The reason is that you have to escape the `HoldPattern`

, perhaps with Verbatim:

```
In[11]:= Cases[dvs,
Verbatim[RuleDelayed][
Verbatim[HoldPattern][HoldPattern[f[_Integer]]], _]]
Out[11]= {HoldPattern[f[1]] :> 1, HoldPattern[f[2]] :> 2}
```

There are just a few heads for which this is necessary, and `HoldPattern`

is one of them, precisely because it is normally "invisible" to the pattern-matcher. For your `temporary`

, or other heads, this wouldn't be necessary. Note by the way that the pattern `f[_Integer]`

is wrapped in `HoldPattern`

- this time `HoldPattern`

is used for its direct purpose - to protect the pattern from evaluation. Note that `RuleDelayed`

is also wrapped in `Verbatim`

- this is in fact another common case for `Verbatim`

- this is needed because `Cases`

has a syntax involving a rule, and we do not want `Cases`

to use this interpretation here. So, this is IMO an overall very good example to illustrate both `HoldPattern`

and `Verbatim`

.
Note also that it is possible to achieve the goal entirely with `HoldPattern`

, like so:

```
In[14]:= Cases[dvs,HoldPattern[HoldPattern[HoldPattern][f[_Integer]]:>_]]
Out[14]= {HoldPattern[f[1]]:>1,HoldPattern[f[2]]:>2}
```

However, using `HoldPattern`

for escaping purposes (in place of `Verbatim`

) is IMO conceptually wrong.

**EDIT**

To calrify a little the situation with `Cases`

, here is a simple example where we use the syntax of `Cases`

involving transformation rules. This extended syntax instructs `Cases`

to not only find and collect matching pieces, but also transform them according to the rules, right after they were found, so the resulting list contains the transformed pieces.

```
In[29]:= ClearAll[a, b, c, d, e, f];
Cases[{a, b, c, d, e, f}, s_Symbol :> s^2]
Out[30]= {a^2, b^2, c^2, d^2, e^2, f^2}
```

But what if we need to find elements that are themselves rules? If we just try this:

```
In[33]:= Cases[{a:>b,c:>d,e:>f},s_Symbol:>_]
Out[33]= {}
```

It doesn't work since `Cases`

interprets the rule in the second argument as an instruction to use extended syntax, find a symbol and replace it with `_`

. Since it searches on level 1 by default, and symbols are on level 2 here, it finds nothing. Observe:

```
In[34]:= Cases[{a:>b,c:>d,e:>f},s_Symbol:>_,{2}]
Out[34]= {_,_,_,_,_,_}
```

In any case, this is not what we wanted. Therefore, we have to force `Cases`

to consider the second argument as a plain pattern (simple, rather than extended, syntax). There are several ways to do that, but all of them "escape" `RuleDelayed`

(or `Rule`

) in some way:

```
In[37]:= Cases[{a:>b,c:>d,e:>f},(s_Symbol:>_):>s]
Out[37]= {a,c,e}
In[38]:= Cases[{a:>b,c:>d,e:>f},Verbatim[RuleDelayed][s_Symbol,_]:>s]
Out[38]= {a,c,e}
In[39]:= Cases[{a:>b,c:>d,e:>f},(Rule|RuleDelayed)[s_Symbol,_]:>s]
Out[39]= {a,c,e}
```

In all cases, we either avoid the extended syntax for `Cases`

(last two examples), or manage to use it to our advantage (first case).