define pyk of lemma numericalDifferenceLess as text unicode start of text unicode small l unicode small e unicode small m unicode small m unicode small a unicode space unicode small n unicode small u unicode small m unicode small e unicode small r unicode small i unicode small c unicode small a unicode small l unicode capital d unicode small i unicode small f unicode small f unicode small e unicode small r unicode small e unicode small n unicode small c unicode small e unicode capital l unicode small e unicode small s unicode small s unicode end of text end unicode text end text end define
define tex of lemma numericalDifferenceLess as text unicode start of text unicode capital n unicode small u unicode small m unicode small e unicode small r unicode small i unicode small c unicode small a unicode small l unicode capital d unicode small i unicode small f unicode small f unicode small e unicode small r unicode small e unicode small n unicode small c unicode small e unicode capital l unicode small e unicode small s unicode small s unicode end of text end unicode text end text end define
define statement of lemma numericalDifferenceLess as system Q infer all metavar var x end metavar indeed all metavar var y end metavar indeed all metavar var z end metavar indeed not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar infer not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar end define
define proof of lemma numericalDifferenceLess as lambda var c dot lambda var x dot proof expand quote system Q infer all metavar var x end metavar indeed all metavar var y end metavar indeed all metavar var z end metavar indeed not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar infer 0 <= metavar var x end metavar + - metavar var y end metavar infer lemma nonnegativeNumerical modus ponens 0 <= metavar var x end metavar + - metavar var y end metavar conclude | metavar var x end metavar + - metavar var y end metavar | = metavar var x end metavar + - metavar var y end metavar cut lemma subLessLeft modus ponens | metavar var x end metavar + - metavar var y end metavar | = metavar var x end metavar + - metavar var y end metavar modus ponens not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar conclude not0 metavar var x end metavar + - metavar var y end metavar <= metavar var z end metavar imply not0 not0 metavar var x end metavar + - metavar var y end metavar = metavar var z end metavar cut lemma numericalDifferenceLess helper modus ponens 0 <= metavar var x end metavar + - metavar var y end metavar modus ponens not0 metavar var x end metavar + - metavar var y end metavar <= metavar var z end metavar imply not0 not0 metavar var x end metavar + - metavar var y end metavar = metavar var z end metavar conclude not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar cut all metavar var x end metavar indeed all metavar var y end metavar indeed all metavar var z end metavar indeed not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar infer not0 0 <= metavar var x end metavar + - metavar var y end metavar infer lemma toLess modus ponens not0 0 <= metavar var x end metavar + - metavar var y end metavar conclude not0 metavar var x end metavar + - metavar var y end metavar <= 0 imply not0 not0 metavar var x end metavar + - metavar var y end metavar = 0 cut lemma negativeNumerical modus ponens not0 metavar var x end metavar + - metavar var y end metavar <= 0 imply not0 not0 metavar var x end metavar + - metavar var y end metavar = 0 conclude | metavar var x end metavar + - metavar var y end metavar | = - metavar var x end metavar + - metavar var y end metavar cut lemma minusNegated conclude - metavar var x end metavar + - metavar var y end metavar = metavar var y end metavar + - metavar var x end metavar cut lemma eqTransitivity modus ponens | metavar var x end metavar + - metavar var y end metavar | = - metavar var x end metavar + - metavar var y end metavar modus ponens - metavar var x end metavar + - metavar var y end metavar = metavar var y end metavar + - metavar var x end metavar conclude | metavar var x end metavar + - metavar var y end metavar | = metavar var y end metavar + - metavar var x end metavar cut lemma subLessLeft modus ponens | metavar var x end metavar + - metavar var y end metavar | = metavar var y end metavar + - metavar var x end metavar modus ponens not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar conclude not0 metavar var y end metavar + - metavar var x end metavar <= metavar var z end metavar imply not0 not0 metavar var y end metavar + - metavar var x end metavar = metavar var z end metavar cut lemma negativeNegated modus ponens not0 metavar var x end metavar + - metavar var y end metavar <= 0 imply not0 not0 metavar var x end metavar + - metavar var y end metavar = 0 conclude not0 0 <= - metavar var x end metavar + - metavar var y end metavar imply not0 not0 0 = - metavar var x end metavar + - metavar var y end metavar cut lemma subLessRight modus ponens - metavar var x end metavar + - metavar var y end metavar = metavar var y end metavar + - metavar var x end metavar modus ponens not0 0 <= - metavar var x end metavar + - metavar var y end metavar imply not0 not0 0 = - metavar var x end metavar + - metavar var y end metavar conclude not0 0 <= metavar var y end metavar + - metavar var x end metavar imply not0 not0 0 = metavar var y end metavar + - metavar var x end metavar cut lemma lessLeq modus ponens not0 0 <= metavar var y end metavar + - metavar var x end metavar imply not0 not0 0 = metavar var y end metavar + - metavar var x end metavar conclude 0 <= metavar var y end metavar + - metavar var x end metavar cut lemma numericalDifferenceLess helper modus ponens 0 <= metavar var y end metavar + - metavar var x end metavar modus ponens not0 metavar var y end metavar + - metavar var x end metavar <= metavar var z end metavar imply not0 not0 metavar var y end metavar + - metavar var x end metavar = metavar var z end metavar conclude not0 not0 metavar var x end metavar + - metavar var z end metavar <= metavar var y end metavar imply not0 not0 metavar var x end metavar + - metavar var z end metavar = metavar var y end metavar imply not0 not0 metavar var y end metavar <= metavar var x end metavar + metavar var z end metavar imply not0 not0 metavar var y end metavar = metavar var x end metavar + metavar var z end metavar cut prop lemma first conjunct modus ponens not0 not0 metavar var x end metavar + - metavar var z end metavar <= metavar var y end metavar imply not0 not0 metavar var x end metavar + - metavar var z end metavar = metavar var y end metavar imply not0 not0 metavar var y end metavar <= metavar var x end metavar + metavar var z end metavar imply not0 not0 metavar var y end metavar = metavar var x end metavar + metavar var z end metavar conclude not0 metavar var x end metavar + - metavar var z end metavar <= metavar var y end metavar imply not0 not0 metavar var x end metavar + - metavar var z end metavar = metavar var y end metavar cut lemma negativeToRight(Less) modus ponens not0 metavar var x end metavar + - metavar var z end metavar <= metavar var y end metavar imply not0 not0 metavar var x end metavar + - metavar var z end metavar = metavar var y end metavar conclude not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar cut prop lemma second conjunct modus ponens not0 not0 metavar var x end metavar + - metavar var z end metavar <= metavar var y end metavar imply not0 not0 metavar var x end metavar + - metavar var z end metavar = metavar var y end metavar imply not0 not0 metavar var y end metavar <= metavar var x end metavar + metavar var z end metavar imply not0 not0 metavar var y end metavar = metavar var x end metavar + metavar var z end metavar conclude not0 metavar var y end metavar <= metavar var x end metavar + metavar var z end metavar imply not0 not0 metavar var y end metavar = metavar var x end metavar + metavar var z end metavar cut lemma positiveToLeft(Less) modus ponens not0 metavar var y end metavar <= metavar var x end metavar + metavar var z end metavar imply not0 not0 metavar var y end metavar = metavar var x end metavar + metavar var z end metavar conclude not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar cut prop lemma join conjuncts modus ponens not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar modus ponens not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar conclude not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar cut all metavar var x end metavar indeed all metavar var y end metavar indeed all metavar var z end metavar indeed 1rule deduction modus ponens all metavar var x end metavar indeed all metavar var y end metavar indeed all metavar var z end metavar indeed not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar infer 0 <= metavar var x end metavar + - metavar var y end metavar infer not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar conclude not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar imply 0 <= metavar var x end metavar + - metavar var y end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar cut 1rule deduction modus ponens all metavar var x end metavar indeed all metavar var y end metavar indeed all metavar var z end metavar indeed not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar infer not0 0 <= metavar var x end metavar + - metavar var y end metavar infer not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar conclude not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar imply not0 0 <= metavar var x end metavar + - metavar var y end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar cut not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar infer 1rule mp modus ponens not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar imply 0 <= metavar var x end metavar + - metavar var y end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar modus ponens not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar conclude 0 <= metavar var x end metavar + - metavar var y end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar cut 1rule mp modus ponens not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar imply not0 0 <= metavar var x end metavar + - metavar var y end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar modus ponens not0 | metavar var x end metavar + - metavar var y end metavar | <= metavar var z end metavar imply not0 not0 | metavar var x end metavar + - metavar var y end metavar | = metavar var z end metavar conclude not0 0 <= metavar var x end metavar + - metavar var y end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar cut prop lemma from negations modus ponens 0 <= metavar var x end metavar + - metavar var y end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar modus ponens not0 0 <= metavar var x end metavar + - metavar var y end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar conclude not0 not0 metavar var y end metavar + - metavar var z end metavar <= metavar var x end metavar imply not0 not0 metavar var y end metavar + - metavar var z end metavar = metavar var x end metavar imply not0 not0 metavar var x end metavar <= metavar var y end metavar + metavar var z end metavar imply not0 not0 metavar var x end metavar = metavar var y end metavar + metavar var z end metavar end quote state proof state cache var c end expand end define
The pyk compiler, version 0.grue.20060417+ by Klaus Grue,