Let ? be a binary relation on A×X, and suppose that there are real valued functions f on A and g on X such that, for all ax, by ∈ A×X, ax ? by if and only if f (a)+g(x) ? f(b)+g(y). This paper establishes uniqueness properties for f and g when A is a finite set, X is a real interval with g increasing on X, and for any a, b and x there is a y for which f(a)+g(x)=f(b)+g(y). The resultant uniqueness properties occupy an intermediate position among uniqueness properties for other structural cases of two-factor additive measurement.It is shown that f is unique up to a positive affine transformation (αf+β1 with α > 0), but that g is unique up to a similar positive affine transformation (αg+β2) if and only if the ratio [f(a)?f(b)]/[f(a)?f(c)] is irrational for some a, b, c ∈ A. When the f ratios are rational for all cases where they are defined, there will be a half-open interval (x0, x1) in X such that the restriction of g on (x0, x1) can be any increasing function for which sup {g(x)?g(x0): x0 ? x < x1} does not exceed a specified bound, and, when g is thus defines on (x0, x1), it will be uniquely determined on the rest of X. In general, g must be continuous only in the ‘irrational’ case. 相似文献
A Hilbert bundle (p, B, X) is a type of fibre space p: B → X such that each fibre p?1(x) is a Hilbert space. However, p?1(x) may vary in dimension as x varies in X, even when X is connected. We give two “homotopy” type classification theorems for Hilbert bundles having primarily finite dimensional fibres. An (m, n)-bundle over the pair (X, A) is a Hilbert bundle over (p, B, X) such that the dimension of p?1(x) is m for x in A and n otherwise. As a special case, we show that if X is a compact metric space, C+X the upper cone of the suspension SX, then the isomorphism classes of (m, n)-bundles over (SX, C+X) are in one-to-one correspondence with the members of [X, Vm(n)] where Vm(n) is the Stiefel manifold. The results are all applicable to the classification of separable, continuous trace C1-algebras, with specific results given to illustrate. 相似文献
Let A be a non-empty set and m be a positive integer. Let ≡ be the equivalence relation defined on Am such that (x1, …, xm) ≡ (y1, …, ym) if there exists a permutation σ on {1, …, m} such that yσ(i) = xi for all i. Let A(m) denote the set of all equivalence classes determined by ≡. Two elements X and Y in A(m) are said to be adjacent if (x1, …, xm?1, a) ∈ X and (x1, …, xm?1, b) ∈ Y for some x1, …, xm?1 ∈ A and some distinct elements a, b ∈ A. We study the structure of functions from A(m) to B(n) that send adjacent elements to adjacent elements when A has at least n + 2 elements and its application to linear preservers of non-zero decomposable symmetric tensors. 相似文献
Let A1,…,Am be nxn hermitian matrices. Definine W(A1,…,Am)={(xA1x ?,…xAmx?):x?Cn,xx?=1}. We will show that every point in the convex hull of W(A1,…,Am) can be represented as a convex combination of not more than k(m,n) points in W(A1,…,Am) where k(m,n)=min{n,[√m]+δn2m+1}. 相似文献
The reformulation of the Bessis-Moussa-Villani (BMV) conjecture given by Lieb and Seiringer asserts that the coefficient αm,k(A,B) of tk in the polynomial Tr(A+tB)m, with A,B positive semidefinite matrices, is nonnegative for all m,k. We propose a natural extension of a method of attack on this problem due to Hägele, and investigate for what values of m,k the method is successful, obtaining a complete determination when either m or k is odd. 相似文献
Let be a class of subsets of a finite set X. Elements of are called blocks. Let υ, t, λ and k be nonnegative integers such that υ?k?t?0. A pair (X, ) is called a (υ, k, λ) t-design, denoted by Sλ(t, k, υ), if (1) |X| = υ, (2) every t-subset of X is contained in exactly λ blocks and (3) for every block A in , |A| = k. A Möbius plane M is an S1(3, q+1, q2+1) where q is a positive integer. Let ∞ be a fixed point in M. If ∞ is deleted from M, together with all the blocks containing ∞, then we obtain a point-residual design M*. It can be easily checked that M* is an Sq(2, q+1, q2). Any Sq(2, q+1, q2) is called a pseudo-point-residual design of order q, abbreviated by PPRD(q). Let A and B be two blocks in a PPRD(q)M*. A and B are said to be tangent to each other at z if and only if A∩B={z}. M* is said to have the Tangency Property if for any block A in M*, and points x and y such that x?A and y?A, there exists at most one block containing y and tangent to A at x. This paper proves that any PPRD(q)M* is uniquely embeddable into a Möbius plane if and only if M* satisfies the Tangency Property. 相似文献
The aim of this paper is to discuss the simpleness of zeros of Stokes multipliers associated with the differential equation -Φ″(X)+W(X)Φ(X)=0, where W(X)=Xm+a1Xm-1+?+am is a real monic polynomial. We show that, under a suitable hypothesis on the coefficients ak, all the zeros of the Stokes multipliers are simple. 相似文献
For a positive integer m, let and let n = |A|. For an integer x, let R(x) be the least positive residue of x modulo m and if (x, m) = 1, let x′ be the inverse of x modulo m. If m is odd, then |R(ab′)|a,b∈A = ?21?n(∏χ(Σa = 1m ? 1aχ(a))), where χ runs over all the odd Dirichlet characters modulo m. 相似文献
A Hilbert bundle (p, B, X) is a type of fibre space p:B → X such that each fibre p?1(x) is a Hilbert space. However, p?1(x) may vary in dimension as x varies in X. We generalize the classical homotopy classification theory of vector bundles to a “homotopy” classification of certain Hilbert bundles. An (m, n)-bundle over the pair (X, A) is a Hilbert bundle (p, B, X) such that the dimension of p?1(x) is m for x in A and n otherwise. The main result here is that if A is a compact set lying in the “edge” of the metric space X (e.g. if X is a topological manifold and A is a compact subset of the boundary of X), then the problem of classifying (m, n)-bundles over (X, A) reduces to a problem in the classical theory of vector bundles. In particular, we show there is a one-to-one correspondence between the members of the orbit set, [A, Gm(n)]/[X, U(n)] ¦ A, and the isomorphism classes of (m, n)-bundles over (X, A) which are trivial over X, A. 相似文献
Let X0 ? X1 ? ··· ? Xp be Banach spaces with continuous injection of Xk into Xk + 1 for 0 ? k ? p ? 1, and with X0 dense in Xp. We seek a function u: [0, 1] → X0 such that its kth derivative u(k), k = 0, 1,…, p, is continuous from [0, 1] into xk, and satisfies the initial condition u(k)(0) = ak?Xk. It is shown that such a function exists if and only if the initial values a0, a1, …, ap satisfy a certain condition reminiscent of interpolation theory. This condition always holds when p = 1; when p ? 2, the spaces Xk (k = 0, 1, …, p) may or may not be such that the desired function exists for any given initial values ak?Xk. 相似文献
Пустьd-натуральное ч исло,Zd — множество на боров k=(k1, ...,kd), состоящих из неотрицательных цел ыхkj,Z+d=k∈Zd:k≧1. Предположи м, что системаfk(x):k∈Z+d? ?L2(X,A, μ) и последовател ьностьak:k∈Z+d. таковы, чт о для всех b∈Zd и m∈Z+d выполн ены неравенства(2) $$\left\| {\sum\limits_{b + 1 \leqq k \leqq b + m} {a_k f_k (x)} } \right\|_2^2 \leqq w^2 (m)\sum\limits_{b + 1 \leqq k \leqq b + m} {a_k^2 } $$ где последовательно сть {w(m): m∈Z+d положительн а и не убывает. Например, есл иfk(х) — квазистационарная система, то для соотве тствующей последовательности {ω(m) (2) имeeт Меcтo ДЛЯ ЛЮбОЙ ПОС ЛеДОВатеЛЬНОСТИ {ak}. В работе получены оце нки порядка роста пря моугольных частных суммSm(x)= =∑ akfk(x) при maxmj→∞ как в случ ае {ak}∈l2, таки для {ak}l2. Эти оценки явля1≦k≦m 1≦j≦d ются новыми даже для о ртогональных кратны х рядов. Показано, что упомяну тые оценки в общем слу чае являются точными. 相似文献
Ek(x2,…, xn) is defined by Ek(a2,…, an) = 1 if and only if ∑i=2nai = k. We determine the periods of sequences generated by the shift registers with the feedback functions x1 + Ek(x2,…, xn) and x1 + Ek(x2,…, xn) + Ek+1(x2,…, xn) over the field GF(2). 相似文献
Let A be an n × n normal matrix over , and Qm, n be the set of strictly increasing integer sequences of length m chosen from 1,…,n. For α, β ? Qm, n denote by A[α|β] the submatrix obtained from A by using rows numbered α and columns numbered β. For k ? {0, 1,…, m} we write |α∩β| = k if there exists a rearrangement of 1,…, m, say i1,…, ik, ik+1,…, im, such that α(ij) = β(ij), i = 1,…, k, and {α(ik+1),…, α(im) } ∩ {β(ik+1),…, β(im) } = ?. A new bound for |detA[α|β ]| is obtained in terms of the eigenvalues of A when 2m = n and |α∩β| = 0.Let n be the group of n × n unitary matrices. Define the nonnegative number where | α ∩ β| = k. It is proved that Let A be semidefinite hermitian. We conjecture that ρ0(A) ? ρ1(A) ? ··· ? ρm(A). These inequalities have been tested by machine calculations. 相似文献
Let R+ be the space of nonnegative real numbers. F. Waldhausen defines a k-fold end structure on a space X as an ordered k-tuple of continuous maps xf:X → R+, 1 ? j ? k, yielding a proper map x:X → (R+)k. The pairs (X,x) are made into the category Ek of spaces with k-fold end structure. Attachments and expansions in Ek are defined by induction on k, where elementary attachments and expansions in E0 have their usual meaning. The category Ek/Z consists of objects (X, i) where i: Z → X is an inclusion in Ek with an attachment of i(Z) to X, and the category Ek6Z consists of pairs (X,i) of Ek/Z that admit retractions X → Z. An infinite complex over Z is a sequence X = {X1 ? X2 ? … ? Xn …} of inclusions in Ek6Z. The abelian grou p S0(Z) is then defined as the set of equivalence classes of infinite complexes dominated by finite ones, where the equivalence relation is generated by homotopy equivalence and finite attachment; and the abelian group S1(Z) is defined as the set of equivalence classes of X1, where X ∈ Ek/Z deformation retracts to Z. The group operations are gluing over Z. This paper presents the Waldhausen theory with some additions and in particular the proof of Waldhausen's proposition that there exists a natural exact sequence 0 → S1(Z × R)→πS0(Z) by utilizing methods of L.C. Siebenmann. Waldhausen developed this theory while seeking to prove the topological invariance of Whitehead torsion; however, the end structures also have application in studying the splitting of a noncompact manifold as a product with R[1]. 相似文献
Quantization of compressed sensing measurements is typically justified by the robust recovery results of Candès, Romberg and Tao, and of Donoho. These results guarantee that if a uniform quantizer of step size δ is used to quantize m measurements y=Φx of a k-sparse signal x∈?N, where Φ satisfies the restricted isometry property, then the approximate recovery x# via ?1-minimization is within O(δ) of x. The simplest and commonly assumed approach is to quantize each measurement independently. In this paper, we show that if instead an rth-order ΣΔ (Sigma–Delta) quantization scheme with the same output alphabet is used to quantize y, then there is an alternative recovery method via Sobolev dual frames which guarantees a reduced approximation error that is of the order δ(k/m)(r?1/2)α for any 0<α<1, if m?r,αk(logN)1/(1?α). The result holds with high probability on the initial draw of the measurement matrix Φ from the Gaussian distribution, and uniformly for all k-sparse signals x whose magnitudes are suitably bounded away from zero on their support. 相似文献
This article is concerned with the Titchmarsh–Weyl mα(λ) function for the differential equation d2y/dx2+[λ−q(x)]y=0. The test potential q(x)=x2, for which the relevant mα(λ) functions are meromorphic, having simple poles at the points λ=4k+1 and λ=4k+3, is studied in detail. We are able to calculate the mα(λ) function both far from and near to these poles. The calculation is then extended to several other potentials, some of which do not have analytical solutions. Numerical data are given for the Titchmarsh–Weyl mα(λ) function for these potentials to illustrate the computational effectiveness of the method used. 相似文献
Let Γ denote a distance-regular graph with diameter D?3. Assume Γ has classical parameters (D,b,α,β) with b<-1. Let X denote the vertex set of Γ and let A∈MatX(C) denote the adjacency matrix of Γ. Fix x∈X and let A∗∈MatX(C) denote the corresponding dual adjacency matrix. Let T denote the subalgebra of MatX(C) generated by A,A∗. We call T the Terwilliger algebra of Γ with respect to x. We show that up to isomorphism there exist exactly two irreducible T-modules with endpoint 1; their dimensions are D and 2D-2. For these T-modules we display a basis consisting of eigenvectors for A∗, and for each basis we give the action of A. 相似文献
A natural exponential family (NEF)F in ?n,n>1, is said to be diagonal if there existn functions,a1,...,an, on some intervals of ?, such that the covariance matrixVF(m) ofF has diagonal (a1(m1),...,an(mn)), for allm=(m1,...,mn) in the mean domain ofF. The familyF is also said to be irreducible if it is not the product of two independent NEFs in ?k and ?n-k, for somek=1,...,n?1. This paper shows that there are only six types of irreducible diagonal NEFs in ?n, that we call normal, Poisson, multinomial, negative multinomial, gamma, and hybrid. These types, with the exception of the latter two, correspond to distributions well established in the literature. This study is motivated by the following question: IfF is an NEF in ?n, under what conditions is its projectionp(F) in ?k, underp(x1,...,xn)∶=(x1,...,xk),k=1,...,n?1, still an NEF in ?k? The answer turns out to be rather predictable. It is the case if, and only if, the principalk×k submatrix ofVF(m1,...,mn) does not depend on (mk+1,...,mn). 相似文献
A necessary and sufficient condition that a densely defined linear operator A in a sequentially complete locally convex space X be the infinitesimal generator of a quasi-equicontinuous C0-semigroup on X is that there exist a real number β ? 0 such that, for each λ > β, the resolvent (λI ? A)?1 exists and the family {(λ ? β)k(λI ? A)?k; λ > β, k = 0, 1, 2,…} is equicontinuous. In this case all resolvents (λI ? A)?1, λ > β, of the given operator A and all exponentials exp(tA), t ? 0, of the operator A belong to a Banach algebra which is a subspace of the space L(X) of all continuous linear operators on X, and, for each t ? 0 and for each x?X, one has limk → z (I ? k?1tA)?kx = exp(tA) x. A perturbation theorem for the infinitesimal generator of a quasi-equicontinuous C0-semigroup by an operator which is an element of is obtained. 相似文献
