It is known that many classical inequalities linked to convolutions can be
obtained by looking at the monotonicity in time of convolutions of powers of
solutions to the heat equation, provided that both the exponents and the
coefficients of diffusions are suitably chosen and related. This idea can be
applied to give an alternative proof of the sharp form of the classical Young's
inequality and its converse, to Brascamp--Lieb type inequalities, Babenko's
inequality and Pr\'ekopa--Leindler inequality as well as the Shannon's entropy
power inequality. This note aims in presenting new proofs of these results, in
the spirit of the original arguments introduced by Stam to prove the entropy
power inequality.Comment: 29 page
