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dk||\} } t | dk||| \} } t | dk|| \}} } t | dkt || ddqdS) Nrrp)rsygstsyevdsygvdrrMrgiUMu?r) rrrr&rr/rsr-r rr)rr1rrrrrrBeig_gvdr<rerr]eigr2r2r3 test_sygsts(      rcCs*tdttD]\}}d}td|d\}}}}t|||dt|||}||jd}t|||dt|||}||jddtj ||d}|||\} } } t | dk||\} } t | dk||| \} } t | dk|| \}} } t | dkt || dd qdS) Nrrp)rhegstheevdhegvdrr+rMr-C6?r) rrr,r&rr/rrsr-r rr)rr1rrrrrrrrr<rerr]rr2r2r3 test_hegst s($$$     rc sltdd\}}ttD]\}}td|d\}}t|||}|dkr-tt|||}ntt||t||d|}tt ||j |||d\}} t | dkt |d d d |ft j|||f|df} t t j||d|d d |d fft j||dfd d t|D} tt j| } t| | |t||dd t |d jddq d S)z This test performs an RZ decomposition in which an m x n upper trapezoidal array M (m <= n) is factorized as M = [R 0] * Z where R is upper triangular and Z is unitary. rrptzrzf tzrzf_lworkrrMr+rrNc Dg|]}||gddfj|gddfqSNrsrrrAIdVrnr2r3r?HDztest_tzrzf..rprrr)rrrr&r!rrr/rrrsrr-rr r r!rrrr spacingr) rrrr1rtzrzf_lwrrrzrer|rZr2rr3 test_tzrzf,s, " 0( rc CstdttD]\}}d}|dkr*tt||t||dt||}d}ntt||t||}d}td|d\}}}||\}} t|d |} |d || } t| t | | |d d krfd nd d|d || |d} t| t | j | |d d krd nd d|d|t |t |f<|d || |dd} t| t | j | |d d krd nd dtd||} |d || |ddd} t| t | | j  j |d d krd nd dqdS)z Test for solving a linear system with the coefficient matrix is a triangular array stored in Full Packed (RFP) format. rrrLr+rvrs)trttftfttrtfsmrrMr{rrOrQryrrr@)rrrNr|)rrr~N)rrrrrr r/r&rrrrsr-r) rr1rrrrrrAfpr<rsolnB2r2r2r3 test_tfsmNs@*  rc s~tdd\}}}ttD].\}}td|d\}}t|||}|dkr?tt|||}t|||} td|d\} } n(tt||t||d|}t||t||d|} td|d\} } t| ||} |||d \} }t tj ||d| d d |d fftj ||dfd d t |D}t tj |}|dkrd nd}dt|dj}| | | | d \}}t|dkt|| | t| |dd| | | || d\}}t|dkt||j | t| |dd| | | d| d\}}t|dkt|| |t| |dd| | | d|| d\}}t|dkt|| |jt| |ddq d S)a This test performs a matrix multiplication with an arbitrary m x n matrix C and a unitary matrix Q without explicitly forming the array. The array data is encoded in the rectangular part of A which is obtained from ?TZRZF. Q size is inferred by m, n, side keywords. r)rprrrrrM)ormrz ormrz_lworkr+)unmrz unmrz_lworkrNc rrrrArr2r3r?rz$test_ormrz_unmrz..rsrvrprrrrrr|)r~r)r~rr)rrrr&r!rrr/r-rr r!rrrrrrr rrs)qmqncnrr1rrlwork_rzrrvorun_mrz orun_mrz_lw lwork_mrzrrerrrtolcqr2rr3test_ormrz_unmrzwsV   " (     rc CstdttD]t\}}d}|dkr%t||t||d|}d}n t|||}d}td|d\}}||\}}t|d k||d d \} }t|d k|||d d \} }t|d k|||d d \} }t|d kt|d|df|d} t|dd|ddf| ddddf<| |dddddft|d|dd|df j 7<t|d|df|d} t |ddd|df| ddddf<| d|dddft ||dd|ddf j 7<t || j dddt | | j j dddt | | j dddt | | j j ddd|||\}}t|d k||| d d \}}t|d k||| |d d \}}t|d k||| |d d \}}t|d kt |t|t |t|t |t |t |t |qdS)z Test conversion routines between the Rectengular Full Packed (RFP) format and Standard Triangular Array (TR) rrrLr+rvrs)rrrrr4r7r@)transrr7rMNr{F)order)rrrrr/r&rr rrrsrrreshape)rr1rA_fullrrrA_tf_UreA_tf_LA_tf_U_TA_tf_L_TA_tf_U_mA_tf_L_mA_tr_UA_tr_LA_tr_U_TA_tr_L_Tr2r2r3test_tfttr_trttfsX     ,F,B    rcCsrtdttD]\}}d}|dkr"t||t||d|}nt|||}td|d\}}||\}}t|dk||dd \}}t|dkt|} t||dd |d} t |j | | d d <t |} t||dd |d} t |j | | d d <t || t || |||\} }t|dk|||dd \} }t|dkt | t |t | t |qd S) rrrrLr+)trttptpttrrrr4rrMN)rrrrr/r&rrr rrsrrr)rr1rrrrA_tp_UreA_tp_LindsA_tp_U_mA_tp_L_mrrr2r2r3test_tpttr_trttps4        rc CstdttD]f\}}d}|dkr/t||t||d|}||j|t|}nt|||}||j|t|}td|d\}}}||\}}|||\} }t |dk||| \} } t |} t | | qdS) zk Test Cholesky factorization of a positive definite Rectengular Full Packed (RFP) format array rrrLr+)pftrfrrrrN) rrrrr/rrsr r&rrr) rr1rrrrrrre Achol_rfpA_chol_rr<Acholr2r2r3 test_pftrfs$   rcCs tdttD]z\}}d}|dkr/t||t||d|}||j|t|}nt|||}||j|t|}td|d\}}}}||\}} |||\} } ||| \} } t | dk||| \} } t |}t | t ||ddkr~d nd d qd S) z Test Cholesky factorization of a positive definite Rectengular Full Packed (RFP) format array to find its inverse rrrLr+)pftrirrrrrrMrOrQryN) rrrrr/rrsr r&rrrr)rr1rrr rrrrre A_chol_rfp A_inv_rfpA_inv_rr<Ainvr2r2r3 test_pftri/s*   r%cCs\tdttD]\}}d}|dkr/t||t||d|}||j|t|}nt|||}||j|t|}t|df|d}t|ddf|d}t|ddf|d}t d|d\}}} } | |\} } ||| \} } ||| |\}} t | d kt t ||| |||| |\}} t | d kt t||||dd krd nd d qd S)z Test Cholesky factorization of a positive definite Rectengular Full Packed (RFP) format array and solve a linear system rrrLr+rNrrM)pftrsrrrrrOrQryN)rrrrr/rrsr r r&rrrrr)rr1rrrBf1Bf2r&rrrrrer!rr2r2r3 test_pftrsOs2    r)c Cs0tdttD]\}}d}|dkr/t||t||d|}||j|t|}nt|||}||j|t|}|dkrHdnd}tdd |d f|d \}}}||\}} t j |d|} ||dd | d|} ||| \} } t | t | | j d||dd krdnddqdS)zT Test for performing a symmetric rank-k operation for matrix in RFP format. rrrLr+rMrhrrfrkrr{rrOrQryN)rrrrr/rrsr r&r-r.rrr) rr1rrprefixrrshfrkrr<rvAfp_outA_outr2r2r3test_sfrk_hfrkts(  r0cCstdttD]\}}d}|dkr/tdd||ftdd||fd|}||j}ntdd||f|}||j|t|}dt |dj }t d |d \}}}t ||dd }t |dd d \} } } t ||dd }||d|d\} } }|| | dd \}}}tt|dt| | ddfd|ddt |dd d \}} } ||dd \} } }|| | dd \}}}tt|dt|| ddfd|ddqdS)zt Test for going back and forth between the returned format of he/sytrf to L and D factors/permutations. rrprLir+rr)syconvrrrrF)r  hermitianrr{Nrrr)rrrrr/rrsr r-rrr&r!rrrr)rr1rrrr2trf trf_lworklwr4Dpermrrrer]rr@r2r2r3 test_syconvs6 (*r9c@s eZdZdZddZddZdS) TestBlockedQRzd Tests for the blocked QR factorization, namely through geqrt, gemqrt, tpqrt and tpmqr. c Cs.tdttD] \}}d}|dkr#t||t||d|}nt|||}dt|dj}td|d\}}|||\}} } | d ksKJt |d tj ||d} tj ||d| | | j } t |} t| j | tj ||d|d d t| | ||d d |dkrt||t||d|}d }n t|||}d}dD]T}d|fD]M}||| |||d\}} | d ksJ||kr| j }n| }|dkr||}n||}t|||d d ||fdkr||| |\}} | d ksJt||qqtt||| |ddtt||| |ddqdS)NrrrLr+rr)geqrtgemqrtrrr{rrrvrsr4r|r=r~rr4r4r=rr}r)rrrrr/r-rrr&rr rsrrrrrr)r\rr1rrrr;r<r]trerrr|rv transposer~rrqqC c_defaultr2r2r3test_geqrt_gemqrtsT           zTestBlockedQR.test_geqrt_gemqrtc CstdttD]\}}d}|dkr2t||t||d|}t||t||d|}nt|||}t|||}dt|dj}td|d\}}d |d |fD]t} || |||\} } } } | d ksoJt t | d t |d t t | | |dt || |dt || |t | | |}}t tj ||d|f}tj d ||d|| |j}t t | t| f}t|j|tj d ||d|d d t||t t ||f|d d |dkrt||t||d|}t||t||d|}d}nt|||}t|||}d}dD]}d|fD]}|| | | ||||d\}}} | d ksJJ||krU|j}n|}|dkrstj ||fd d}tj ||fd d}||}ntj ||fdd}tj ||fdd}||}t|||d d ||fdkr|| | | ||\}}} | d ksJt ||t ||q3q-tt|| | | ||ddtt|| | | ||ddq[qdS)NrrrLr+rr)tpqrttpmqrtrrrMr{rrrvrsr=r=r>r4rr?rr}r)rrrrr/r-rrr&rrrr r rsrr rrr) r\rr1rrrrrFrGlr]rr@reB_pentb_pentrrr|rvr7rAr~rrrkrBcdCDqCDrD d_defaultr2r2r3test_tpqrt_tpmqrtsx  *"$         zTestBlockedQR.test_tpqrt_tpmqrtN)rrrr=rErOr2r2r2r3r:s >r:cCtdttD]\}}d}d}td|d}|dkr8t||||dt||||}||j}nt||||}||j}||\}}}} t|} d| ||d||df<t | dd t t j j } d t t jj } |d vr~| n| } t||ddd|df| j| d| d ||dd \}}}} t|}d|||d||df<t | dd t t j j } d t t jj } |d vr| n| } t||ddd|df||jd| d qdS) NrrprMpstrfrrLr+rrrMr9rrrrr&rr/rrsrrr-rrrr$rr)rr1rrirQrrpivr_crer@ single_atol double_atolrr4r2r2r3 test_pstrfI6 ,  2 4rYcCrP) NrrprMpstf2rrLr+rrRrSr9rrT)rr1rrir[rrrUrVrer@rWrXrr4r2r2r3 test_pstf2qrZr\c CsVtgdgdgdgdg}tgdgdgdg}ttD]\}}|dkrBtgd gd gd gd g}||}n'tjgd gdgdg|d}|tgdgdgdgd7}||}td|d}||\}}}} } } |dkrt|||dddf||dddq#t|||dddf||dddq#dS)N)g?rg1w-!?gd`TRۿ)rgsrr)gs?rg2%䃮g,eX)rgsFg%ug??)y/nҿ&?yDioɴ?Af?y o_[ Acп)ysֿAfҿyPkw?JY8y5;NёCl?)yYڊ?1*?y=yXѿ@a+?yhoſFxrM)gЈBgtBgffffff@gٓ)@gg#fDgffffff)gHzG?gQg'Vgp= ף)g(\rgS7нrb)gq= ףpgAg(\)g333333gBg333333ÿ)gZ9=gQgֽr)gffffff@gtޅBr)g(\g Zgq= ףp?)gEop=gQ?gZEqҽr+geequrrr9)r-r}rrr/r&r) desired_real desired_cplxrr1rr^rirrowcndcolcndamaxrer2r2r3 test_geequsP           rdc stgd}ttD]I\}}tjd|d}||dkrdndtjfddtd d D|d}|tt|7}td |d}||\}}}} t t | t |q dS) N) rrrrrrr{r{rr2rprrMrr+csg|]}d|qS)rr2rArr2r3r?rCztest_syequb..rPsyequb) r-r}rrr r!rot90rr&rlog2r/r) desired_log2srr1rrkrgrscondrcrer2rer3 test_syequbs" rlTz.Failing on some OpenBLAS version, see gh-12276)reasonc Cstdgddgdtjtdddd}t|\}}}}t|dtt|d d gdd gd gdtdtt d d d}d|d<d|d<tj | tj dd\}}}}t|dtt|gddS)NrMrPirTrL)rTr+rrrrfrQirPrPy0@)rPrr) rr{r{rrrfrr{r{rr) r-rr rzheequbrrrirrcheequbr/ complex64)rrrkrcrer2r2r3 test_heequbs2 (  rtcCs:tjdd}tj|}tj|tj|d}ttD]z\}}|dkr>tj||}||}||}||}ntj||tj||d}||}||}||}td|d}td|d}||dd \} } } } || || | dd \} }|dkrt||| |d d q t||| |d d q dS) Nrrpr+rMgetc2rgesc2rr) overwrite_rhsrOry) r-r.rrrrr/r&r)rr_r`rr1rrrurvlurjpivrerrXr2r2r3test_getc2_gesc2s4           r{r)rQrPrpjobarQjoburOjobvjobrrLjobpc Cstd|\}} dt|j} t||} td|d} |dk} |dk}|dko*|| k}t| }|dko9| o9| }|dkoD|oA| oD|}|dkoO| oL| oO|}|rUd}n |sY|r\d}nd }|dkrt|dkrttt| | |||||| d S| | ||||||d \}}}}}}t |||s |d |d|d | }t |t | d d | d|dkr|d d d | f}| r|rt |t || j| | d| rt | j|t| | d|rt | j|t| | dt |d tj| t |dt|t |dd d Sd S)aTest the lapack routine ?gejsv. This function tests that a singular value decomposition can be performed on the random M-by-N matrix A. The test performs the SVD using ?gejsv then performs the following checks: * ?gejsv exist successfully (info == 0) * The returned singular values are correct * `A` can be reconstructed from `u`, `SIGMA`, `v` * Ensure that u.T @ u is the identity matrix * Ensure that v.T @ v is the identity matrix * The reported matrix rank * The reported number of singular values * If denormalized floats are required Notes ----- joba specifies several choices effecting the calculation's accuracy Although all arguments are tested, the tests only check that the correct solution is returned - NOT that the prescribed actions are performed internally. jobt is, as of v3.9.0, still experimental and removed to cut down number of test cases. However keyword itself is tested externally. rrgejsvrrMrLrr2r)r|r}r~rjobtrNF)rrm)rr-rrr4r&rcrrrrrrrrsidentityr matrix_rank count_nonzero)rr1r|r}r~rrrrrrrrlsvecrsvecl2tran is_complexinvalid_real_jobvinvalid_cplx_jobuinvalid_cplx_jobv exit_statussvarvrrrresigmar2r2r3test_gejsv_generalsV!    "rc CsXtd|d}|d\}}}}}}t|dt|jdt|jdt|tjdg|dtjd|d}||\}}}}}}t|dt|jdt|jdt|tjdg|dtjd|d}||\}}}}}}t|dt|jdt|jdt|tjg|dttdd d  |}t ||j }| d } ||} t || d S) z*Test edge arguments return expected statusrrrrrLrLrLr{rrprN)r&rr0r-r}r sinrrr/asfortranarrayrsrr) r1rrrvrrrrerAcr<r2r2r3test_gejsv_edge_argumentsts.           rkwargsrTrcCs2tjdtd}tdtd}tt||fi|dS)z-Test invalid job arguments raise an Exception)rMrMrrNrZ)rrrr2r2r3 test_gejsv_invalid_job_argumentss rzA,sva_expect,u_expect,v_expect)g)\(@gp= ףgffffff?g ףp= )gQ?gQgGz?g(\)gQ޿gQgGz?gzGʿ)gQ?gQ?gHzG?g)\(?)ggq= ףp@g333333r)ףp= ?g(\rg(\)g cZB#@gI.!v @g?ܵ?r)gC?g=yX5gc=yXga4?)gB`"?g:pΈҞgʡE?gn4@?)g[B>٬?g٬\m?gJ{/L?g Oe?)gc]Fgꕲ q׿g\m?fc]F)g؁sFڿgZB>?g0L F%?gq= ףp)g?gR!u?guVſg&Sٿ)gǘ?gV-g ^)p?g( )gFx $g6[ ٿgUN@giq?)g1Zd?gOnӿgΈ ?g_vO?)g}?5^Iؿg58EGr?gio?g7[ Ac CsTd}td|jd}||\}}}} } } t|||dt|||dt|||ddS)z~ This test implements the example found in the NAG manual, f08khf. An example was not found for the complex case. rrrrmN)r&r1r) r sva_expectu_expectv_expectrrrrvrrrrer2r2r3test_gejsv_NAGs rc! Cstdd}dt|j}t|df|d}t|f|d}t|df|d}|||g}t|t|dt|d}tj|}||} t d|d\} } | |||\} } }}}}t ||dt ||dt ||d t| dt|dt|d }tj ||d}t | D]2\}}||d}|dd||gf|dd||gf<|dd|f|dd|df|7<qd|dd}}|dd||gf|dd||gf<t ||||d | }| | | |||| \}}t | |t |||d |tvrd }|j|}n d }|j|}| | | |||||d \}}t |||d tt| |dd||Wdn 1sIwYtt| ||dd|Wdn 1shwYtt| |||ddWdn 1swYtt| |d|dd|dWdn 1swYd|d<d|d<| |||\}}}}}} tj||ddkd||ddS)NrrprrLrr{gttrfgttrsrrMrmrsrvrz3?gttrf: _d[info-1] is {}, not the illegal value :0.)rr-rrr4rrr.rr&rr rrrrsrrr:rtestingrrF)!r1rrdurkdldiag_cpyrrrrr_dl_d_dudu2rrer@r4r-rrUb_cpyx_gttrsrb_trans__dl__d__du_du2_ipiv_infor2r2r3test_gttrf_gttrssl" $ $.$       rz1du, d, dl, du_exp, d_exp, du2_exp, ipiv_exp, b, x)g@rffffff?r)rrffffff@)333333 @ @r)rrfrr)rrrRgC>)r{rrS)rMrNrOrPrPg@gffffff@g%@g@g ragffffff&g3@rnrPrRrNr2r)@@???)?rffffff @333333ӿ333333@ffffff ?)???@r)rrrr)rrrry~:pffffff?)rrry333333@y@@y333333 @3333332@y333333yffffff-ffffff#@y333333yfffff?@y333333"@y𿚙?yffffff(@rry@y?@y@@ryrry@c Cstd|d|df\} } | |||\} } } }}}t||t| |t| |ddt||| | | | |||\}}t||dS)Nrrrrm)r&r)rrkrdu_expd_expdu2_expipiv_exprrrrrrrrrrerr2r2r30test_gttrf_gttrs_NAG_f07cdf_f07cef_f07crf_f07csf&s2   r))rNrR)rRrNrcCr)N geqrfp_lworkrrrr)r1r0rrrrrer2r2r3test_geqrfp_lworkerrz ddtype,dtypecCs`tddt|j}d}t|f|d}t|df|}t|t|dtt|d}||g}td|d}|||\} } } t ||d t ||dt | d d | d d t| dtt |} t| } t || | | j|d t|f|}||}td|d}|| | |\}} t | d d| d d t |||d dS)NrrrprOrLr{pttrfrrzpttrf: info = z , should be 0)err_msgrmpttrszpttrs: info = )rr-rrr4rrrr&rrr rrrs)ddtyper1rrrkrrrrr_erer4r7rrr_xr2r2r3test_pttrf_pttrsns*(    rcCs`d}td|d}t|f|d}t|df|}tt||dd|tt|||dddS)NrprrrMrLr{)r&r4rr:)rr1rrrkrr2r2r3*test_pttrf_pttrs_errors_incompatible_shapes  rc Csd}td|d}t|f|d}t|df|}d|d<d|d<|||\}}}t||ddd||ddt|f|}|||\}}}t|dkd dS) NrprrrMrLrz?pttrf: _d[info-1] is z, not the illegal value :0.z2?pttrf should fail with non-spd matrix, but didn't)r&r4rr) rr1rrrkrrrrer2r2r3'test_pttrf_pttrs_errors_singular_nonSPDs  rz%d, e, d_expect, e_expect, b, x_expect)rOrprrP)rrrrS)rOrTrrL)rgK=UrarrprMAg@r{rf)r).)y0@0@y2@"?)rrTrLrO)rrryP@0@y0@y@W@O@yN@PyS@TyQ@Ry,@;yA@.@yrc Csd}td|dd}|||\}} } t|||dt| ||dtd|dd} | || |\} } t| ||d|jtvrQ| || |dd\} } t| ||ddSdS) NrrrrrmrrLr)r&rrr1r,) rkrd_expecte_expectrx_expectrrrrrerrr2r2r3test_pttrf_pttrs_NAGs rc Cs|dkrUt||f|}|tt|d|}||jd}t|d}t|f|d}t|df|}t|t|dt|d}|||j} |} n4t|f|}t|df|}|d}t|t|dt|d} t|t|dt|d} ||| | fS)NrLrOrMr{)r4r-rr rrsr) r1realtyper compute_zA_eigvrrkrtrirzr2r2r3pteqr_get_d_e_A_zs  " "" rzdtype,realtypercCstddt|j}td|d}d}t||||\}}}} |||| |d\} } } } t| dd| d ttt |dt| |d |rlt| t | j t ||d t| t | t | j ||d d Sd S) a Tests the ?pteqr lapack routine for all dtypes and compute_z parameters. It generates random SPD matrix diagonals d and e, and then confirms correct eigenvalues with scipy.linalg.eig. With applicable compute_z=2 it tests that z can reform A. rrRpteqrrrprkrrrrzinfo = z, should be 0.rmN)rr-rrr&rrrsortrrrsrr)r1rrrrrrkrrrd_pteqre_pteqrz_pteqrrer2r2r3 test_pteqr s   " rc CsZtdtd|d}d}t||||\}}}}||d|||d\} } } } | dks+JdS)NrrrrprOrrrrr&r r1rrrrrkrrrrrrrer2r2r3test_pteqr_error_non_spd) s  rc Cstdtd|d}d}t||||\}}}}tt||dd|||dtt|||dd||d|rEtt||||dd|ddSdS)Nrrrrpr{r)rr&rrr:) r1rrrrrkrrrr2r2r3"test_pteqr_raise_error_wrong_shape8 s  rc Csftdtd|d}d}t||||\}}}}d|d<d|d<|||||d\} } } } | dks1JdS)Nrrrrprrrrr2r2r3test_pteqr_error_singularG s rzcompute_z,d,e,d_expect,z_expect)gp= ף@r]gq= ףp?r)g\(\ @g ףp= g?)gŏ1w- @gR'?g/n?g&䃞ͪ?)g cZB>?gCl?g:pΈڿg??)gaTR'?gSۿg}гY?g%uο)g\mg٬\m?gAf?gL F%u)gǘgŏ1w-!?g333333?gz6?c Csxd}td|jd}t|t|dt|d}|||||d\}} } } t|||dtt| t||ddS) zb Implements real (f08jgf) example from NAG Manual Mark 26. Tests for correct outputs. rrrrLr{rrmN)r&r1r-rrr) rrkrrz_expectrrrrr_zrer2r2r3test_pteqr_NAG_f08jgfV s "r matrix_size)r)rRrQrQrQc Cstjddt|j}dt|j}td|d}td|d}|\}}t||f|d}||\} } } t| } ||kr[tj||f|d} | | ddd|f<|| | |dd}n|| ddd|f| |dd}t || ||d t t |j d|| j ||d t | t| |d ttt| ttt| kt| dkt||f|dd }t|\}}||\}}}ttt|dkott| dkdS) Nrrgeqrfprorgqr)rnrrrr9r{)r-r.rrrr&r4rr rr r0rrsrallrr[rr")r1rrrrgqrrrrqr_ArnreriqqrrB A_negativer_rq_negq_rq_negrq_A_negtau_neginfo_negr2r2r3 test_geqrfpo s6    "(  r cCs(tg}td|jd}tt||dS)Nrr)r-r}r&r1rr)A_emptyrr2r2r3#test_geqrfp_errors_with_empty_array s r driver)evevdevrevxpfxsyhec Csd}|dkrtnt}t||d|dd}t||d|dd}zt||ddt||ddWdStyR}zt||d|WYd}~dSd}~ww) Nr_lworkrrrLr$_lwork raised unexpected exception: rr,r&r!rr>failrrrr1sc_dlwdz_dlwrr2r2r3test_standard_eigh_lworks s&rgvgvxc Csd}|dkrtnt}t||d|dd}t||d|dd}zt||ddt||ddWdStyR}zt||d |WYd}~dSd}~ww) NrrrrrrLr4rrrrr2r2r3test_generalized_eigh_lworks s&r!dtype_r)rLrprrRcCsxtdtd|}||}|tvrdnd}|d}t||d}t||||}|dkr,|n|f}tdd|Ds:JdS) Nrrorun csd_lworkrcSsg|]}|dkqSrr2rAr2r2r3r? sz*test_orcsd_uncsd_lwork..)rrrr&r!r)r"rr_rBrdlwr6lwvalr2r2r3test_orcsd_uncsd_lwork s  r(c Csd\}}}|tvr dnd}|dkrt|nt|}t|d|df|d\}}t||||}|dkr8d|inttddg|} ||d|d|f|d||df||dd|f||d|dffi| \ } } } } }}}}}}|d ks|Jt||}t||}t t ||t ||||}t |||}t ||||}t ||||}t |||||}t j ||f|d}|d }t |D]}||||f<qt |D] }||||||f<qt |D]}| ||||||||||f<qt |D]}|||||||||f<qt |D]N}t |||||||f<t ||||||||||f<t || ||||||||f<t ||||||||f<q|||}t||d d t |jd dS)N)rPr#r$csdr%rrlrworkrrrg@r9)rr"rvsr#r&r!dictrrrJr-r r!cosrrrr)r"rr_rBrXdrvr&r'lwvalscs11cs12cs21cs22thetau1u2v1tv2trer@VHrin11n12n21n22Soner-Xcr2r2r3test_orcsd_uncsd sJ T      , $ *,&  rD trans_boolFfactrr=c Cstddt|j}td|d\}}d}t|df|d}t|f|d}t|df|d} t|dt|t| d} t|df|d} |rR|tvrPd nd nd } |r[| j n| | } | | | | g}|d krw|||| nd gd\}}}}}}|||| | || |||||d }|\ }}}}}}}}}}t |dkd|dt ||dt ||dt | |dt | |dt | ||dt t|ddud|t |jd| jdkd|jd| jdt |jd| jdkd|jd| jdd S)aS These tests uses ?gtsvx to solve a random Ax=b system for each dtype. It tests that the outputs define an LU matrix, that inputs are unmodified, transposal options, incompatible shapes, singular matrices, and singular factorizations. It parametrizes DTYPES and the 'fact' value along with the fact related inputs. rrgtsvxrrrprLr{rMrsrvr=rNrQrFrdlfdfdufrrrz?gtsvx info = z, should be zerorNrm__len__Trcond should be scalar but is z"ferr.shape is {} but should be {},z"berr.shape is {} but should be {},)rr-rrr&r4rrrrsrrrrrr0rF) r1rErFrrHrrrrkrrrrr inputs_cpydlf_df_duf_du2f_ipiv_info_ gtsvx_outrJrKrLdu2frx_solnrferrberrrer2r2r3 test_gtsvx sB "r[c Cstdtd|d\}}d}t|df|d}t|f|d}t|df|d}t|dt|t|d} t|df|d} |tvrFdnd } |rO| jn| | } |d kr]||||ndgd \} }}}}}||||| || | ||||d }|\ }}}}}}}}}}|d krd|d<d|d<||||| }|\ }}}}}}}}}}|dksJddS|d krd|d<d|d<d|d<||||| || ||||d }|\ }}}}}}}}}}|dksJddSdS)NrrGrrprLr{rMrsrvrrQrIr=rz&info should be > 0 for singular matrix)rFrJrKrLrr)rr&r4r-rrrrs)r1rErFrHrrrrkrrrrrrPrQrRrSrTrUrVrJrKrLrWrrXrrYrZrer2r2r3test_gtsvx_error_singularO sB" r\cCs0tdtd|d\}}d}t|df|d}t|f|d}t|df|d}t|dt|t|d} t|df|d} |tvrFdnd } |rO| jn| | } |d kr]||||ndgd \} }}}}}|d krtt ||dd||| || | ||||d tt |||dd|| || | ||||d tt ||||dd| || | ||||d tt ||||| dd|| | ||||d dStt ||||| || | dd||||d tt ||||| || | |dd|||d tt ||||| || | ||dd||d tt ||||| || | |||dd|d dS)NrrGrrprLr{rMrsrvrrQr=rI) rr&r4r-rrrrsrr:r)r1rErFrHrrrrkrrrrrrPrQrRrSrTrUr2r2r3"test_gtsvx_error_incompatible_size sZ"  r]z du,d,dl,b,xc CsBtd|jd}|||||}|\ }}} } } } } }}}t|| dS)NrHrr&r1r)rrkrrrrHrVrJrKrLrWrrXrrYrZrer2r2r3test_gtsvx_NAG sr_zfact,df_de_lambdacCtd|jd||SNrrr&r1rkrr2r2r3 rdcCdSN)NNNr2rcr2r2r3rd cCstddt|j}td|d}d}t|f|d}t|df|}t|t|dtt|d} t|d f|d} | | } |||\} } }||| g}|||| || | d \} } }}}}}t ||d t ||dt | |d t |d kd |d t | |t| dtt |}t| }t | ||t|j|dt|drJd|t |jdkd|j| jdt |jdkd|j| jddS)a This tests the ?ptsvx lapack routine wrapper to solve a random system Ax = b for all dtypes and input variations. Tests for: unmodified input parameters, fact options, incompatible matrix shapes raise an error, and singular matrices return info of illegal value. rrptsvxrrPrOrLr{rMrFrKefrzinfo should be 0 but is .rmrMrN)rMz$ferr.shape is {} but should be ({},)z$berr.shape is {} but should be ({},)N)rr-rrr&r4rrrrrrr rrsrr0rF)r1rrF df_de_lambdarrirrkrrrXrrKrkrerrrrYrZr4r7r2r2r3 test_ptsvx s> (      rncCr`rarbrcr2r2r3rd recCrfrgr2rcr2r2r3rd rhc Cstdtd|d}d}t|f|d}t|df|}t|t|dtt|d}t|df|d} || } |||\} } } tt||dd|| || | d tt|||dd| || | d tt|||| dd|| | d dS) NrrirrPrOrLr{rMrj) rr&r4r-rrrr:r)r1rrFrmrirrkrrrXrrKrkrer2r2r3test_ptsvx_error_raise_errors s (  $rocCr`rarbrcr2r2r3rd. recCrfrgr2rcr2r2r3rd0 rhcCsftdtd|d}d}t|f|d}t|df|}t|t|dtt|d}t|df|d} || } |||\} } } |d krd |d <|||\} } } |||| \} } }}}}} | d kri| |kskJt|f|}|||| \} } }}}}} | d kr| |ksJdS|||\} } } d | d <d | d <|||| || | d \} } }}}}} | d ksJdS) NrrirrPrOrLr{rMr=rrNrj)rr&r4r-rr)r1rrFrmrirrkrrrXrrKrkrerrrYrZr2r2r3test_ptsvx_non_SPD_singular* s0 (  rpzd,e,b,xc Cs6td|jd}||||\}}}}} } } t||dS)Nrirr^) rkrrrrirKrkx_ptsvxrrYrZrer2r2r3test_ptsvx_NAGV srrr cstdt|jd}d\}tg|d}t|g|d}|j|tj|d|d}|rKfddtDfddtDf}nd dtd d Dd dtd d Df}||}t d |d d\}} } } } | ||d\} }t |dt ||d|}t | |d|d| | |d\}}t |dt ||}t ||d|d| | ||d\}}t |dt||}t ||d|d||||d\}}t |dt ||d|dtj|d }| |||d\}}t |dttd |tjj|d d|d kdS)Nrr)rprOrrcs g|] }t|D]}|q qSr2r!r>yrrBr2r3r?  z5test_pptrs_pptri_pptrf_ppsv_ppcon..cs g|] }t|D]}|q qSr2rsrtrBr2r3r? rvcSsg|] }t|D]}|qqSr2rsrtr2r2r3r? srLcSs"g|] }t|D]}|dqqSrrsrtr2r2r3r? s")ppsvpptrfpptrspptrippconrrrrr9)rr r)rr-rrr4rrsr r!r&rrrrrrrrrr)r1r rrr]rraprwrxryrzr{ulreaululiaulirbxxvrrr2rBr3!test_pptrs_pptri_pptrf_ppsv_ppcont sL$       ,rc Cs0tdt|jd}d}t||g|d}td|d\}}|dd|dd }t|d d |d }|d }|d } |tvrIt|t |d |dt||| j |d |d|||dd}t|d d |d }|d}|tvr}t|t |d |dt||| j |d |dt|d| d |ddS)Nrrrpr)geestrexccSdSrr2rr2r2r3rd rhz!test_gees_trexc..Frwr{rr2rr9rRrLrr) rr-rrr4r&rr,rrrrs) r1rrr]rrrr@rd2r2r2r3test_gees_trexc s*rzt, expect, ifst, ilst)rbg)\({Gz?gQ?)r皙rffffff?)rgrg?)rrrr)rlV}gV_?g|?5^?)g?rgV/?g;On?)rrrbggj+)y ףp= ? ףp= ׿yRQȿQ?y)\(?п)ro@yQ ףp= yq= ףpͿp= ף?)roro @yGz?(\?)rororo@)ry1%Ŀ q?ys??ܵ|ȿyHzG??ܵ?)roryV/?ݓ?yjt?vտ)rororyB>٬?=U?)rorororcCsLd}td|jd}|||||dd}t|dd|d}t|||ddS) zg This test implements the example found in the NAG manual, f08qfc, f08qtc, f08qgc, f08quc. rrrr)wantqr{rmN)r&r1rr)r@ifstilstexpectrrrr2r2r3test_trexc_NAG s rcCs:|tjkrtjdkrtdkrtdkrtdtdt |j d}d}t ||g|d}t ||g|d}t d |d\}}|d d ||d d d }t |dd|d}|d} |d} |d} |d| d} |d| d} |tvrt|t|d|dt| t| d|dt| || j|d|dt| | | j|d|d||| | | dd}t |dd|d}|d} |d} |d} |tvrt|t|d|dt| t| d|dt| || j|d|dt| | | j|d|dt|d| d| d|dt|d| d| d|ddS)Ndarwinopenblas 0.3.21.dev8gges[float32] broken for OpenBLAS on macOS, see gh-16949rrrpr)ggestgexccSrrr2rr2r2r3rd rhz!test_gges_tgexc..Fr overwrite_br{rrLrnr2rrr9rRrMrNr)r-rsysplatform blas_provider blas_versionr>xfailrrrr4r&rr,rrrrs)r1rrr]rrrrrr@rBrd1rr2r2r3test_gges_tgexc sJ    rc Csrtdt|jd}d}t||g|d}td|d\}}}|dd|dd }t|d d |d }|d } |d } |tvrJt|t |d |dt| || j |d |dt |} d| d<t || |} |tvru|| || | d}n || || | | dd}t|d d |d }|d} |tvrt|t |d |dt| || j |d |dt|d| d |ddS)Nrrrpr)rtrsen trsen_lworkcSrrr2rr2r2r3rd4 rhz!test_gees_trsen..Frwr{rr2rr9rLrQrrliworkr)rr-rrr4r&rr,rrrrsr r!) r1rrr]rrrrr@rrselectrr2r2r3test_gees_trsen) s8   rz*t, q, expect, select, expect_s, expect_sep)g/$?g QIg~jtx?gJ4?)r58EGrgGr?gyX5;?)rg?߾rgt?)rrrg yǹ)g؁sF?g_L?gGz?gUN@?)goT?g0*g' gz6>W)g(g&䃞ͪӿgbX9ҿg-!lV?)gb=y?gۊe?rg8EGr?)rg?gQg(\ſ)g ףp= ?gQ?rr)g)\(ܿgQտgQg(\?)rg{GzԿgp= ףg)\(?)rLrrrLg?g(\ @)yqhyfc]F?ڊe׿yMbȿ&S?y&1??п)roy?5^I @yo0*yZd;OͿ~:p?)roroyx $(@4@y[ A?&?)rororoy?ܵ@St$)y?ܵ꿽R!uy2U0*6[?yV-?=yXy8m4?1%̿)ySt$?\mҿyʡE?S㥛?y~:p cڿyK7A`?[ A?)y:pΈ~jtԿyH}?9#J{yH}? cZy+eXw? -ٿ)y"u? c?y?տN@ayRQȿ{GzĿyh"lxz?EGrǿ)y47 )yS!uq F%u @y yտGx $(?y3ı.n?rh|)yv? F%uyd`TR?I&†ۿyN@?ݓy4@ @ ^)?)ys{ @ o_yH.@|Pk @y 0*?*:Hy]m{?Gz)y) 0[.Frr{rrLrnr2rrr9rQrirr)r-rrrrrr>rrrrr4r&rr,rrrrsr r!)r1rrr]rrrrrrr@rBrrrrrr2r2r3test_gges_tgsen sV      rza, b, c, d, e, f, rans, lans)rrrr)rrrr)rrrr)rrrg@)rrrr)rrrr)rrg(@)g"rr)rrrr)rrg3@)rrrr)rrrr)rrrr)rrrr)rrrr)rrrr)rrrr)rrrr)rrg r)rrr)rrrr)rrrr)rrrr)rrrr)rrrr)rrrr)rrrr)rrrrc Csd} td|d} | ||||||\} } } }}t|dt| ddt|jdddt|d dt|jdd dt| || d d t| || d d dS)NrtgsylrrrrzSCALE must be 1.0rrrrzDIF must be nearly 0zSolution for R is incorrect)rrzSolution for L is incorrect)r&rrr-rr)r]rrrkrr`ranslansr1rrroutloutrXdifrer2r2r3test_tgsyl_NAG s $   rr)r=rsijob)rrLrMrNrOc Cs|tjkrdnd}tjd}d\}}t|dd||g||dd||g|dd^}}} t|dd||g||dd||g|dd^} } } |d d ||g|} |d d ||g|} td |d }||| | || | ||d \}}}}}|dksJd|dksJd|dkrt|ddt |j dddn|dksJd|d kr |dkr|||| }|| }|||| }|| }n*|dkrt ||t ||}|| }|t | |t | }d|| }t|||dddt|||ddddSdS)NgMbP?g|=lOElt/rirpr)outputrrMrr)rrrzINFO is non-zerorzSCALE must be non-negativerzDIF must be 0 for ijob =0rzDIF must be non-negativer=rsrzlhs1 and rhs1 do not match)rrrzlhs2 and rhs2 do not match) r-rr. default_rngr uniformr/r&rrrrA)r1rrrrngrrr]rkr<rrrr`rrrrXrrelhs1rhs1lhs2rhs2r2r2r3 test_tgsyl sT          rr)r functoolsr numpy.testingrrrrrrr>r rnumpyr-r r r r rrrr numpy.randomrrr scipy.linalgrr6rrrrrrrrrrr scipy.linalg.lapackr! scipy.statsr"r# scipy.sparsesparserGscipy.__config__r$ ImportErrorr%r5r&scipy.linalg.blasr'rr$rrs complex128r,rrrr4rIrKrrr^r_rrrrr0rjrwrrrrrrrrrrrrrrr%r)r0r9r:rYr\rdrlskipifrtr{r!rrrr}rrrrrrrrrrrrrrrr r rr!r(rDr[r\r]r_rnrorprrrrrrrrrrrr2r2r2r3s   (8        `  t   **DO1")::) %#((-   e #        \                   +    /                             @    . :0 0            4     %         .$      7-      * !@         "