Search for blocks/addresses/...

Proofgold Signed Transaction

vin
Pr5Yq../6d700..
PUUSR../77a99..
vout
Pr5Yq../ebbec.. 0.10 bars
TMbV4../4098a.. ownership of 786fe.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMFQx../d2aae.. ownership of cd944.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMM3Q../299c6.. ownership of 23f90.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMKzH../90edc.. ownership of 3c16d.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMSeA../aa35a.. ownership of 9b65b.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMH1J../6b03b.. ownership of 2db5b.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMQxW../d7256.. ownership of 667a5.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMb7F../813a8.. ownership of 2b4a7.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMUb2../4fc60.. ownership of 1fbd0.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMagu../11947.. ownership of 4bfca.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMRjP../11298.. ownership of 2feb8.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMU12../198eb.. ownership of c2207.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMGj2../f66f0.. ownership of 50c52.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMZjP../09524.. ownership of 374bb.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMFaP../4bb05.. ownership of 426c6.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMHdo../3f9a9.. ownership of 30238.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMPng../2f864.. ownership of d6ad9.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMWBR../951cc.. ownership of 5b99b.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMb4L../b0044.. ownership of 0adf1.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMR63../5a1ee.. ownership of 5e5ee.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMF9q../76dd6.. ownership of 06a84.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMWkP../21a45.. ownership of 5d1e7.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMTyg../8216b.. ownership of 31ee4.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMdtA../4abdc.. ownership of 3d8bb.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMYEB../f076a.. ownership of 14d42.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMUuW../a90b9.. ownership of 0c660.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMUBA../ae23e.. ownership of ecc14.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMbWf../d10b1.. ownership of 0b71b.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMbVE../ef4ba.. ownership of a40ca.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMKrh../3c329.. ownership of 2697e.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMU15../cdf11.. ownership of 9f28a.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMaeq../d6b79.. ownership of f6ac5.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMPCJ../89e17.. ownership of c7372.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMath../719c9.. ownership of 2847c.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMPRW../a1dca.. ownership of 73d42.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
TMFKr../ffa0d.. ownership of cbdd0.. as prop with payaddr PrCmT.. rights free controlledby PrCmT.. upto 0
PUNA7../33c90.. doc published by PrCmT..
Known ax_c11__ax_c11_b__ax_c11n__ax_c15__ax_c9__ax_c9_b__ax_c9_b1__ax_c9_b2__ax_c9_b3__ax_c14__ax_c16__ax_riotaBAD__df_lsatoms__df_lshyp__df_lcv__df_lfl__df_lkr__df_ldual : ∀ x0 : ο . ((∀ x1 : ι → ι → ο . ∀ x2 x3 . (∀ x4 . wceq (cv x4) (cv x3))(∀ x4 . x1 x4 x3)∀ x4 . x1 x2 x4)(∀ x1 : ι → ο . (∀ x2 . wceq (cv x2) (cv x2))(∀ x2 . x1 x2)∀ x2 . x1 x2)(∀ x1 x2 . (∀ x3 . wceq (cv x3) (cv x2))∀ x3 . wceq (cv x3) (cv x1))(∀ x1 : ι → ο . ∀ x2 x3 . wn (∀ x4 . wceq (cv x4) (cv x2))wceq (cv x3) (cv x2)x1 x3∀ x4 . wceq (cv x4) (cv x2)x1 x4)(∀ x1 x2 . wn (∀ x3 . wceq (cv x3) (cv x1))wn (∀ x3 . wceq (cv x3) (cv x2))wceq (cv x1) (cv x2)∀ x3 . wceq (cv x1) (cv x2))(∀ x1 . wn (∀ x2 . wceq (cv x2) (cv x2))wn (∀ x2 . wceq (cv x2) (cv x2))wceq (cv x1) (cv x1)∀ x2 . wceq (cv x2) (cv x2))(∀ x1 . wn (∀ x2 . wceq (cv x2) (cv x1))wn (∀ x2 . wceq (cv x2) (cv x1))wceq (cv x1) (cv x1)∀ x2 . wceq (cv x1) (cv x1))(∀ x1 x2 . wn (∀ x3 . wceq (cv x3) (cv x3))wn (∀ x3 . wceq (cv x3) (cv x1))wceq (cv x2) (cv x1)∀ x3 . wceq (cv x3) (cv x1))(∀ x1 x2 . wn (∀ x3 . wceq (cv x3) (cv x1))wn (∀ x3 . wceq (cv x3) (cv x3))wceq (cv x1) (cv x2)∀ x3 . wceq (cv x1) (cv x3))(∀ x1 x2 . wn (∀ x3 . wceq (cv x3) (cv x1))wn (∀ x3 . wceq (cv x3) (cv x2))wcel (cv x1) (cv x2)∀ x3 . wcel (cv x1) (cv x2))(∀ x1 : ι → ο . ∀ x2 x3 . (∀ x4 . wceq (cv x4) (cv x2))x1 x3∀ x4 . x1 x4)(∀ x1 : ι → ο . ∀ x2 : ι → ι → ο . wceq (crio x1 x2) (cif (wreu x1 x2) (cio (λ x3 . wa (wcel (cv x3) (x2 x3)) (x1 x3))) (cfv (cab (λ x3 . wcel (cv x3) (x2 x3))) cund)))wceq clsa (cmpt (λ x1 . cvv) (λ x1 . crn (cmpt (λ x2 . cdif (cfv (cv x1) cbs) (csn (cfv (cv x1) c0g))) (λ x2 . cfv (csn (cv x2)) (cfv (cv x1) clspn)))))wceq clsh (cmpt (λ x1 . cvv) (λ x1 . crab (λ x2 . wa (wne (cv x2) (cfv (cv x1) cbs)) (wrex (λ x3 . wceq (cfv (cun (cv x2) (csn (cv x3))) (cfv (cv x1) clspn)) (cfv (cv x1) cbs)) (λ x3 . cfv (cv x1) cbs))) (λ x2 . cfv (cv x1) clss)))wceq clcv (cmpt (λ x1 . cvv) (λ x1 . copab (λ x2 x3 . wa (wa (wcel (cv x2) (cfv (cv x1) clss)) (wcel (cv x3) (cfv (cv x1) clss))) (wa (wpss (cv x2) (cv x3)) (wn (wrex (λ x4 . wa (wpss (cv x2) (cv x4)) (wpss (cv x4) (cv x3))) (λ x4 . cfv (cv x1) clss)))))))wceq clfn (cmpt (λ x1 . cvv) (λ x1 . crab (λ x2 . wral (λ x3 . wral (λ x4 . wral (λ x5 . wceq (cfv (co (co (cv x3) (cv x4) (cfv (cv x1) cvsca)) (cv x5) (cfv (cv x1) cplusg)) (cv x2)) (co (co (cv x3) (cfv (cv x4) (cv x2)) (cfv (cfv (cv x1) csca) cmulr)) (cfv (cv x5) (cv x2)) (cfv (cfv (cv x1) csca) cplusg))) (λ x5 . cfv (cv x1) cbs)) (λ x4 . cfv (cv x1) cbs)) (λ x3 . cfv (cfv (cv x1) csca) cbs)) (λ x2 . co (cfv (cfv (cv x1) csca) cbs) (cfv (cv x1) cbs) cmap)))wceq clk (cmpt (λ x1 . cvv) (λ x1 . cmpt (λ x2 . cfv (cv x1) clfn) (λ x2 . cima (ccnv (cv x2)) (csn (cfv (cfv (cv x1) csca) c0g)))))wceq cld (cmpt (λ x1 . cvv) (λ x1 . cun (ctp (cop (cfv cnx cbs) (cfv (cv x1) clfn)) (cop (cfv cnx cplusg) (cres (cof (cfv (cfv (cv x1) csca) cplusg)) (cxp (cfv (cv x1) clfn) (cfv (cv x1) clfn)))) (cop (cfv cnx csca) (cfv (cfv (cv x1) csca) coppr))) (csn (cop (cfv cnx cvsca) (cmpt2 (λ x2 x3 . cfv (cfv (cv x1) csca) cbs) (λ x2 x3 . cfv (cv x1) clfn) (λ x2 x3 . co (cv x3) (cxp (cfv (cv x1) cbs) (csn (cv x2))) (cof (cfv (cfv (cv x1) csca) cmulr))))))))x0)x0
Theorem ax_c11 : ∀ x0 : ι → ι → ο . ∀ x1 x2 . (∀ x3 . wceq (cv x3) (cv x2))(∀ x3 . x0 x3 x2)∀ x3 . x0 x1 x3 (proof)
Theorem ax_c11_b : ∀ x0 : ι → ο . (∀ x1 . wceq (cv x1) (cv x1))(∀ x1 . x0 x1)∀ x1 . x0 x1 (proof)
Theorem ax_c11n : ∀ x0 x1 . (∀ x2 . wceq (cv x2) (cv x1))∀ x2 . wceq (cv x2) (cv x0) (proof)
Theorem ax_c15 : ∀ x0 : ι → ο . ∀ x1 x2 . wn (∀ x3 . wceq (cv x3) (cv x1))wceq (cv x2) (cv x1)x0 x2∀ x3 . wceq (cv x3) (cv x1)x0 x3 (proof)
Theorem ax_c9 : ∀ x0 x1 . wn (∀ x2 . wceq (cv x2) (cv x0))wn (∀ x2 . wceq (cv x2) (cv x1))wceq (cv x0) (cv x1)∀ x2 . wceq (cv x0) (cv x1) (proof)
Theorem ax_c9_b : ∀ x0 . wn (∀ x1 . wceq (cv x1) (cv x1))wn (∀ x1 . wceq (cv x1) (cv x1))wceq (cv x0) (cv x0)∀ x1 . wceq (cv x1) (cv x1) (proof)
Theorem ax_c9_b1 : ∀ x0 . wn (∀ x1 . wceq (cv x1) (cv x0))wn (∀ x1 . wceq (cv x1) (cv x0))wceq (cv x0) (cv x0)∀ x1 . wceq (cv x0) (cv x0) (proof)
Theorem ax_c9_b2 : ∀ x0 x1 . wn (∀ x2 . wceq (cv x2) (cv x2))wn (∀ x2 . wceq (cv x2) (cv x0))wceq (cv x1) (cv x0)∀ x2 . wceq (cv x2) (cv x0) (proof)
Theorem ax_c9_b3 : ∀ x0 x1 . wn (∀ x2 . wceq (cv x2) (cv x0))wn (∀ x2 . wceq (cv x2) (cv x2))wceq (cv x0) (cv x1)∀ x2 . wceq (cv x0) (cv x2) (proof)
Theorem ax_c14 : ∀ x0 x1 . wn (∀ x2 . wceq (cv x2) (cv x0))wn (∀ x2 . wceq (cv x2) (cv x1))wcel (cv x0) (cv x1)∀ x2 . wcel (cv x0) (cv x1) (proof)
Theorem ax_c16 : ∀ x0 : ι → ο . ∀ x1 x2 . (∀ x3 . wceq (cv x3) (cv x1))x0 x2∀ x3 . x0 x3 (proof)
Theorem ax_riotaBAD : ∀ x0 : ι → ο . ∀ x1 : ι → ι → ο . wceq (crio x0 x1) (cif (wreu x0 x1) (cio (λ x2 . wa (wcel (cv x2) (x1 x2)) (x0 x2))) (cfv (cab (λ x2 . wcel (cv x2) (x1 x2))) cund)) (proof)
Theorem df_lsatoms : wceq clsa (cmpt (λ x0 . cvv) (λ x0 . crn (cmpt (λ x1 . cdif (cfv (cv x0) cbs) (csn (cfv (cv x0) c0g))) (λ x1 . cfv (csn (cv x1)) (cfv (cv x0) clspn))))) (proof)
Theorem df_lshyp : wceq clsh (cmpt (λ x0 . cvv) (λ x0 . crab (λ x1 . wa (wne (cv x1) (cfv (cv x0) cbs)) (wrex (λ x2 . wceq (cfv (cun (cv x1) (csn (cv x2))) (cfv (cv x0) clspn)) (cfv (cv x0) cbs)) (λ x2 . cfv (cv x0) cbs))) (λ x1 . cfv (cv x0) clss))) (proof)
Theorem df_lcv : wceq clcv (cmpt (λ x0 . cvv) (λ x0 . copab (λ x1 x2 . wa (wa (wcel (cv x1) (cfv (cv x0) clss)) (wcel (cv x2) (cfv (cv x0) clss))) (wa (wpss (cv x1) (cv x2)) (wn (wrex (λ x3 . wa (wpss (cv x1) (cv x3)) (wpss (cv x3) (cv x2))) (λ x3 . cfv (cv x0) clss))))))) (proof)
Theorem df_lfl : wceq clfn (cmpt (λ x0 . cvv) (λ x0 . crab (λ x1 . wral (λ x2 . wral (λ x3 . wral (λ x4 . wceq (cfv (co (co (cv x2) (cv x3) (cfv (cv x0) cvsca)) (cv x4) (cfv (cv x0) cplusg)) (cv x1)) (co (co (cv x2) (cfv (cv x3) (cv x1)) (cfv (cfv (cv x0) csca) cmulr)) (cfv (cv x4) (cv x1)) (cfv (cfv (cv x0) csca) cplusg))) (λ x4 . cfv (cv x0) cbs)) (λ x3 . cfv (cv x0) cbs)) (λ x2 . cfv (cfv (cv x0) csca) cbs)) (λ x1 . co (cfv (cfv (cv x0) csca) cbs) (cfv (cv x0) cbs) cmap))) (proof)
Theorem df_lkr : wceq clk (cmpt (λ x0 . cvv) (λ x0 . cmpt (λ x1 . cfv (cv x0) clfn) (λ x1 . cima (ccnv (cv x1)) (csn (cfv (cfv (cv x0) csca) c0g))))) (proof)
Theorem df_ldual : wceq cld (cmpt (λ x0 . cvv) (λ x0 . cun (ctp (cop (cfv cnx cbs) (cfv (cv x0) clfn)) (cop (cfv cnx cplusg) (cres (cof (cfv (cfv (cv x0) csca) cplusg)) (cxp (cfv (cv x0) clfn) (cfv (cv x0) clfn)))) (cop (cfv cnx csca) (cfv (cfv (cv x0) csca) coppr))) (csn (cop (cfv cnx cvsca) (cmpt2 (λ x1 x2 . cfv (cfv (cv x0) csca) cbs) (λ x1 x2 . cfv (cv x0) clfn) (λ x1 x2 . co (cv x2) (cxp (cfv (cv x0) cbs) (csn (cv x1))) (cof (cfv (cfv (cv x0) csca) cmulr)))))))) (proof)