Add to ORKG2000 Mathematics Subject Classification: 15A15, 15A24, 15A33, 16S50.For an n×n matrix A over an arbitrary unitary ring R, we obtain the following Cayley-Hamilton identity with right matrix coefficients: (λ0I+C0)+A(λ1I+C1)+… +An-1(λn-1I+Cn-1)+An (n!I+Cn) = 0, where λ0+λ1x+…+λn-1 xn-1+n!xn is the right characteristic polynomial of A in R[x], I ∈ Mn(R) is the identity matrix and the entries of the n×n matrices Ci, 0 ≤ i ≤ n are in [R,R]. If R is commutative, then C0 = C1 = … = Cn-1 = Cn = 0 and our identity gives the n! times scalar multiple of the classical Cayley-Hamilton identity for A
AbstractLet F be a solvable Lie subalgebra of the Lie algebra gln(C) (=Cn×n as a vector space). Let ...
AbstractEulerian polynomial identities on n × n matrices were introduced by Szigeti, Tuza and Révész...
AbstractLet M*(C) denote the C∗-algebra defined as the direct sum of all matrix algebras {Mn(C):n⩾1}...
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AbstractAn elementary combinatorial proof of the Cayley-Hamilton theorem is given. At the conclusion...
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The classic Cayley identity states that where is an matrix of indeterminates and is the correspo...
AbstractIn this paper, we want to give an explicit description of identities satisfied by matrices n...
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Let K be a doubly infinite, self-adjoint matrix which is finite band (i.e. K_(jk) = 0 if |j – k| > m...
The statement of Cayley-Hamilton theorem is that every square matrix satisfies its own characteristi...
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Cayley-Hamilton is one of the well-known theorems that is formulated and proved in linear algebra on...
AbstractDenote by Rn,m the ring of invariants of m-tuples of n×n matrices (m,n⩾2) over an infinite b...
AbstractLet F be a solvable Lie subalgebra of the Lie algebra gln(C) (=Cn×n as a vector space). Let ...
AbstractEulerian polynomial identities on n × n matrices were introduced by Szigeti, Tuza and Révész...
AbstractLet M*(C) denote the C∗-algebra defined as the direct sum of all matrix algebras {Mn(C):n⩾1}...
AbstractIt is shown that the characteristic polynomial of matrices over a Lie nilpotent ring introdu...
AbstractAn elementary combinatorial proof of the Cayley-Hamilton theorem is given. At the conclusion...
AbstractLet A be n×n matrix of rank r. Then xn−r divides the characteristic polynomial det(xI−A) of ...
AbstractA family F of square matrices of the same order is called a quasi-commuting family if (AB-BA...
The classic Cayley identity states that where is an matrix of indeterminates and is the correspo...
AbstractIn this paper, we want to give an explicit description of identities satisfied by matrices n...
AbstractFirst we construct an algebra satisfying the polynomial identity [[x,y],[u,v]]=0, but none o...
Let K be a doubly infinite, self-adjoint matrix which is finite band (i.e. K_(jk) = 0 if |j – k| > m...
The statement of Cayley-Hamilton theorem is that every square matrix satisfies its own characteristi...
AbstractWe prove that the minimum number ν=ν(Um(R)) such that them×mupper triangular matrix algebra ...
Cayley-Hamilton is one of the well-known theorems that is formulated and proved in linear algebra on...
AbstractDenote by Rn,m the ring of invariants of m-tuples of n×n matrices (m,n⩾2) over an infinite b...
AbstractLet F be a solvable Lie subalgebra of the Lie algebra gln(C) (=Cn×n as a vector space). Let ...
AbstractEulerian polynomial identities on n × n matrices were introduced by Szigeti, Tuza and Révész...
AbstractLet M*(C) denote the C∗-algebra defined as the direct sum of all matrix algebras {Mn(C):n⩾1}...