Let's consider a gaussian blurring filter. For each output pixel we basically compute a weighted sum of the inputs. What if we replace the summing operation by a maximum?
Isn't that the same as a gray-scale dilation (maybe modulo some scaling factor and flipping)
ah no it's not the same, in grayscale dilation we add values of the image and of the kernel, while in this thing I was talking about we'd multiply them.
@flawr It does look like a dilation, but it’s not, because you don’t have all the cool properties that the dilation has. But maybe there are other cool properties with this new operator?
(Max,+)-convolutions are awesome. And you just need a logarithmic mapping to compare with (sum,*)-convolutions.
I once attended a seminar on tropical geometry at a mathematical morphology conference. They had invited this prominent tropical geometry guy to give a plenary talk, and he didn’t understand why he was invited until he saw some of the other presentations at the conference.
And I just looked over the tropical geometry page on Wikipedia, and see no mention at all of dilations and erosions or mathematical morphology.
It always baffles me when two essentially identical fields are totally not interrelated and not learning from each other.
the only place where I've actually heard about tropical geometry was in a course about algebraic statistics, maybe these guys just don't know about morphology
> The adjective tropical in the name of the area was coined by French mathematicians in honor of the Hungarian-born Brazilian computer scientist Imre Simon, who wrote on the field
@flawr With Monte Carlo it's different. It's named after the place, but not arbitrarily because someone was from there. It's because randomness is associated to casinos, and there's one there
Same with Manhattan. The shape (regular blocks) of that part of the city
Wife had to take some operations research courses where they taught it to her. In Hungarian it's a bit confusing because from the name you'd think it's "Magyar-módszer" named after a person named Magyar, but instead it's "magyar módszer", with Hungarian as an adjective.
I'd be bothered by Brazilian geometry a bit less, and by Brazilian method not at all. It really is a combination of multiple frown-inducing features: 1. using multiple indirection via field -> person -> country -> "tropical", and 2. naming a field after a person in such a way, even though people don't have monopolies on fields
@flawr just like "tropical geometry"; coincidence?
(the sncf metric is an induced metric with a distinguished point, so you define it as d'(x, y) := d(x, p) +d(p, y), similar to the railway network in france where you always had to go via paris)