Source: wikibot/young-s-inequality-for-integral-operators
= Young's inequality for integral operators
{wiki=Young's_inequality_for_integral_operators}
Young's inequality for integral operators is a fundamental result in functional analysis that provides a way to estimate the \\(L^p\\) norms of convolutions or the products of functions under certain conditions. It applies to integral operators defined by convolution integrals and plays a crucial role in the theory of \\(L^p\\) spaces.