We improve the upper bound on superbridge index [Formula: see text] in terms of bridge index [Formula: see text] from [Formula: see text] to [Formula: see text]. </jats:p
In knot theory, a knot may have an invariant which is easily computed but difficult to understand ge...
In this report, we will introduce key concepts in constructing, identifying and distinguishing knots...
Let [latex]G[/latex] be a simple connected molecular graph with vertex set [latex]V(G)[/latex] and e...
Previous work used polygonal realizations of knots to reduce the problem of computing the superbridg...
tains all 3-superbridge knots. We also supply the best known estimates of the superbridge index for ...
This paper gives new upper bounds on the stick numbers of the knots $9_{18}$, $10_{18}$, $10_{58}$, ...
Naïvely compute an upper bound on the bridge index of knots using Reidemeister move
The “bridge index” of a knot is the least number of maximal overpasses taken over all diagrams of th...
A topological index (TI) is a function from P to the set of real numbers, where P is the set of fini...
The connectivity index χ can be regarded as the sum of bond contributions. Inthis article, boiling p...
Yoshikawa made a table of knotted surfaces in R^4 with ch-index 10 or less. This remarkable table is...
Knots are commonly found in molecular chains such as DNA and proteins, and they have been considered...
There are obvious inequalities relating the Nakanishi index of a knot, the bridge number, the degree...
We talk about how to read the braid index of certain families of alternating knots from a minimal kn...
Improved bounds on the difference between the Szeged index and the Wiener index of graphs Sandi Klav...
In knot theory, a knot may have an invariant which is easily computed but difficult to understand ge...
In this report, we will introduce key concepts in constructing, identifying and distinguishing knots...
Let [latex]G[/latex] be a simple connected molecular graph with vertex set [latex]V(G)[/latex] and e...
Previous work used polygonal realizations of knots to reduce the problem of computing the superbridg...
tains all 3-superbridge knots. We also supply the best known estimates of the superbridge index for ...
This paper gives new upper bounds on the stick numbers of the knots $9_{18}$, $10_{18}$, $10_{58}$, ...
Naïvely compute an upper bound on the bridge index of knots using Reidemeister move
The “bridge index” of a knot is the least number of maximal overpasses taken over all diagrams of th...
A topological index (TI) is a function from P to the set of real numbers, where P is the set of fini...
The connectivity index χ can be regarded as the sum of bond contributions. Inthis article, boiling p...
Yoshikawa made a table of knotted surfaces in R^4 with ch-index 10 or less. This remarkable table is...
Knots are commonly found in molecular chains such as DNA and proteins, and they have been considered...
There are obvious inequalities relating the Nakanishi index of a knot, the bridge number, the degree...
We talk about how to read the braid index of certain families of alternating knots from a minimal kn...
Improved bounds on the difference between the Szeged index and the Wiener index of graphs Sandi Klav...
In knot theory, a knot may have an invariant which is easily computed but difficult to understand ge...
In this report, we will introduce key concepts in constructing, identifying and distinguishing knots...
Let [latex]G[/latex] be a simple connected molecular graph with vertex set [latex]V(G)[/latex] and e...
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