Let $(R,m)$ be a Noetherian local ring􀀀, $M$ and $N$ finite $R$-modules, $p$ a prime ideal,􀀀 and $I$ an ideal such that $IM\neq M$. 

**Definition**: The common length of the maximal $M$-sequences in $I$ is called the grade of $I$ on $M$;􀀀 denoted by $grade(I,M)$.  

􀀀$grade(m,M)$ is denoted by $depth\ M$. So by $depth\ M_p$, we mean 􀀀$grade(pR_p,M_p)$.  

> Assuming  $depth\ M\ge depth\ N$, what can one say about $depth\ M_p$ and $depth\ N_p$? Is there any inequality between them?  

> What if we impose additional assumptions on $M$ and $N$? For example, if $M=R/I$ and $N=R/J$?

Thank you.