Activity
From 18 Jan 2015 to 16 Feb 2015
13 Feb 2015
- 20:59 Feature #24: object files collected in one directory
- Right now I do not recall why we think it is a good idea to have all object files in a single directory.
Pro:
* e... - 20:37 Feature #24: object files collected in one directory
- Here is an example I found on the internet; it uses GNU make's VPATH facility:...
- 20:46 Feature #664: Impl small non-prime finite fields (using logs)
- When char=2 we can readily use (binary) integers to represent field elements.
The idea is to find a generator @theta... - 20:41 Feature #665: Integrate Janet/Pommaret basis code
- Mario will try to put all his source code in his own namespace (perhaps called @involutive@), and will put all his fi...
12 Feb 2015
- 10:33 Feature #651: Optimized algorithms for implicitization (slicing algorithm, elim, subalgebra..)
- I changed all ring names into Kt and Kx in TmpImplicit.C
11 Feb 2015
- 17:42 Feature #665 (In Progress): Integrate Janet/Pommaret basis code
- Integrating Janet/Pommaret basis into CoCoALib and CoCoA-5
What Mario will do:
* think about good names for JBMil... - 17:39 Feature #664 (Resolved): Impl small non-prime finite fields (using logs)
- Impl small non-prime finite fields (?using log/exp tables?)
Werner+Mario would like these ASAP; especially with ch...
23 Jan 2015
- 13:50 Feature #661: Laurent polynomials
- There are two cases to consider:
* dense univariate
* sparse multivariate
One "easy" solution is to use existing da... - 13:48 Feature #661 (New): Laurent polynomials
- I propose adding a @LaurentPolynomial@ ring extension.
22 Jan 2015
- 19:08 Feature #658: Indets actually in a poly (or vector or matrix)
- John Abbott wrote:
> If the answer is *yes* then we must decide some things:
> * what is the answer? List of polys... - 15:46 Feature #658: Indets actually in a poly (or vector or matrix)
- If the answer is *yes* then we must decide some things:
* what is the answer? List of polys which are actually inde... - 15:43 Feature #658 (Closed): Indets actually in a poly (or vector or matrix)
- Should we have a function which says which indets actually appear in a polynomial?
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