Category Archives: Convex polytopes

Beyond the g-conjecture – algebraic combinatorics of cellular spaces I

Posted on June 20, 2018 by

The g-conjecture for spheres is surely the one single conjecture I worked on more than on any other, and also here on the blog we had a sequence of posts about it by Eran Nevo (I,II,III,IV). Here is a great … Continue reading

Posted in Combinatorics, Convex polytopes, Geometry | Tagged , , , , , , , , , , , , , , , , , , | 7 Comments

A Mysterious Duality Relation for 4-dimensional Polytopes.

Posted on June 6, 2018 by

Two dimensions Before we talk about 4 dimensions let us recall some basic facts about 2 dimensions: A planar polygon has the same number of vertices and edges. This fact, which just asserts that the Euler characteristic of is zero, … Continue reading

Posted in Combinatorics, Convex polytopes | Tagged | 5 Comments

My Copy of Branko Grünbaum’s Convex Polytopes

Posted on April 26, 2018 by

Branko Grünbaum is my academic grandfather (see this highly entertaining post for a picture representing five academic generations). Gunter Ziegler just wrote a beautiful article in the Notices of the AMS on Branko Grunbaum’s  classic book “Convex Polytopes”, so this … Continue reading

Posted in Combinatorics, Convex polytopes, Nostalgia | Tagged , , | 4 Comments

Eran Nevo: g-conjecture part 4, Generalizations and Special Cases

Posted on October 2, 2017 by

This is the fourth in a series of posts by Eran Nevo on the g-conjecture. Eran’s first post was devoted to the combinatorics of the g-conjecture and was followed by a further post by me on the origin of the g-conjecture. Eran’s second post was about … Continue reading

Posted in Combinatorics, Convex polytopes, Guest blogger, Open problems | Tagged , | 2 Comments

Touching Simplices and Polytopes: Perles’ argument

Posted on August 27, 2017 by

Joseph Zaks (1984), picture taken by Ludwig Danzer (OberWolfach photo collection)   The story I am going to tell here was told in several places, but it might be new to some readers and I will mention my own angle, … Continue reading

Posted in Combinatorics, Convex polytopes, Geometry, Open problems | Tagged , | Leave a comment

Convex Polytopes: Seperation, Expansion, Chordality, and Approximations of Smooth Bodies

Posted on October 28, 2015 by

I am happy to report on two beautiful results on convex polytopes. One disproves an old conjecture of mine and one proves an old conjecture of mine. Loiskekoski and Ziegler: Simple polytopes without small separators. Does Lipton-Tarjan’s theorem extends to high … Continue reading

Posted in Combinatorics, Convex polytopes | Tagged , , , , , | 3 Comments

The Simplex, the Cyclic polytope, the Positroidron, the Amplituhedron, and Beyond

Posted on February 16, 2015 by

A quick schematic road-map to these new geometric objects. The  positroidron can be seen as a cellular structure on the nonnegative Grassmanian – the part of the real Grassmanian G(m,n) which corresponds to m by n matrices with all m by … Continue reading

Posted in Algebra and Number Theory, Combinatorics, Convex polytopes, Physics | Tagged , , , , , , | 1 Comment

My Mathematical Dialogue with Jürgen Eckhoff

Posted on July 3, 2014 by

Jürgen Eckhoff, Ascona 1999 Jürgen Eckhoff is a German mathematician working in the areas of convexity and combinatorics. Our mathematical paths have met a remarkable number of times. We also met quite a few times in person since our first … Continue reading

Posted in Combinatorics, Convex polytopes, Open problems | Tagged , , , , , | 1 Comment

Many triangulated three-spheres!

Posted on November 28, 2013 by

The news Eran Nevo and Stedman Wilson have constructed triangulations with n vertices of the 3-dimensional sphere! This settled an old problem which stood open for several decades. Here is a link to their paper How many n-vertex triangulations does the 3 … Continue reading

Posted in Combinatorics, Convex polytopes, Geometry, Open problems | Tagged , | 1 Comment

Richard Stanley: How the Proof of the Upper Bound Theorem (for spheres) was Found

Posted on September 10, 2013 by

The upper bound theorem asserts that among all d-dimensional polytopes with n vertices, the cyclic polytope maximizes the number of facets (and k-faces for every k). It was proved by McMullen for polytopes in 1970, and by Stanley for general triangulations … Continue reading

Posted in Combinatorics, Convex polytopes | Tagged , | 2 Comments