Let c(°) denote the number of cycles of a permutation ° of n letters, and let Tr(°)=n−c(°). A t-involution is a product of t disjoint transpositions. Let k>2, n>2t.Theorem. ° is the product of k t-involutions if and only if kt =Tr(°)+2r for some nonegative integer r. (For k=2 one more condition is needed; see [2].) As a corollary, the least power of a class of an involution with at least one fixed point that covers the alternating group is determined
We present various results on multiplying cycles in the symmetric group. One result is a generalisat...
AbstractA formula is derived for the number of orbits of a product of permutation in terms of the nu...
A theorem by M. Cohn and A. Lempel, relating the product of certain permutations to the rank of an a...
Let c(°) denote the number of cycles of a permutation ° of n letters, and let Tr(°)=n−c(°). A t-invo...
AbstractLet αϵGLn A be a matrix over a commutative ring A with 1 such that (det α)2 = 1. If α is cyc...
AbstractEvery square matrix over a field, with determinant ±1, is the product of not more than four ...
We study the 2-adic properties for the numbers of involutions in the alternative groups, and give an...
We enumerate and characterize some classes of alternating and reverse alternating involutions avoidi...
AbstractThe central result of this paper is a generalization of the theorem that, for n ≥ 5, every e...
AbstractWe give a combinatorial proof of the formula giving the number of representations of an even...
AbstractDefine Ink(α) to be the set of involutions of {1,2,…,n} with exactly k fixed points which av...
AbstractA permutation of n objects is of cycle type (j1,…,jn) if it has jk, k=1,…,n, cycles of lengt...
AbstractThe group algebra of the symmetric group is used to derive a general enumerative result asso...
AbstractGiven a nontrivial conjugacy class Ω of GL(V) which is contained in SL(V), we want to find a...
AbstractLet An denote the alternating group on n symbols. If n = 5, 6, 7, 10, 11, 12, 13 or n ⩾ 15, ...
We present various results on multiplying cycles in the symmetric group. One result is a generalisat...
AbstractA formula is derived for the number of orbits of a product of permutation in terms of the nu...
A theorem by M. Cohn and A. Lempel, relating the product of certain permutations to the rank of an a...
Let c(°) denote the number of cycles of a permutation ° of n letters, and let Tr(°)=n−c(°). A t-invo...
AbstractLet αϵGLn A be a matrix over a commutative ring A with 1 such that (det α)2 = 1. If α is cyc...
AbstractEvery square matrix over a field, with determinant ±1, is the product of not more than four ...
We study the 2-adic properties for the numbers of involutions in the alternative groups, and give an...
We enumerate and characterize some classes of alternating and reverse alternating involutions avoidi...
AbstractThe central result of this paper is a generalization of the theorem that, for n ≥ 5, every e...
AbstractWe give a combinatorial proof of the formula giving the number of representations of an even...
AbstractDefine Ink(α) to be the set of involutions of {1,2,…,n} with exactly k fixed points which av...
AbstractA permutation of n objects is of cycle type (j1,…,jn) if it has jk, k=1,…,n, cycles of lengt...
AbstractThe group algebra of the symmetric group is used to derive a general enumerative result asso...
AbstractGiven a nontrivial conjugacy class Ω of GL(V) which is contained in SL(V), we want to find a...
AbstractLet An denote the alternating group on n symbols. If n = 5, 6, 7, 10, 11, 12, 13 or n ⩾ 15, ...
We present various results on multiplying cycles in the symmetric group. One result is a generalisat...
AbstractA formula is derived for the number of orbits of a product of permutation in terms of the nu...
A theorem by M. Cohn and A. Lempel, relating the product of certain permutations to the rank of an a...