5 Commits

Author	SHA1	Message	Date
Peter Boyle	5e370db6c5	Sizable improvement in multigrid for unsquared. ... 6000 matmuls CG unprec 2000 matmuls CG prec (4000 eo muls) 1050 matmuls PGCR on 16^3 x 32 x 8 m=.01 Substantial effort on timing and logging infrastructure	2015-07-24 01:31:13 +09:00
Peter Boyle	b0873e7ed2	Conjugate residual algorithm; some more unary functions	2015-06-08 12:04:59 +01:00
Peter Boyle	7678fbd30d	PartialFraction Hw with Zolo and Tanh approx converged under CG and passed EO breakdown ... and hermiticity tests.	2015-06-04 13:28:37 +01:00
Peter Boyle	f9b070d64d	Reorganise of file naming	2015-06-03 12:47:05 +01:00
Peter Boyle	0bc004de7c	Domain wall fermions now invert ; have the basis set up for ... Tanh/Zolo * (Cayley/PartFrac/ContFrac) * (Mobius/Shamir/Wilson) Approx Representation Kernel. All are done with space-time taking part in checkerboarding, Ls uncheckerboarded Have only so far tested the Domain Wall limit of mobius, and at that only checked that it i) Inverts ii) 5dim DW == Ls copies of 4dim D2 iii) MeeInv Mee == 1 iv) Meo+Mee+Moe+Moo == M unprec. v) MpcDagMpc is hermitan vi) Mdag is the adjoint of M between stochastic vectors. That said, the RB schur solve, RB MpcDagMpc solve, Unprec solve all converge and the true residual becomes small; so pretty good tests.	2015-06-02 16:57:12 +01:00