For an even integer t \geq 2, the Matchings Connecivity matrix H_t is a matrix that has rows and columns both labeled by all perfect matchings of the complete graph K_t on t vertices; an entry H_t[M_1,M_2] is 1 if M_1\cup M_2 is a Hamiltonian cycle and 0 otherwise. Motivated by the computational study of the Hamiltonicity problem, we present three results on the structure of H_t: We first show that H_t has rank at most 2^{t/2-1} over GF(2) via an appropriate factorization that explicitly provides families of matchings X_t forming bases for H_t. Second, we show how to quickly change representation between such bases. Third, we notice that the sets of matchings X_t induce permutation matrices within H_t. Subsequently, we use the factorization...
A number of results in hamiltonian graph theory are of the form P1 implies P2, where P1 is a propert...
Dirac’s theorem (1952) is a classical result of graph theory, stating that an n-vertex graph (n≥3n≥3...
We show that the Hamiltonicity of a regular graph G can be fully characterized by the numbers of blo...
For an even integer t \geq 2, the Matchings Connecivity matrix H_t is a matrix that has rows and col...
We present a Monte Carlo algorithm that detects the presence of a Hamiltonian cycle in an n-vertex u...
For even k ϵ N, the matchings connectivity matrix Mk is a binary matrix indexed by perfect matchings...
We present a Monte Carlo algorithm for Hamiltonicity detection in an $n$-vertex undirected graph run...
Dirac's theorem (1952) is a classical result of graph theory, stating that an $n$-vertex graph ($n \...
For even $k$, the matchings connectivity matrix $\mathbf{M}_k$ encodes which pairs of perfect matchi...
We present a deterministic algorithm that given any directed graph on n vertices computes the parity...
We study the Hamilton cycle problem with input a random graph G ~ G(n,p) in two different settings. ...
AbstractThe intensive study of fast parallel and distributed algorithms for various routing (and com...
We are motivated by a tantalizing open question in exact algorithms: can we detect whether an n-vert...
A number of results in hamiltonian graph theory are of the form P1 implies P2, where P1 is a propert...
Dirac’s theorem (1952) is a classical result of graph theory, stating that an n-vertex graph (n≥3n≥3...
We show that the Hamiltonicity of a regular graph G can be fully characterized by the numbers of blo...
For an even integer t \geq 2, the Matchings Connecivity matrix H_t is a matrix that has rows and col...
We present a Monte Carlo algorithm that detects the presence of a Hamiltonian cycle in an n-vertex u...
For even k ϵ N, the matchings connectivity matrix Mk is a binary matrix indexed by perfect matchings...
We present a Monte Carlo algorithm for Hamiltonicity detection in an $n$-vertex undirected graph run...
Dirac's theorem (1952) is a classical result of graph theory, stating that an $n$-vertex graph ($n \...
For even $k$, the matchings connectivity matrix $\mathbf{M}_k$ encodes which pairs of perfect matchi...
We present a deterministic algorithm that given any directed graph on n vertices computes the parity...
We study the Hamilton cycle problem with input a random graph G ~ G(n,p) in two different settings. ...
AbstractThe intensive study of fast parallel and distributed algorithms for various routing (and com...
We are motivated by a tantalizing open question in exact algorithms: can we detect whether an n-vert...
A number of results in hamiltonian graph theory are of the form P1 implies P2, where P1 is a propert...
Dirac’s theorem (1952) is a classical result of graph theory, stating that an n-vertex graph (n≥3n≥3...
We show that the Hamiltonicity of a regular graph G can be fully characterized by the numbers of blo...