Talk:Doubly stochastic matrix

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In Hungary, the proof of the van der Waerden inequality given by Gyires is generally considered false. I could not, however, find any source for this on the internet.

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The Math Review linked from the page states, "Coordinated with these inequalities are conjectured inequalities for the doubly stochastic matrices in H. These conjectures include the Well-known Van der Waerden conjecture...the author verifies the conjectures for small values", which makes it seem like he never claimed a proof in the first place! The paper does not seem to be easily available though, so I'm not sure about this. Kevinatilusa (talk) 19:42, 16 October 2012 (UTC)Reply

Non-square doubly stochastic matrices

There is a natural generalization of the concept of doubly stochastic matrix to non-square matrices: see, for example, http://www.jstor.org/stable/4355884

Defined in this manner, doubly stochastic matrix looks very similar to some kind of a discretized version of a bivariate copula density.

Proof; generalisations

Latest comment: 3 years ago1 comment1 person in discussion

Hello – I added a proof of Birkhoff’s theorem – it’s pretty straightforward. I also mentioned trivial generalisations and the more complicated one by Caron et al referred to by the previous shy editor. Presumably Caron’s goes beyond the trivial one... Colin.champion (talk) 09:50, 12 October 2021 (UTC)Reply