Search results
Results From The WOW.Com Content Network
The args are passed through to the module-- from the template page, so use the args that were passed into the template. args = frame. args else-- We're being called from another module or from the debug console, so assume-- the args are passed in directly. args = frame end-- if the message parameter is present but blank, change it to nil so ...
Copy the null module to the default modulefiles directory to have it shown by "module avail". The following uses the null and module-info modules to show use of a version file within a hierarchical organization and their effect on module avail and module show:
The args are passed through to the module-- from the template page, so use the args that were passed into the template. args = frame. args else-- We're being called from another module or from the debug console, so assume-- the args are passed in directly. args = frame end-- if the message parameter is present but blank, change it to nil so ...
A module must have an initializer function that is equivalent to, or complementary to an object constructor method. This feature is not supported by regular namespaces. A module must have a finalizer function that is equivalent to, or complementary to an object destructor method. This feature is not supported by regular namespaces.
In algebra, a module homomorphism is a function between modules that preserves the module structures. Explicitly, if M and N are left modules over a ring R , then a function f : M → N {\displaystyle f:M\to N} is called an R - module homomorphism or an R - linear map if for any x , y in M and r in R ,
A merge module is a special kind of Windows Installer database that contains the components needed to install a discrete software bundle. [1] A merge module cannot be installed alone, but must be merged into a standard Windows Installer installation during the creation of the installation.
An R-module M is flat if and only if the following condition holds: for every map :, where is a finitely generated free R-module, and for every finitely generated R-submodule of , the map factors through a map g to a free R-module such that () =:
An indecomposable module is a module that is not a direct sum of two nonzero submodules. Azumaya's theorem states that if a module has an decomposition into modules with local endomorphism rings , then all decompositions into indecomposable modules are equivalent to each other; a special case of this, especially in group theory , is known as ...