Logarithmic convolution: Difference between revisions

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Line 1: In [[mathematics]], the '''scale convolution''' of two [[Function (mathematics)\|functions]] <math>s(t)</math> and <math>r(t)</math>, also known as their '''logarithmic convolution''' or '''log-volution'''<ref>{{Cite book\|title= An Introduction to Exotic Option Pricing \| series = Chapman and Hall/CRC Financial Mathematics Series \| author = Peter Buchen \| publisher = CRC Press\| date = 2012 \| ISBN = 9781420091021}}</ref> is defined as the function<ref name=pm>{{Cite web\|url=https://planetmath.org/logarithmicconvolution\|~~site~~work=~~Plante~~Planet Math\| title = logarithmic convolution \|date=22 March 2013\|access-date=15 September 2024}}</ref>▼ ~~<!-- Please do not remove or change this AfD message until the discussion has been closed. -->~~ ~~{{Article for deletion/dated\|page=Logarithmic convolution\|timestamp=20240914220809\|year=2024\|month=September\|day=14\|substed=yes}}~~ ~~<!-- Once discussion is closed, please place on talk page: {{Old AfD multi\|page=Logarithmic convolution\|date=14 September 2024\|result='''keep'''}} -->~~ ~~<!-- End of AfD message, feel free to edit beyond this point -->~~ ▲In [[mathematics]], the '''scale convolution''' of two [[Function (mathematics)\|functions]] <math>s(t)</math> and <math>r(t)</math>, also known as their '''logarithmic convolution''' is defined as the function<ref name=pm>{{Cite web\|url=https://planetmath.org/logarithmicconvolution\|site=Plante Math\| title = logarithmic convolution ~~\|date=22 March 2013\|access-date=15 September 2024}}</ref>~~ :<math> s _l r(t) = r _l s(t) = \int_0^\infty s\left(\frac{t}{a}\right)r(a) \, \frac{da}{a}</math> Line 23 ⟶ 18: :<math> s _l r(v) = f g(v) = g * f(v) = r _l s(v). </math> ==See also== [[Mellin transform]] ==References==