AbstractIn 1858 Cayley considered a particular kind of tridiagonal determinants (or continuants). By a direct inspection of the first cases, he conjectured an identity expressing these determinants in terms of certain other determinants considered by Sylvester in 1854. Then Cayley proved the conjectured identity by induction but, as he wrote, he felt unsatisfied with his proof. The main aim of this paper is to give a straightforward proof of Cayley's identity using the method of formal series. Moreover we use this method and umbral calculus techniques to obtain several other identities.Cayley continuants appear in several contexts and in particular in enumerative combinatorics. Mittag–Leffler polynomials, Meixner polynomials of the first ki...
Głównym punktem pracy jest wzór Cayley'a na liczbę wszystkich drzew oznaczonych oraz jego dowody.Pie...
We study the main umbral operators J , M and N associated with the Cayley continuants U^(ν)_n (x) an...
International audienceThe Hankel determinants of a given power series f can be evaluated by using th...
In 1858 Cayley considered a particular kind of tridiagonal determinants (or continuants). By a direc...
AbstractIn 1858 Cayley considered a particular kind of tridiagonal determinants (or continuants). By...
The classic Cayley identity states that det(partial) (det X)^s = s(s+1)...(s+n-1) (det X)^{s-1} wher...
AbstractIn a paper of 1857 Cayley suggests the problem of determining all the symmetric functions of...
We prove that the Cayley-Menger determinant of an n-dimensional simplex is an absolutely irreducible...
AbstractWe prove addition formulas for some polynomials built on combinatorial sequences (Catalan nu...
Abstract: Determinants have played a significant part in various areas in mathematics. For instance,...
AbstractAn elementary combinatorial proof of the Cayley-Hamilton theorem is given. At the conclusion...
AbstractThis paper concerns extensions of Cayley's enumeration formula to a class of multi-dimension...
AbstractWe give a common, concise derivation of some important determinantal identities attributed t...
AbstractCayley's theorem, published in 1847, asserts that any skew-symmetric determinant of even ord...
AbstractThis paper presents a combinatorial theory of formal power series. The combinatorial interpr...
Głównym punktem pracy jest wzór Cayley'a na liczbę wszystkich drzew oznaczonych oraz jego dowody.Pie...
We study the main umbral operators J , M and N associated with the Cayley continuants U^(ν)_n (x) an...
International audienceThe Hankel determinants of a given power series f can be evaluated by using th...
In 1858 Cayley considered a particular kind of tridiagonal determinants (or continuants). By a direc...
AbstractIn 1858 Cayley considered a particular kind of tridiagonal determinants (or continuants). By...
The classic Cayley identity states that det(partial) (det X)^s = s(s+1)...(s+n-1) (det X)^{s-1} wher...
AbstractIn a paper of 1857 Cayley suggests the problem of determining all the symmetric functions of...
We prove that the Cayley-Menger determinant of an n-dimensional simplex is an absolutely irreducible...
AbstractWe prove addition formulas for some polynomials built on combinatorial sequences (Catalan nu...
Abstract: Determinants have played a significant part in various areas in mathematics. For instance,...
AbstractAn elementary combinatorial proof of the Cayley-Hamilton theorem is given. At the conclusion...
AbstractThis paper concerns extensions of Cayley's enumeration formula to a class of multi-dimension...
AbstractWe give a common, concise derivation of some important determinantal identities attributed t...
AbstractCayley's theorem, published in 1847, asserts that any skew-symmetric determinant of even ord...
AbstractThis paper presents a combinatorial theory of formal power series. The combinatorial interpr...
Głównym punktem pracy jest wzór Cayley'a na liczbę wszystkich drzew oznaczonych oraz jego dowody.Pie...
We study the main umbral operators J , M and N associated with the Cayley continuants U^(ν)_n (x) an...
International audienceThe Hankel determinants of a given power series f can be evaluated by using th...