Let KG be a group algebra of a finite p-group G over the field K of characteristic p, and let V(KG) be the normalized unit group of KG. The pc-presentation of the group V(KG) can be computed using the **GAP** package **LAGUNA** (https://gap-packages.github.io/laguna/), but for groups of orders 64 and more such computation will already take a lot of time.

The **UnitLib** package is an extension of the **LAGUNA** package that is focused on this problem. It contains the library of normalized unit groups of modular group algebras of finite p-groups over the field of p elements. This allows the user to retrieve the pre-computed group from the library instead of the time-consuming computation. The group created with **UnitLib** will have the same properties and attributes as the one computed with **LAGUNA**.

The version **UnitLib** 3.0.0 released in May 2009 also contained a parallel implementation of the computation of the normalized unit group of a modular group algebra of a finite p-group over the field of p elements, which works for groups from the **GAP** small groups library. It is developed on the base of the sequential version of this algorithm (which works for any p-group with no limitations) from the **LAGUNA** package. Parallelisation is implemented using the **SCSCP** package that is capable of connecting several local or remote **GAP** instances using the **SCSCP** protocol.

In April 2012, **UnitLib** 3.1.0 was updated to comply with **GAP** 4.5.

The current version of **UnitLib** provides the library of normalized unit groups V(KG) for all p-groups of order less than 243 in the package distribution. The data for order 243 is available as an optional download.

If you need to work with groups of bigger orders, please write to the maintainers, because they may be already computed or we can compute them for you.

Since the **UnitLib** package is an extension of the **LAGUNA** package [BKRS], we refer to the LAGUNA: LAGUNA package manual for the theoretical backround. In particular, Chapter 3 (The basic theory behind **LAGUNA**) of that manual contains definitions of the modular group algebra and its normalized unit group, the power-commutator presentation of the group, and also more details about the algorithm for the computation of the pc-presentation of the normalized unit group of a modular group algebra of a finite p-group.

**UnitLib** 4.1.0 requires at least **GAP** 4.10. The libraries of normalized unit groups of groups of orders less than 243 are included in the distribution. The data for order 243 is available as an optional download.

Because the **UnitLib** is an extension of the **LAGUNA** package, you must have the **LAGUNA** package installed. You can obtain it from the **GAP** homepage or from its homepage https://gap-packages.github.io/laguna/.

To use the **UnitLib** online help it is necessary to install the **GAP**4 package **GAPDoc** by Frank Lübeck and Max Neunhöffer, which is available from the **GAP** homepage or from http://www.math.rwth-aachen.de/~Frank.Luebeck/GAPDoc/.

**UnitLib** is distributed in standard formats (`tar.gz`

, `tar.bz2`

, `.zip`

, `-win.zip`

) and can be obtained from the **GAP** homepage or from https://gap-packages.github.io/unitlib/. To install **UnitLib**, unpack its archive into the `pkg`

subdirectory of your **GAP** installation. When you don't have access to the directory of your main **GAP** installation, you can also install the package *outside the GAP main directory* by unpacking it inside a directory

`MYGAPDIR/pkg`

. Then to be able to load `-l ";MYGAPDIR"`

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