Add to ORKGLandry, Minsky, and Taylor introduced an invariant of veering triangulations called the taut polynomial. Via a connection between veering triangulations and pseudo-Anosov flows, it generalizes the Teichm\"uller polynomial of a fibered face of the Thurston norm ball to (some) non-fibered faces. We construct a sequence of veering triangulations, with the number of tetrahedra tending to infinity, whose taut polynomials vanish. These veering triangulations encode non-circular Anosov flows transverse to tori.Comment: 26 pages, 12 figure
We discuss a metric description of the divergence of a (projectively) Anosov flow in dimension 3, in...
We study Veech groups associated to the pseudo-Anosov monodromies of fibers and foliations of a fixe...
Torsion polynomials connect the genus of a hyperbolic knot (a topological invariant) with the discre...
Landry, Minsky and Taylor (LMT) introduced two polynomial invariants of veering triangulations—the t...
This paper is the third in a sequence establishing a dictionary between the combinatorics of veering...
In this thesis we study the taut polynomial of a veering triangulation, defined by Landry, Minsky an...
In this note we combinatorialise a technique of Novikov. We use this to prove that, in a three-manif...
This paper gives 3 different proofs (independently obtained by the 3 authors) of the following fact:...
A π₁-injective closed surface in an orientable 3-manifold with a tangentially smooth, transversely C...
We introduce a generalization of Goodman surgery to the category of projectively Anosov flows. This ...
Let $M$ be a connected, closed, orientable, irreducible $3$-manifold. We show that: if $M$ admits a ...
Agol recently introduced the concept of a veering taut triangulation of a 3–manifold, which is a tau...
We develop the theory of veering triangulations on oriented surfaces adapted to moduli spaces of ha...
For any genus g \leq 26, and for n \leq 3 in all genus, we prove that every degree-g polynomial in t...
We give an elementary, self-contained proof of the theorem, proven independently in 1958-9 by Crowel...
We discuss a metric description of the divergence of a (projectively) Anosov flow in dimension 3, in...
We study Veech groups associated to the pseudo-Anosov monodromies of fibers and foliations of a fixe...
Torsion polynomials connect the genus of a hyperbolic knot (a topological invariant) with the discre...
Landry, Minsky and Taylor (LMT) introduced two polynomial invariants of veering triangulations—the t...
This paper is the third in a sequence establishing a dictionary between the combinatorics of veering...
In this thesis we study the taut polynomial of a veering triangulation, defined by Landry, Minsky an...
In this note we combinatorialise a technique of Novikov. We use this to prove that, in a three-manif...
This paper gives 3 different proofs (independently obtained by the 3 authors) of the following fact:...
A π₁-injective closed surface in an orientable 3-manifold with a tangentially smooth, transversely C...
We introduce a generalization of Goodman surgery to the category of projectively Anosov flows. This ...
Let $M$ be a connected, closed, orientable, irreducible $3$-manifold. We show that: if $M$ admits a ...
Agol recently introduced the concept of a veering taut triangulation of a 3–manifold, which is a tau...
We develop the theory of veering triangulations on oriented surfaces adapted to moduli spaces of ha...
For any genus g \leq 26, and for n \leq 3 in all genus, we prove that every degree-g polynomial in t...
We give an elementary, self-contained proof of the theorem, proven independently in 1958-9 by Crowel...
We discuss a metric description of the divergence of a (projectively) Anosov flow in dimension 3, in...
We study Veech groups associated to the pseudo-Anosov monodromies of fibers and foliations of a fixe...
Torsion polynomials connect the genus of a hyperbolic knot (a topological invariant) with the discre...