(function(doc, html, url) { var widget = doc.createElement("div"); widget.innerHTML = html; var script = doc.currentScript; // e = a.currentScript; if (!script) { var scripts = doc.scripts; for (var i = 0; i < scripts.length; ++i) { script = scripts[i]; if (script.src && script.src.indexOf(url) != -1) break; } } script.parentElement.replaceChild(widget, script); }(document, '

Local solvability of stochastic Euler equations with Levy noise using Fourier truncation method.

What is it about?

In this work we prove the existence and uniqueness of pathwise solutions up to a stopping time to the stochastic Euler equations perturbed by additive and multiplicative Lévy noise in two and three dimensions. The existence of a unique maximal solution is also proved.

Why is it important?

Stochastic Euler equations perturbed by Levy noise has been considered for the first time and the solvability is established by using the Fourier truncation method.

Read more on Kudos…
The following have contributed to this page:
Sivaguru Sritharan and Manil Mohan
' ,"url"));