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Jun 22 
answered  Z3 int2bv operation 
May 6 
revised 
Incorrect result with Z3 SMT and Python
deleted 167 characters in body 
May 6 
answered  Incorrect result with Z3 SMT and Python 
Apr 13 
revised 
How to get rid of solutions with 0.0 in SBV
added 221 characters in body 
Apr 4 
revised 
Directly generating specific subsets of a powerset?
edited body 
Apr 4 
answered  Directly generating specific subsets of a powerset? 
Mar 30 
answered  How to get rid of solutions with 0.0 in SBV 
Mar 30 
comment 
How to get rid of solutions with 0.0 in SBV
@ThomasM.DuBuisson is making a good point: A good alternative is to extract results and discard the ones on the Haskell side. Of course, having the predicates available is the better choice. One goal of SBV is to make everything available to the user so arbitrary programs can be written to construct problems and process output models, so I'd like to know if you try that and have any issues. 
Mar 26 
comment 
How to get rid of solutions with 0.0 in SBV
SBV has a few recognizers for floatingpoint: isFPPoint (recognizes point floats, i.e., no NaNs or Infinities), isSNaN (which recognizes NaNs), and we can definitely add isSNegativeZero/isSPositiveZero etc. to the mix. In the mean time, the above solution is adequate, but it's actually costly since it involves arithmetic and comparisons for this trivial test that the underlying solver can implement much more efficiently. Feel free to submit a ticket at the SBV github page and I'll add it in the next release (github.com/LeventErkok/sbv/issues). 
Mar 25 
comment 
Structural induction for multiway (rose) trees
@dfeuer Andy's brilliant paper from 1994 is the canonical reference for coinduction in FP, and it is highly readable: marcellodesalescsresearch.googlecode.com/svn/trunk/… Note that in the context of Haskell, it essentially amounts to proving P(bottom) holds, since data and codata are the same in Haskell. 
Mar 24 
comment 
What's an easy way to generate an SBV formula given some data using Haskell?
There are many ways to solve this problem, and while I do not think this is idiomatic SBV/Haskell, if it works for you then it's the best solution. Regarding the use of &&& in a chain: What you're looking for is the bAnd function: hackage.haskell.org/package/sbv4.2/docs/src/… SBV will internally "optimize" these nested calls by partial evaluation whenever possible, and usually such boolean constraints will have no visible effect on the underlying SMT solvers performance.

Feb 4 
revised 
A data structure for Logical Expressions in Haskell
Updated to drop the reference to `Property Bool` as suggested by cirdec. 
Feb 4 
comment 
A data structure for Logical Expressions in Haskell
Ah, quite right. If the 'a' parameter is just indexing into variables, then indeed it would be easy to translate this to a SAT/SMT problem, and use an offtheshelf solver to do the equivalence checking. Also note that the backend solver will return a counterexample model if the two formulas are not equivalent, which can then be used further. i.e.; the "notequal" answer will be substantiated with a model that shows why the equivalence fails instead of a plain "no" answer. 
Feb 4 
answered  A data structure for Logical Expressions in Haskell 
Feb 3 
revised 
Polymorphic Functions in SMTLIB2 / Z3
added 2 characters in body 
Feb 3 
revised 
Polymorphic Functions in SMTLIB2 / Z3
added 2 characters in body 
Feb 3 
answered  Polymorphic Functions in SMTLIB2 / Z3 
Sep 9 
awarded  Yearling 
Aug 3 
comment 
FMA: proof performance
I'd have thought you'd have a rewrite rule fma(x,y,0) = x*y under certain conditions satisfied by x and y , but I do understand oneoff rules such as these are unlikely to help for arbitrary benchmarks.

Aug 2 
accepted  FMA: proof performance 