Expand description
A hash map implemented with quadratic probing and SIMD lookup.
Structs§
- A draining iterator over the entries of a
HashMap
in arbitrary order. The iterator element type is(K, V)
. - A draining iterator over entries of a
HashMap
which don’t satisfy the predicatef(&k, &mut v)
in arbitrary order. The iterator element type is(K, V)
. - A hash map implemented with quadratic probing and SIMD lookup.
- An owning iterator over the entries of a
HashMap
in arbitrary order. The iterator element type is(K, V)
. - An owning iterator over the keys of a
HashMap
in arbitrary order. The iterator element type isK
. - An owning iterator over the values of a
HashMap
in arbitrary order. The iterator element type isV
. - An iterator over the entries of a
HashMap
in arbitrary order. The iterator element type is(&'a K, &'a V)
. - A mutable iterator over the entries of a
HashMap
in arbitrary order. The iterator element type is(&'a K, &'a mut V)
. - An iterator over the keys of a
HashMap
in arbitrary order. The iterator element type is&'a K
. - The error returned by
try_insert
when the key already exists. - A builder for computing where in a
HashMap
a key-value pair would be stored. - A builder for computing where in a
HashMap
a key-value pair would be stored. - A view into an occupied entry in a
HashMap
. It is part of theRawEntryMut
enum. - A view into a vacant entry in a
HashMap
. It is part of theRawEntryMut
enum. - A view into a vacant entry in a
HashMap
. It is part of theEntry
enum. - A view into a vacant entry in a
HashMap
. It is part of theEntryRef
enum. - An iterator over the values of a
HashMap
in arbitrary order. The iterator element type is&'a V
. - A mutable iterator over the values of a
HashMap
in arbitrary order. The iterator element type is&'a mut V
.
Enums§
- A view into a single entry in a map, which may either be vacant or occupied.
- A view into a single entry in a map, which may either be vacant or occupied, with any borrowed form of the map’s key type.
- A view into a single entry in a map, which may either be vacant or occupied.