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