AI Chat AI Image Generator AI Video Text to Speech

The ideal of the trifocal variety

05/16/2012

∙

by Chris Aholt, et al.

∙

∙

Techniques from representation theory, symbolic computational algebra, and numerical algebraic geometry are used to find the minimal generators of the ideal of the trifocal variety. An effective test for determining whether a given tensor is a trifocal tensor is also given.

Chris Aholt
2 publications
Luke Oeding
4 publications

page 1

page 2

page 3

page 4

research

∙ 11/18/2016

Minimal Problems for the Calibrated Trifocal Variety

We determine the algebraic degree of minimal problems for the calibrated...

0 Joe Kileel, et al. ∙

research

∙ 01/06/2015

The Quadrifocal Variety

Multi-view Geometry is reviewed from an Algebraic Geometry perspective a...

0 Luke Oeding, et al. ∙

research

∙ 03/30/2011

Internal Constraints of the Trifocal Tensor

The fundamental matrix and trifocal tensor are convenient algebraic repr...

0 Stuart B. Heinrich, et al. ∙

research

∙ 06/24/2020

Noetherian operators and primary decomposition

Noetherian operators are differential operators that encode primary comp...

0 Justin Chen, et al. ∙

research

∙ 10/20/2011

Regression for sets of polynomial equations

We propose a method called ideal regression for approximating an arbitra...

0 Franz Johannes Király, et al. ∙

research

∙ 05/25/2022

High dimensional Bernoulli distributions: algebraic representation and applications

The main contribution of this paper is to find a representation of the c...

0 Roberto Fontana, et al. ∙

research

∙ 11/01/2018

Tropical Modeling of Weighted Transducer Algorithms on Graphs

Weighted Finite State Transducers (WFSTs) are versatile data structures ...

0 Emmanouil Theodosis, et al. ∙