Fiedler-Ptak scaling in max algebra
Sergei Sergeev
TL;DR
This paper discusses Fiedler-Ptak scaling within max algebra, highlighting its theoretical aspects and potential applications, as presented in a conference talk honoring Miroslav Fiedler.
Contribution
It provides an in-depth analysis of Fiedler-Ptak scaling in max algebra, expanding understanding of its properties and significance.
Findings
Fiedler-Ptak scaling characterized in max algebra
Connections to spectral theory explored
Potential applications in matrix analysis discussed
Abstract
This is essentially the text of my talk on Fiedler-Ptak scaling in max algebra delivered in the invited minisymposium in honor of Miroslav Fiedler at the 17th ILAS Conference in Braunschweig, Germany.
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Taxonomy
TopicsAdvanced Algebra and Logic · Polynomial and algebraic computation · Matrix Theory and Algorithms