2011
6
2
0
80
On the Decomposition of Hilbert Spaces
2
2
Basic relation between numerical range and Davis-Wielandt shell of an operator $A$ acting on a Hilbert space with orthonormal basis $xi={e_{i}|i in I}$ and its conjugate $bar{A}$ which is introduced in this paper are obtained. The results are used to study the relation between point spectrum, approximate spectrum and residual spectrum of $A$ and $bar{A}$. A necessary and sufficient condition for $A$ to be self-conjugate ($A=bar{A}$) is given using a subgroup of H.
1
7
H.R.
Afshin
H.R.
Afshin
M.A.
Ranjbar
M.A.
Ranjbar
Numerical range
Davis-Wielandt shell
Spectra
Conjugate of an operator.
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Properties of Central Symmetric X-Form Matrices
2
2
In this paper we introduce a special form of symmetric matrices that is called central symmetric $X$-form matrix and study some properties, the inverse eigenvalue problem and inverse singular value problem for these matrices.
9
20
A.M.
Nazari
A.M.
Nazari
E.
Afshari
E.
Afshari
A.
Omidi Bidgoli
A.
Omidi Bidgoli
Inverse eigenvalue problem
Inverse singular value problem
eigenvalue
singular value.
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Shift Invariant Spaces and Shift Preserving Operators on Locally Compact Abelian Groups
2
2
We investigate shift invariant subspaces of $L^2(G)$, where $G$ is a locally compact abelian group. We show that every shift invariant space can be decomposed as an orthogonal sum of spaces each of which is generated by a single function whose shifts form a Parseval frame. For a second countable locally compact abelian group $G$ we prove a useful Hilbert space isomorphism, introduce range functions and give a characterization of shift invariant subspaces of $L^2(G)$ in terms of range functions. Finally, we investigate shift preserving operators on locally compact abelian groups. We show that there is a one-to-one correspondence between shift preserving operators and range operators on $L^2(G)$ where $G$ is a locally compact abelian group.
21
32
R.
Raisi Tousi
R.
Raisi Tousi
R.A.
Kamyabi Gol
R.A.
Kamyabi Gol
locally compact abelian group
shift invariant space
frame
range function
shift preserving operator
range operator.
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Deformation of Outer Representations of Galois Group II
2
2
This paper is devoted to deformation theory of "anabelian" representations of the absolute Galois group landing in outer automorphism group of the algebraic fundamental group of a hyperbolic smooth curve defined over a number-field. In the first part of this paper, we obtained several universal deformations for Lie-algebra versions of the above representation using the Schlessinger criteria for functors on Artin local rings. In the second part, we use a version of Schlessinger criteria for functors on the Artinian category of nilpotent Lie algebras which is formulated by Pridham, and explore arithmetic applications.
33
41
Arash
Rastegar
Arash
Rastegar
Deformation theory
Artin local rings
Schlessinger criteria.
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Linear Preservers of Majorization
2
2
For vectors $X, Yin mathbb{R}^{n}$, we say $X$ is left matrix majorized by $Y$ and write $X prec_{ell} Y$ if for some row stochastic matrix $R, ~X=RY.$ Also, we write $Xsim_{ell}Y,$ when $Xprec_{ell}Yprec_{ell}X.$ A linear operator $Tcolon mathbb{R}^{p}to mathbb{R}^{n}$ is said to be a linear preserver of a given relation $prec$ if $Xprec Y$ on $mathbb{R}^{p}$ implies that $TXprec TY$ on $mathbb{R}^{n}$. In this note we study linear preservers of $sim_{ell}$ from $mathbb{R}^{p}$ to $mathbb{R}^{n}.$ In particular, we characterize all linear preservers of $sim_{ell}$ from $mathbb{R}^{2}$ to $mathbb{R}^{n},$ and also, all linear preservers of $sim_{ell}$ from $mathbb{R}^{p}$ to $mathbb{R}^{p}.$
43
50
Fatemeh
Khalooei
Fatemeh
Khalooei
Abbas
Salemi
Abbas
Salemi
Linear preservers
Row stochastic matrix
Matrix majorization.
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On Schur Multipliers of Pairs and Triples of Groups with Topological Approach
2
2
In this paper, using a relation between Schur multipliers of pairs and triples of groups, the fundamental group and homology groups of a homotopy pushout of Eilenberg-MacLane spaces, we present among other things some behaviors of Schur multipliers of pairs and triples with respect to free, amalgamated free, and direct products and also direct limits of groups with topological approach.
51
65
Hanieh
Mirebrahimi
Hanieh
Mirebrahimi
Behrooz
Mashayekhy
Behrooz
Mashayekhy
Schur multiplier of a pair of groups
Schur multiplier of a triple of groups
Homology group
Homotopy group
Eilenberg-MacLane space
Homotopy pushout.
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The Hyper-Wiener Polynomial of Graphs
2
2
The distance $d(u,v)$ between two vertices $u$ and $v$ of a graph $G$ is equal to the length of a shortest path that connects $u$ and $v$. Define $WW(G,x) = 1/2sum_{{ a,b } subseteq V(G)}x^{d(a,b) + d^2(a,b)}$, where $d(G)$ is the greatest distance between any two vertices. In this paper the hyper-Wiener polynomials of the Cartesian product, composition, join and disjunction of graphs are computed.
67
74
G.H.
Fath-Tabar
G.H.
Fath-Tabar
A.R.
Ashrafi
A.R.
Ashrafi
Hyper-Wiener polynomial
graph operation.
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A Study of the Total Graph
2
2
Let R be a commutative ring with $Z(R)$ its set of zero-divisors. In this paper, we study the total graph of $R$, denoted by $T(Gamma(R))$. It is the (undirected) graph with all elements of R as vertices, and for distinct $x, yin R$, the vertices $x$ and $y$ are adjacent if and only if $x + yinZ(R)$. We study the chromatic number and edge connectivity of this graph.
75
80
Abolfazl
Tehranian
Abolfazl
Tehranian
Hamid Reza
Maimani
Hamid Reza
Maimani
Zero-divisor graph
Total graph.
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