We study the Hopf-Galois module structure of algebraic integers in some Galois extensions of p-adic fields L/K which are at most tamely ramified, generalizing some of the results of the author's 2011 paper cited below. If G=Gal(L/K) and H=L[N]^G is a Hopf algebra giving a Hopf-Galois structure on L/K, we give a criterion for the O_K-order O_L[N]^G to be a Hopf order in H. When O_L[N]^G is Hopf, we show that it coincides with the associated order A_H of O_L in H and that O_L is free over A_H, and we give a criterion for a Hopf-Galois structure to exist at integral level. As an illustration of these results, we determine the commutative Hopf-Galois module structure of the algebraic integers in tame Galois extensions of degree qr, where q and r are distinct primes.